{"meta":{"query_hash":"d491e5b962ec","filters":{"venue":"Communications in Mathematical Physics"},"cohort_total":386,"direct_labels_cover":0,"predictions_cover":386,"exported":386,"export_cap":100000,"truncated":false,"label_status":"direct model label, unvalidated","prediction_status":"machine_predicted_unvalidated (Codex and Gemma teacher distillation)","score_status":"score_only:v0-immature-baseline","snapshot":{"source":"OpenAlex, pinned release, all 482 partitions","release":"2026-06-24","frame_built":"2026-07-12"},"permalink":"https://metacan.xera.ac/q/d491e5b962ec","api":"https://metacan.xera.ac/api/v1/cohort?venue=Communications+in+Mathematical+Physics"},"results":[{"id":"W133480220","doi":"10.1007/s00220-006-0066-5","title":"A Domain of Spacetime Intervals in General Relativity","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":2,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Causal sets; Spacetime; Causality (physics); Spacetime topology; Mathematics; Countable set; Causal structure; Manifold (fluid mechanics); Interval (graph theory); General relativity; Pure mathematics; Topology (electrical circuits); Physics; Quantum field theory in curved spacetime; Mathematical physics; Quantum mechanics; Combinatorics; Quantum gravity","score_opus":0.019969152149224456,"score_gpt":0.29392119638731057,"score_spread":0.2739520442380861,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W133480220","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.57418376,0.000051565432,0.18706657,0.0005423912,0.000017386506,0.0003485681,0.000028900391,0.00002156611,0.2377393],"genre_scores_gemma":[0.9696345,0.0000019229878,0.030110277,0.000010719572,0.00005232107,0.000038867085,0.000030829728,0.000017659679,0.00010294284],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988595,0.00017236992,0.0004907587,0.00014618158,0.00012552201,0.00020565782],"domain_scores_gemma":[0.99833244,0.0003774445,0.00012682342,0.0010930668,0.00004004577,0.000030153848],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00030558996,0.00013749977,0.00034952766,0.000044293327,0.000037443282,0.000016093016,0.00053567096,0.000041976153,0.00008096377],"category_scores_gemma":[0.000009138678,0.00013200761,0.0001157159,0.00040061926,0.00038799804,0.00010820227,0.00032297644,0.00032426786,0.000050571467],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004015484,0.0012107836,0.0054957448,0.000021866928,0.000008338347,1.8661785e-7,0.0002682353,0.00014753516,0.00018718532,0.99141073,0.00004791134,0.0011974873],"study_design_scores_gemma":[0.00037120673,0.000012249522,0.0023185788,0.0001112027,0.000008217241,1.2484938e-7,0.000113935464,0.004740201,0.0005948753,0.99148387,0.00011905419,0.00012647474],"about_ca_topic_score_codex":0.00011674095,"about_ca_topic_score_gemma":0.0000109274815,"teacher_disagreement_score":0.3954507,"about_ca_system_score_codex":0.00003309207,"about_ca_system_score_gemma":0.000023888118,"threshold_uncertainty_score":0.53831136},"labels":[],"label_agreement":null},{"id":"W1438529033","doi":"10.1007/s00220-018-3222-9","title":"Contextuality and Noncommutative Geometry in Quantum Mechanics","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Applications","field":"Physics and Astronomy","cited_by":8,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Clarendon Fund; Fundação para a Ciência e a Tecnologia; Engineering and Physical Sciences Research Council; Natural Sciences and Engineering Research Council of Canada; Simons Foundation; University of Oxford; John Templeton Foundation; Simons Institute for the Theory of Computing, University of California Berkeley","keywords":"Noncommutative geometry; Mathematics; Observable; Spectral triple; Noncommutative quantum field theory; Noncommutative algebraic geometry; Hausdorff space; Quantum differential calculus; Operator (biology); Pure mathematics; Functor; Self-adjoint operator; Operator algebra; State space; Quantum; Kochen–Specker theorem; Algebra over a field; Quantum mechanics; Physics; Hilbert space","score_opus":0.03776034734365712,"score_gpt":0.3278369657240898,"score_spread":0.2900766183804327,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1438529033","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7052664,0.00019606724,0.2715498,0.0012237723,0.000050661467,0.0012664777,0.000078630634,0.000052200467,0.020315968],"genre_scores_gemma":[0.9966629,0.00002261777,0.0030215094,0.000056341047,0.000014135866,0.00013976137,0.000038907332,0.000018097257,0.000025695015],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99895376,0.00011775984,0.00040065387,0.00020805575,0.00011555262,0.00020420781],"domain_scores_gemma":[0.9978463,0.00066838745,0.00011116999,0.0012725387,0.000049014303,0.00005261204],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004305931,0.00014451322,0.00030785208,0.00006488374,0.00007470965,0.00003776779,0.00056295254,0.000044958182,0.00011641865],"category_scores_gemma":[0.000023047527,0.00014529408,0.000051771993,0.0004590667,0.00007497687,0.00013533467,0.0004256907,0.0004019319,0.00018123654],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000002118001,0.00046822746,0.0015537029,0.000021480906,0.000010138766,7.6891666e-8,0.00061006134,0.000019022988,0.00017021754,0.99456805,0.000012551062,0.0025643753],"study_design_scores_gemma":[0.00035449813,0.000013996284,0.00042113394,0.00006407176,0.0000062627746,2.4723778e-7,0.0013777321,0.17922701,0.00005746754,0.8181593,0.00018530218,0.00013299576],"about_ca_topic_score_codex":0.00005191574,"about_ca_topic_score_gemma":0.000008898155,"teacher_disagreement_score":0.2913965,"about_ca_system_score_codex":0.00003760265,"about_ca_system_score_gemma":0.000034251283,"threshold_uncertainty_score":0.59249204},"labels":[],"label_agreement":null},{"id":"W1476251477","doi":"10.1007/s00220-015-2445-2","title":"Interior Regularity for Regional Fractional Laplacian","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Partial Differential Equations","field":"Mathematics","cited_by":30,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; National Science Foundation","keywords":"Differentiable function; Mathematics; Fractional Laplacian; Conjecture; Order (exchange); Integer (computer science); Laplace operator; Operator (biology); Fractional calculus; Pure mathematics; Mathematical analysis; Computer science; Finance","score_opus":0.3959552675527483,"score_gpt":0.4570767781668634,"score_spread":0.06112151061411508,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1476251477","genre_codex":"methods","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":"methods","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.011460092,0.00005489698,0.97160846,0.0048121014,0.000120896744,0.0009939687,0.00005878663,0.00016306197,0.010727706],"genre_scores_gemma":[0.42507312,0.000008493471,0.5732087,0.00017778337,0.00023235584,0.00050957105,0.000161211,0.00005274777,0.0005760346],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99865025,0.00016009543,0.00051062834,0.00018457366,0.0002780943,0.00021635741],"domain_scores_gemma":[0.99636865,0.0016681456,0.00015328414,0.0014083714,0.0002799526,0.00012161957],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006207573,0.000151858,0.000292589,0.000063399835,0.0001354541,0.000048860584,0.00073558453,0.00009747752,0.000037096976],"category_scores_gemma":[0.0019462813,0.00015211597,0.00012527956,0.00025545165,0.00024716184,0.00019327103,0.00027214756,0.0002861659,0.000112479036],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00002136504,0.0007115184,0.00004744275,0.00005098463,0.000022773338,1.7805569e-7,0.0006010684,0.000010227665,0.00010956315,0.9938566,0.0034523564,0.0011159001],"study_design_scores_gemma":[0.00056246534,0.000032356995,0.00005342602,0.00007816487,0.000032185577,0.0000031984277,0.00023110205,0.039911088,0.00012893528,0.954369,0.004444679,0.00015340619],"about_ca_topic_score_codex":0.0000058710493,"about_ca_topic_score_gemma":0.000057168396,"teacher_disagreement_score":0.41361302,"about_ca_system_score_codex":0.0001533647,"about_ca_system_score_gemma":0.00013823403,"threshold_uncertainty_score":0.62031096},"labels":[],"label_agreement":null},{"id":"W1499466902","doi":"10.1007/s00220-003-0895-4","title":"Critical (?4)3,?","year":2003,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Chromodynamics and Particle Interactions","field":"Physics and Astronomy","cited_by":41,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Covariance; Renormalization group; Fixed point; Renormalization; Pointwise; Cutoff; Scalar field; Scalar (mathematics); Scalar field theory","score_opus":0.05072541071394919,"score_gpt":0.3737593341303408,"score_spread":0.3230339234163916,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1499466902","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.056918193,0.000054826705,0.3116325,0.0009418949,0.00009841082,0.00020309226,0.000016890002,0.000050066672,0.6300841],"genre_scores_gemma":[0.9818481,0.0000025854138,0.017908683,0.00003180979,0.00002503357,0.00006319049,0.000007993284,0.000012918291,0.0000996931],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9992603,0.00011243382,0.00025085505,0.000112533424,0.000081852,0.00018203979],"domain_scores_gemma":[0.99814177,0.0007345832,0.000031970754,0.000978636,0.000056013803,0.00005701453],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00016376108,0.00009001056,0.00013504304,0.00002449427,0.00012380227,0.000047823225,0.00032653112,0.000020748936,0.00067036593],"category_scores_gemma":[0.00011056935,0.00008959352,0.000067019435,0.00021637342,0.00017599974,0.00014895474,0.000074662516,0.0002473632,0.0004175682],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[4.6153647e-7,0.0006332661,0.0012788796,0.0000057197976,0.000007462562,1.903664e-7,0.00015994145,0.000035070763,0.00013125036,0.996656,0.00006883046,0.001022932],"study_design_scores_gemma":[0.00012073247,0.0000067874203,0.000114544135,0.000028572082,0.000009409926,0.0000010905992,0.00023123562,0.041526645,0.0003004698,0.9559901,0.0015666176,0.00010383504],"about_ca_topic_score_codex":0.000007968544,"about_ca_topic_score_gemma":0.0000019168367,"teacher_disagreement_score":0.9249299,"about_ca_system_score_codex":0.000022528558,"about_ca_system_score_gemma":0.000030464586,"threshold_uncertainty_score":0.73400366},"labels":[],"label_agreement":null},{"id":"W1553393825","doi":"10.1007/s00220-016-2587-x","title":"A Dimension Spectrum for SLE Boundary Collisions","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":10,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Directorate for Mathematical and Physical Sciences; Knut och Alice Wallenbergs Stiftelse; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; National Science Foundation; Vetenskapsrådet; Simons Foundation","keywords":"Mathematics; Hausdorff dimension; Intersection (aeronautics); Boundary (topology); Dimension (graph theory); Spectrum (functional analysis); Real line; Metric (unit); Mathematical analysis; Combinatorics; Geometry; Physics","score_opus":0.09466471252249424,"score_gpt":0.37612713141166604,"score_spread":0.2814624188891718,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1553393825","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.020120537,0.00008154938,0.95884275,0.0068384744,0.000101422294,0.0014903368,0.00017320664,0.00017102635,0.012180679],"genre_scores_gemma":[0.6999657,0.00007350073,0.2982344,0.00010688465,0.000061605184,0.00033742914,0.000018814464,0.00007342016,0.0011282425],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99824077,0.00011032179,0.0007289474,0.00027291387,0.0002544805,0.0003925677],"domain_scores_gemma":[0.99014044,0.007073668,0.0001892958,0.0023767937,0.00010559803,0.00011420702],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006224674,0.00023008423,0.00049160386,0.00007744951,0.0002531659,0.000054906694,0.0009494807,0.00012133219,0.00014001271],"category_scores_gemma":[0.0019830854,0.00015661462,0.00017934958,0.0003151689,0.00036198494,0.000187684,0.0004729439,0.00018908997,0.0001242249],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010228378,0.00094077195,0.000039537208,0.00013381391,0.000021170537,5.114765e-7,0.0002251279,8.2915454e-7,0.0015180752,0.993663,0.0010701588,0.0023767403],"study_design_scores_gemma":[0.0006159244,0.000047692705,0.000020274112,0.00041844093,0.00003655332,0.0000037513978,0.00005056495,0.020914914,0.00048569893,0.97478235,0.0023917812,0.0002320438],"about_ca_topic_score_codex":0.000001277573,"about_ca_topic_score_gemma":0.000016567528,"teacher_disagreement_score":0.67984515,"about_ca_system_score_codex":0.00013366046,"about_ca_system_score_gemma":0.00006209559,"threshold_uncertainty_score":0.6386559},"labels":[],"label_agreement":null},{"id":"W1560695905","doi":"10.1007/s00220-015-2561-z","title":"Almost One Bit Violation for the Additivity of the Minimum Output Entropy","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Wireless Communication Security Techniques","field":"Engineering","cited_by":15,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Ottawa; Queen's University","funders":"German Academic Exchange Service London; Japan Society for the Promotion of Science; Agence Nationale de la Recherche; Ontario Ministry of Research, Innovation and Science; Queen's University; Centre National de la Recherche Scientifique; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada","keywords":"Quantum relative entropy; Additive function; Quantum; Entropy (arrow of time); Entropy rate; Eigenvalues and eigenvectors; Generalized relative entropy; Dimension (graph theory); Joint quantum entropy","score_opus":0.06100029080580582,"score_gpt":0.29302719172424385,"score_spread":0.23202690091843803,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1560695905","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.016809367,0.00036713172,0.96846634,0.0065802606,0.00006434749,0.0015769697,0.00016209995,0.00029530935,0.0056781983],"genre_scores_gemma":[0.98094225,0.0003521844,0.018200222,0.000030250481,0.000022860262,0.00038703508,0.000009847342,0.000025560365,0.000029775176],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991522,0.0001225237,0.0003783915,0.00008003803,0.00013183235,0.000135052],"domain_scores_gemma":[0.99364996,0.0034646315,0.00010481308,0.002656655,0.00010475603,0.000019185863],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003794838,0.000107575404,0.00018493929,0.000027513139,0.00012825067,0.000015489357,0.001565625,0.000063212654,0.000016554324],"category_scores_gemma":[0.00036682712,0.00006285633,0.00010080163,0.00025534688,0.00035614078,0.00012438773,0.00039861884,0.0001855495,0.000013768484],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000077039795,0.000589417,0.00021691096,0.0001809717,0.00007783485,1.4086495e-8,0.0012416079,0.00014486801,0.023908691,0.91353136,0.0016869954,0.058413617],"study_design_scores_gemma":[0.00056967675,0.000024152963,0.0033715894,0.0006290616,0.000068270056,9.043029e-7,0.00015797502,0.1906811,0.0365445,0.7592023,0.0084679825,0.00028248545],"about_ca_topic_score_codex":0.0000025784093,"about_ca_topic_score_gemma":0.0000098771,"teacher_disagreement_score":0.9641329,"about_ca_system_score_codex":0.000077043274,"about_ca_system_score_gemma":0.000018194873,"threshold_uncertainty_score":0.29093468},"labels":[],"label_agreement":null},{"id":"W1584369597","doi":"10.1007/s00220-016-2608-9","title":"The Vlasov–Poisson System for Stellar Dynamics in Spaces of Constant Curvature","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Gas Dynamics and Kinetic Theory","field":"Mathematics","cited_by":4,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Pacific Institute for the Mathematical Sciences; University of Victoria","funders":"","keywords":"Geodesic; Constant (computer programming); Unit sphere; Mathematical analysis; Constant curvature; Mathematical physics; Poisson distribution; Curvature; Physics; Mathematics; Classical mechanics; Geometry","score_opus":0.04126219499595892,"score_gpt":0.3245754621433345,"score_spread":0.2833132671473756,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1584369597","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.22173344,0.0017867483,0.6975366,0.012655265,0.0003906486,0.005581699,0.00048744108,0.00026365006,0.059564546],"genre_scores_gemma":[0.961624,0.00015085531,0.03788056,0.000007594848,0.000015529018,0.0001332236,0.0000053542503,0.000032963075,0.00014989756],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985195,0.00020515842,0.00068585464,0.00015156051,0.00017917581,0.00025877816],"domain_scores_gemma":[0.98939383,0.00822781,0.0002855906,0.0019138738,0.00014133961,0.00003757815],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0012261427,0.00016238008,0.00039595301,0.000050009676,0.0001121636,0.000028455148,0.0010983933,0.00010782518,0.0000024850376],"category_scores_gemma":[0.00094886374,0.00009605559,0.00010657327,0.00026133476,0.00048866513,0.00005693781,0.00028472368,0.00019534808,0.0000053970566],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000017304721,0.00025764483,0.00018267179,0.00030132072,0.00002130544,2.6437488e-7,0.00033019125,0.000005366188,0.00015237994,0.99555725,0.000045874036,0.0031284487],"study_design_scores_gemma":[0.0005493605,0.000028062708,0.000023797747,0.0008747487,0.000028885914,0.0000022526272,0.0016883239,0.03877317,0.00016282403,0.95753,0.0002159551,0.00012262515],"about_ca_topic_score_codex":0.0000032983514,"about_ca_topic_score_gemma":0.00012430707,"teacher_disagreement_score":0.7398906,"about_ca_system_score_codex":0.0002521778,"about_ca_system_score_gemma":0.000050458548,"threshold_uncertainty_score":0.3917033},"labels":[],"label_agreement":null},{"id":"W1589958188","doi":"10.1007/s00220-012-1628-3","title":"Landauer-Büttiker Formula and Schrödinger Conjecture","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":18,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Agence Nationale de la Recherche","keywords":"Conjecture; Entropy (arrow of time); Limiting; Lattice (music); Transfer operator; Operator (biology); Stationary state; Norm (philosophy); Scattering","score_opus":0.12183759506110736,"score_gpt":0.397174788864502,"score_spread":0.27533719380339466,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1589958188","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5530774,0.0019622638,0.18832947,0.0038682183,0.00027329737,0.0028686477,0.000044663397,0.0009329578,0.24864309],"genre_scores_gemma":[0.8524229,0.000060881863,0.14688714,0.00013140577,0.00014241437,0.00011095591,0.000007606708,0.0000652582,0.00017144796],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9980764,0.00021953245,0.0006023487,0.0002194954,0.00030649005,0.0005757288],"domain_scores_gemma":[0.99416405,0.003357471,0.00016488433,0.002058537,0.000059907976,0.00019513289],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.001003342,0.0003149846,0.0005518622,0.00007378078,0.00019103466,0.000064223954,0.00080836116,0.0001560912,0.0001350065],"category_scores_gemma":[0.0009808595,0.0002685195,0.000117272444,0.0004209917,0.0004980803,0.00045587978,0.0006130735,0.00064188475,0.00021495437],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004812905,0.00083958043,0.0005606239,0.0002072027,0.000031333388,4.5925606e-7,0.0019221467,0.0000010708064,0.00027190422,0.9942785,0.0002757073,0.0016066922],"study_design_scores_gemma":[0.00037933013,0.000020803112,0.0002262598,0.00018076078,0.00006011536,0.000016924747,0.00023458747,0.0018355069,0.0005908511,0.99544275,0.0006965208,0.00031561602],"about_ca_topic_score_codex":0.0000017431137,"about_ca_topic_score_gemma":0.0000026067519,"teacher_disagreement_score":0.2993455,"about_ca_system_score_codex":0.00009400727,"about_ca_system_score_gemma":0.0000216161,"threshold_uncertainty_score":0.9999767},"labels":[],"label_agreement":null},{"id":"W1591761143","doi":"10.1007/s00220-015-2444-3","title":"Monopoles on Sasakian Three-folds","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Riemann surface; Holomorphic function; Gravitational singularity; Fibration; Bundle; Fiber bundle; Dirac (video compression format); Compact Riemann surface","score_opus":0.3628093410431122,"score_gpt":0.41362310048392426,"score_spread":0.05081375944081207,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1591761143","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.121695735,0.00032522166,0.22920641,0.0051869196,0.00019969812,0.0013806719,0.00002564581,0.0006712588,0.6413084],"genre_scores_gemma":[0.9042234,0.000009491576,0.09502557,0.00015042747,0.00006731749,0.000101189624,0.000010389729,0.000038375536,0.0003738705],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985367,0.00015846074,0.0004699457,0.00020752494,0.00034047564,0.00028686464],"domain_scores_gemma":[0.99549913,0.0011960525,0.00012226826,0.002933113,0.0001075491,0.00014188045],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006374032,0.00021085446,0.00035907543,0.000096977725,0.0001239962,0.00005582903,0.001419479,0.000097462944,0.000056783487],"category_scores_gemma":[0.0007173844,0.00019294277,0.0000989041,0.0005581702,0.00021241218,0.0001315214,0.00050793093,0.00038645658,0.0006551053],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000007675239,0.0010806653,0.00020939199,0.000043425396,0.000016557653,0.000001262631,0.0006450164,0.000045800844,0.000011623635,0.99339324,0.0018591596,0.0026861671],"study_design_scores_gemma":[0.00036950555,0.00006802592,0.00015590855,0.00011636892,0.000020803773,0.0000032746082,0.00043714143,0.012513493,0.00009233602,0.9847303,0.0012850555,0.00020779706],"about_ca_topic_score_codex":0.0000091707125,"about_ca_topic_score_gemma":0.000043313325,"teacher_disagreement_score":0.7825276,"about_ca_system_score_codex":0.00010715144,"about_ca_system_score_gemma":0.00005358876,"threshold_uncertainty_score":0.8420272},"labels":[],"label_agreement":null},{"id":"W1703988391","doi":"10.1007/s00220-015-2462-1","title":"Nondegeneracy of Nodal Solutions to the Critical Yamabe Problem","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Partial Differential Equations","field":"Mathematics","cited_by":35,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Mathematics; Nonlinear system; Sequence (biology); NODAL; Pure mathematics; Mathematical analysis; Mathematical physics; Physics; Quantum mechanics","score_opus":0.3259056665850994,"score_gpt":0.4460505118464784,"score_spread":0.12014484526137903,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1703988391","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.015579879,0.0001490337,0.9314655,0.020827383,0.0001350138,0.0014594565,0.000084509295,0.00014298376,0.030156214],"genre_scores_gemma":[0.67409337,0.000004923601,0.3253478,0.00009597705,0.00008566639,0.00021411284,0.000014950379,0.000028698449,0.00011450695],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99804085,0.00035437878,0.0007146725,0.00017287904,0.00040373634,0.00031349843],"domain_scores_gemma":[0.99447876,0.0025039315,0.00011267494,0.0023499364,0.00039379654,0.00016088369],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0009622795,0.00016041759,0.0003303752,0.000069372545,0.00019036194,0.000042656506,0.0013508515,0.00007073758,0.00003694535],"category_scores_gemma":[0.0041517327,0.000125196,0.000106851585,0.00068956637,0.0004126764,0.00014006905,0.00086324994,0.00034925537,0.00029302263],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000053177423,0.0012159769,0.00002222415,0.000052890904,0.000015451611,1.905788e-7,0.0023553425,0.00017520801,0.00027169706,0.99287784,0.0020330842,0.00097479316],"study_design_scores_gemma":[0.00022885972,0.000044015298,0.000033995766,0.00010477877,0.00005322822,0.0000022909398,0.00037517873,0.02941486,0.00039095557,0.96822804,0.0009837649,0.0001400261],"about_ca_topic_score_codex":0.000019351437,"about_ca_topic_score_gemma":0.00010321768,"teacher_disagreement_score":0.6585135,"about_ca_system_score_codex":0.00008764328,"about_ca_system_score_gemma":0.00016078263,"threshold_uncertainty_score":0.5105345},"labels":[],"label_agreement":null},{"id":"W1750423306","doi":"10.1007/s00220-015-2383-z","title":"The Moduli Space of Asymptotically Cylindrical Calabi–Yau Manifolds","year":2015,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université du Québec à Montréal","funders":"","keywords":"Calabi–Yau manifold; Compactification (mathematics); Moduli space; Mathematics; Pure mathematics; Cohomology; Deformation theory; Mathematical analysis; Moduli; Physics","score_opus":0.16099951413198757,"score_gpt":0.3807470188638198,"score_spread":0.21974750473183222,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1750423306","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.05734385,0.0023858037,0.51423943,0.015493305,0.0008596411,0.005316529,0.00020690166,0.00069943257,0.40345508],"genre_scores_gemma":[0.7946226,0.00019812226,0.20376402,0.000032953885,0.00013979973,0.00029550376,0.00004570608,0.00010137578,0.00079990015],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9957219,0.0007234086,0.0016613688,0.00047412212,0.0008702563,0.0005489621],"domain_scores_gemma":[0.98486966,0.005994836,0.0006992123,0.00760578,0.0006401423,0.00019037511],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00238943,0.0005249143,0.0011341355,0.00011536226,0.0002690521,0.00013914099,0.0049821734,0.00051166234,0.000040035833],"category_scores_gemma":[0.0031532361,0.0004116617,0.0003865143,0.00065933575,0.0009725501,0.000084635285,0.006379771,0.0020277451,0.00012699235],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001552766,0.0014441101,0.00006334061,0.00056760444,0.00011368687,0.0000015949189,0.0010582875,0.000205956,0.000021530072,0.99416953,0.0013817732,0.0009570398],"study_design_scores_gemma":[0.00030247305,0.00004903515,0.00010552356,0.00046661988,0.0001454159,0.000005171766,0.00048933056,0.044930562,0.00007916172,0.95235825,0.0006899642,0.00037850472],"about_ca_topic_score_codex":0.000015947913,"about_ca_topic_score_gemma":0.000046646186,"teacher_disagreement_score":0.73727876,"about_ca_system_score_codex":0.00024386252,"about_ca_system_score_gemma":0.00036590896,"threshold_uncertainty_score":0.9998335},"labels":[],"label_agreement":null},{"id":"W1750902231","doi":"10.1007/s00220-015-2395-8","title":"The Radiative Transfer Equation in the Forward-Peaked Regime","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Numerical methods in inverse problems","field":"Mathematics","cited_by":12,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Simon Fraser University","funders":"","keywords":"Radiative transfer; Mathematics; Mathematical analysis; Laplace operator; Scattering; Operator (biology); Regularization (linguistics); Paraxial approximation; Stereographic projection; Physics; Geometry; Quantum mechanics; Optics","score_opus":0.37563921989778115,"score_gpt":0.4363735505973104,"score_spread":0.06073433069952927,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1750902231","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0021172124,0.0003484449,0.9159733,0.012132428,0.000104522995,0.0017418951,0.0000062775853,0.00009967625,0.06747622],"genre_scores_gemma":[0.54157853,0.00017647917,0.45641604,0.00043843233,0.00008313502,0.0010302098,0.000010576718,0.00006140225,0.00020521005],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99646884,0.0017989505,0.00072764506,0.00019160181,0.00048147223,0.0003314845],"domain_scores_gemma":[0.98353374,0.013500363,0.00011995267,0.002649628,0.00012923652,0.00006708744],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0048605837,0.00019320131,0.0003307235,0.000049933642,0.00022747925,0.000090141984,0.002144944,0.00009330314,0.000008077944],"category_scores_gemma":[0.0053510475,0.000117421085,0.00010707165,0.00088838016,0.0005888928,0.00019466622,0.00024447,0.0007379899,0.00010407445],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010851837,0.00043037473,0.000037024307,0.000029072076,0.000015095161,5.6647036e-7,0.010927583,0.00008221405,0.000012516502,0.981239,0.00080075563,0.00641494],"study_design_scores_gemma":[0.00046727393,0.000030388152,0.000028209384,0.00007742239,0.000026026531,0.0000023859338,0.0031843784,0.05770752,0.000049531016,0.9357392,0.002549342,0.00013829368],"about_ca_topic_score_codex":0.00001317637,"about_ca_topic_score_gemma":0.000031488096,"teacher_disagreement_score":0.5394613,"about_ca_system_score_codex":0.00019428867,"about_ca_system_score_gemma":0.000084837535,"threshold_uncertainty_score":0.640609},"labels":[],"label_agreement":null},{"id":"W1758079917","doi":"10.1007/s00220-002-0700-9","title":"Surfaces and the Sklyanin bracket","year":2002,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Homotopy and Cohomology in Algebraic Topology","field":"Mathematics","cited_by":14,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; McGill University","funders":"","keywords":"Poisson manifold; Poisson bracket; Integrable system; Moduli space; Poisson distribution; Lie group; Poisson algebra; Invariant (physics); Lie algebra; Algebraic number","score_opus":0.09998188542348227,"score_gpt":0.3464241950801785,"score_spread":0.24644230965669625,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1758079917","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.49003005,0.0046918187,0.024352284,0.066530526,0.00019292245,0.0023183639,0.000017772501,0.00045618092,0.41141006],"genre_scores_gemma":[0.9741515,0.0004009956,0.024298506,0.00029494328,0.00002549667,0.000105634164,0.000001667587,0.000017455806,0.0007037843],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99867165,0.0004912993,0.00037588674,0.00014659607,0.0001123477,0.00020223246],"domain_scores_gemma":[0.9928354,0.0053566108,0.00010052324,0.0016378687,0.000032774456,0.00003682717],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00070484437,0.0001318416,0.0003273188,0.000027016957,0.00021888578,0.000029732719,0.0008817873,0.00009518587,0.0002498828],"category_scores_gemma":[0.00092346256,0.00009101065,0.000057625697,0.00021349506,0.0018304746,0.0000813365,0.00045555164,0.00042068856,0.00015969464],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000041057983,0.0002674465,0.00010773762,0.000027905899,0.000019294064,8.468081e-7,0.002639225,8.5350916e-7,0.0000075335897,0.99362254,0.00071612076,0.0025863606],"study_design_scores_gemma":[0.00065232546,0.000011813076,0.00008991756,0.00002989913,0.000028202961,0.00002030812,0.00030691712,0.01670363,0.00002252855,0.9815169,0.00051732105,0.00010021311],"about_ca_topic_score_codex":0.0000043687123,"about_ca_topic_score_gemma":0.000017765296,"teacher_disagreement_score":0.48412147,"about_ca_system_score_codex":0.000017925502,"about_ca_system_score_gemma":0.0000069223493,"threshold_uncertainty_score":0.674446},"labels":[],"label_agreement":null},{"id":"W1808899688","doi":"10.1007/s00220-010-1078-8","title":"Fluctuations of the Nodal Length of Random Spherical Harmonics","year":2010,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":68,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal","funders":"","keywords":"Spherical harmonics; Eigenvalues and eigenvectors; Gaussian; Harmonics; Laplace transform; Spin-weighted spherical harmonics; Random variable; Probability distribution; Space (punctuation)","score_opus":0.0816789991493451,"score_gpt":0.3452868129002587,"score_spread":0.2636078137509136,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1808899688","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.775052,0.00009714181,0.17799965,0.001791913,0.00019307178,0.0010851385,0.00003849083,0.00007979063,0.04366281],"genre_scores_gemma":[0.83575034,0.000011175361,0.16405818,0.000016878397,0.000019047984,0.00003642619,0.0000028904526,0.000015901487,0.00008916125],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99858725,0.00016744873,0.00068334816,0.00011651031,0.00028717602,0.00015829368],"domain_scores_gemma":[0.9942475,0.0025103302,0.00028956225,0.0027486226,0.00016707476,0.00003688496],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005576396,0.00013124832,0.00038450357,0.000035676345,0.00011682102,0.000011710824,0.0016550301,0.00008959852,0.0001385566],"category_scores_gemma":[0.0012982232,0.00009780853,0.00018814142,0.00067102193,0.00058547483,0.00007715305,0.00059959746,0.00055918813,0.000015576192],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000066376883,0.0010539237,0.00019363195,0.0001044769,0.000024866335,6.035186e-8,0.0007096599,0.000033288332,0.0043137358,0.9926793,0.00012885101,0.0007515743],"study_design_scores_gemma":[0.0005361854,0.000015381378,0.00093737926,0.00006466661,0.000046383095,0.0000027509498,0.00028633373,0.014476827,0.0033415074,0.9798948,0.00029528802,0.00010245646],"about_ca_topic_score_codex":0.0000061945825,"about_ca_topic_score_gemma":0.000027957018,"teacher_disagreement_score":0.060698345,"about_ca_system_score_codex":0.000015272051,"about_ca_system_score_gemma":0.00006787797,"threshold_uncertainty_score":0.3988516},"labels":[],"label_agreement":null},{"id":"W1821918867","doi":"10.1007/s00220-003-1014-2","title":"K�hler Reduction of Metrics with Holonomy G 2","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":66,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université du Québec à Montréal","funders":"Natural Sciences and Engineering Research Council of Canada; National Science Foundation","keywords":"Holonomy; Symplectic geometry; Mathematics; Pure mathematics; Infinitesimal; Isometry (Riemannian geometry); Torsion (gastropod); Reduction (mathematics); Manifold (fluid mechanics); Mathematical analysis; Geometry; Engineering","score_opus":0.13830724176437542,"score_gpt":0.35801409765107195,"score_spread":0.21970685588669653,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1821918867","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.34466836,0.00016842883,0.58733356,0.0011300945,0.000046193898,0.00082201464,0.000008472759,0.00016036237,0.065662526],"genre_scores_gemma":[0.7196041,0.000016176276,0.2802411,0.000009137973,0.000015285423,0.00004052641,0.000004794387,0.0000160242,0.00005288472],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989953,0.00006711588,0.00041853794,0.00014071072,0.00021461817,0.00016372415],"domain_scores_gemma":[0.99742895,0.0004524424,0.00018308536,0.0017687157,0.0001260259,0.000040779425],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00033391322,0.000132154,0.00030497616,0.00013157295,0.00007811964,0.000016177044,0.0007239584,0.000060535895,0.000026635378],"category_scores_gemma":[0.00022171727,0.00011370053,0.00006444455,0.0011994166,0.0002676783,0.00014030271,0.00022196429,0.00024604818,0.000035164783],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000068553404,0.0011320473,0.00008291562,0.000105428546,0.000019693993,3.8618182e-7,0.00066009443,0.0001787882,0.00014510736,0.9965101,0.000034374163,0.001124221],"study_design_scores_gemma":[0.0004686644,0.000066631226,0.00017815798,0.00014412246,0.000038964783,0.000009903324,0.00041274627,0.00040489962,0.0015160603,0.99651,0.00011820029,0.00013160563],"about_ca_topic_score_codex":0.0000073646893,"about_ca_topic_score_gemma":0.0000042331258,"teacher_disagreement_score":0.37493572,"about_ca_system_score_codex":0.00007356283,"about_ca_system_score_gemma":0.000050776664,"threshold_uncertainty_score":0.46365732},"labels":[],"label_agreement":null},{"id":"W1871177843","doi":"10.1007/s00220-016-2680-1","title":"Constructive Tensor Field Theory: the $${T^4_3}$$ T 3 4 Model","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":28,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Tensor field; Mathematics; Propagator; Mathematical physics; Scalar field theory; Vertex (graph theory); Tensor (intrinsic definition); Renormalization; Field (mathematics); Symmetric tensor; Scalar (mathematics); Laplace operator; Rank (graph theory); Quartic function; Pure mathematics; Physics; Mathematical analysis; Discrete mathematics; Combinatorics; Exact solutions in general relativity; Quantum mechanics; Quantum gravity; Geometry","score_opus":0.028095141461266685,"score_gpt":0.2958880493447837,"score_spread":0.267792907883517,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1871177843","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.007861482,0.000024119712,0.83138525,0.0040430897,0.000032148564,0.000306093,0.00003857857,0.00003905739,0.15627015],"genre_scores_gemma":[0.99215263,0.0000087655135,0.0070948824,0.0002168758,0.00009940314,0.000093746414,0.000004609865,0.000022883267,0.00030623082],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989475,0.00017000294,0.0002926358,0.00017768753,0.00015769569,0.0002544868],"domain_scores_gemma":[0.9956535,0.0022982194,0.000088261026,0.0018130671,0.000090225265,0.000056733777],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00032232722,0.00016494001,0.00022643681,0.00001687044,0.00019092362,0.00003689604,0.0010713008,0.000047009507,0.00021020946],"category_scores_gemma":[0.00007772694,0.000089050685,0.00012716108,0.0001948619,0.00083050196,0.00013327828,0.00045348116,0.00032788856,0.0002386697],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000007721534,0.00024529736,0.00023720559,0.000004678131,0.000028512,6.3736096e-8,0.0003000093,0.000023038257,0.00004994742,0.9734049,0.00020083772,0.025497831],"study_design_scores_gemma":[0.00030611316,0.000012646126,0.000027447493,0.000071714916,0.000026772308,3.280845e-7,0.00032286858,0.010667535,0.00059433084,0.987657,0.00016825373,0.00014495048],"about_ca_topic_score_codex":0.0000034640395,"about_ca_topic_score_gemma":4.7378575e-7,"teacher_disagreement_score":0.98429114,"about_ca_system_score_codex":0.000024417513,"about_ca_system_score_gemma":0.000043848657,"threshold_uncertainty_score":0.36313814},"labels":[],"label_agreement":null},{"id":"W1914382975","doi":"10.1007/s00220-015-2495-5","title":"Beyond Bell’s Theorem II: Scenarios with Arbitrary Causal Structure","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Applications","field":"Physics and Astronomy","cited_by":89,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Hidden variable theory; Formalism (music); Generalization; Causal structure; Bayesian network; Inference; Quantum; Causal model; Feature (linguistics)","score_opus":0.033023502601530696,"score_gpt":0.2906810433918877,"score_spread":0.257657540790357,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1914382975","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.4056803,0.00025656464,0.39536348,0.0042621735,0.00010381824,0.0017529696,0.00030518128,0.00021972363,0.19205579],"genre_scores_gemma":[0.9746335,0.000003099509,0.024798552,0.00009121928,0.0000959357,0.000112510796,0.00014233461,0.000032815427,0.00008999732],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99898833,0.000067687375,0.00029594413,0.00020664296,0.00020411768,0.00023725678],"domain_scores_gemma":[0.9977314,0.00015490167,0.00011179597,0.0017584731,0.000111299094,0.00013214174],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00017065993,0.00018924879,0.00024887818,0.000036091773,0.00025205303,0.000050509883,0.0008640591,0.000047576214,0.00009648287],"category_scores_gemma":[0.0000111518375,0.00015442577,0.000052734096,0.00038819748,0.00020873148,0.00014766787,0.00041578623,0.00044235165,0.00006597827],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004395688,0.00050109153,0.00022884652,0.000007568315,0.000025079049,2.3678719e-7,0.0010481387,0.00006218606,0.000103968625,0.99567133,0.0003702156,0.001976953],"study_design_scores_gemma":[0.0003866473,0.00003452671,0.000027003263,0.000042814096,0.000028683331,0.0000015007037,0.0007483506,0.024709536,0.00028607008,0.9724691,0.0010711063,0.00019469368],"about_ca_topic_score_codex":0.000019327732,"about_ca_topic_score_gemma":0.000009315099,"teacher_disagreement_score":0.5689532,"about_ca_system_score_codex":0.00004252042,"about_ca_system_score_gemma":0.00014449192,"threshold_uncertainty_score":0.62973},"labels":[],"label_agreement":null},{"id":"W1914999830","doi":"10.1007/s00220-016-2611-1","title":"Representations of Canonical Commutation Relations Describing Infinite Coherent States","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Memorial University of Newfoundland","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Coherent states; Quantum decoherence; Hilbert space; Statistical physics; Phase space; Quantum mechanics; Physics; Gaussian; Mathematics; Quantum","score_opus":0.07893221332612842,"score_gpt":0.3228618328624741,"score_spread":0.24392961953634568,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1914999830","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.012805992,0.000046882844,0.972333,0.0026085447,0.000029153793,0.00024997274,0.000012057818,0.000097533244,0.01181684],"genre_scores_gemma":[0.8735636,0.00008711168,0.12613207,0.00007733621,0.0000053816098,0.00007727463,0.000018999763,0.000007303728,0.000030909065],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998543,0.00019514559,0.0007083186,0.00013741276,0.0002458531,0.0001702223],"domain_scores_gemma":[0.9959075,0.0016454285,0.00024246855,0.0019407236,0.0002016917,0.00006222893],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00038379384,0.00010954263,0.000193984,0.00015016111,0.00015027408,0.000053251686,0.0013388704,0.00005001716,0.000035289246],"category_scores_gemma":[0.00025909027,0.00008499388,0.00008787941,0.0008578559,0.00031870208,0.0008218899,0.00045460745,0.00015836551,0.00011506398],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000019148347,0.00024093111,0.0011432609,0.000013734672,0.000011810497,1.2779064e-7,0.001832833,0.00018328059,0.00027353206,0.9833149,0.00018482536,0.012798906],"study_design_scores_gemma":[0.0005328771,0.000032290773,0.0034667405,0.00025191388,0.000011403483,0.0000026360563,0.00036609068,0.13164909,0.00076591363,0.86223197,0.0005155583,0.0001735283],"about_ca_topic_score_codex":0.0000137968755,"about_ca_topic_score_gemma":0.000019251807,"teacher_disagreement_score":0.8607576,"about_ca_system_score_codex":0.00006087441,"about_ca_system_score_gemma":0.000083564395,"threshold_uncertainty_score":0.346595},"labels":[],"label_agreement":null},{"id":"W1964928173","doi":"10.1007/s00220-003-0996-0","title":"A Two Dimensional Fermi Liquid. Part 1: Overview","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Cold Atom Physics and Bose-Einstein Condensates","field":"Physics and Astronomy","cited_by":58,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Fermi Gamma-ray Space Telescope; Radius of convergence; Fermion; Perturbation (astronomy); Physics; Fermi surface; Discontinuity (linguistics); Statistical physics; Mathematical physics; Series (stratigraphy); Mathematics; Convergence (economics); Mathematical analysis; Quantum mechanics; Power series; Superconductivity","score_opus":0.07081269004724101,"score_gpt":0.34315593555474516,"score_spread":0.27234324550750416,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1964928173","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.81629086,0.001440335,0.012216393,0.0057320604,0.00025317684,0.0015302916,0.0001240153,0.00026396618,0.16214891],"genre_scores_gemma":[0.99220437,0.000016262517,0.007118067,0.00016464043,0.00016488982,0.00012987046,0.0000682111,0.000027792266,0.000105901796],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987945,0.00006704791,0.00041986397,0.00022775363,0.00021309686,0.0002777683],"domain_scores_gemma":[0.9978563,0.00030127235,0.000111924535,0.0015661682,0.00007747467,0.00008682464],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00017975144,0.00020752085,0.00031842012,0.000033205426,0.00019290426,0.000060218103,0.0007533347,0.000030473166,0.000223893],"category_scores_gemma":[0.000013118373,0.00019466155,0.00015979265,0.00037310252,0.00019689238,0.00017791025,0.0005550382,0.00033254467,0.0003886426],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004259803,0.0009738467,0.00018968752,0.000020314996,0.000031300584,6.007405e-7,0.00020495975,0.0006147266,0.00041017326,0.99393684,0.00006355268,0.0035497323],"study_design_scores_gemma":[0.00076512294,0.00002906606,0.000074633965,0.00027145725,0.000028569759,7.680516e-7,0.000083818675,0.002297785,0.0015163195,0.99325734,0.0014132835,0.00026185645],"about_ca_topic_score_codex":0.000052946903,"about_ca_topic_score_gemma":0.000009384027,"teacher_disagreement_score":0.17591351,"about_ca_system_score_codex":0.00006272132,"about_ca_system_score_gemma":0.000102289145,"threshold_uncertainty_score":0.7938068},"labels":[],"label_agreement":null},{"id":"W1965453520","doi":"10.1007/s002200200648","title":"Decay Rates and Probability Estimates¶for Massive Dirac Particles¶in the Kerr-Newman Black Hole Geometry","year":2002,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":52,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Dirac (video compression format); Dirac equation; Propagator; Event horizon; Physics; Mathematical physics; Bounded function; Angular momentum; Cauchy distribution; Wave function; Black hole (networking); Quantum mechanics; Event (particle physics); Mathematics; Mathematical analysis","score_opus":0.05139181129031352,"score_gpt":0.31517760997176364,"score_spread":0.26378579868145013,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1965453520","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8164696,0.00041627386,0.13380426,0.006402624,0.000035227164,0.0026504563,0.00010086235,0.000071665105,0.04004901],"genre_scores_gemma":[0.98714143,0.000012713857,0.0123833995,0.00007677232,0.000050709816,0.00026436805,0.000024052673,0.000021172904,0.000025380008],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987658,0.00014862225,0.00039647042,0.0002353283,0.00013641194,0.00031733146],"domain_scores_gemma":[0.99675983,0.0016616379,0.00012207859,0.0013331055,0.000060173872,0.00006314505],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00043898684,0.00018824326,0.00029820512,0.000026449286,0.00017296051,0.00010302524,0.0007237808,0.00004512025,0.000058721773],"category_scores_gemma":[0.000089964844,0.0001415779,0.00009291003,0.00039759386,0.0008044861,0.00015126311,0.00026302552,0.00034289306,0.00006882571],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000003691675,0.0012038623,0.0024249456,0.000056707544,0.000016740358,1.5359873e-7,0.0013639602,0.00021103007,0.00001897028,0.9900519,0.000111305955,0.004536678],"study_design_scores_gemma":[0.0003622762,0.000025094603,0.0009382077,0.000056468216,0.00003074501,1.2953434e-7,0.00061986997,0.12650809,0.00027575073,0.87094563,0.000088407905,0.00014933717],"about_ca_topic_score_codex":0.000008449813,"about_ca_topic_score_gemma":0.0000024874068,"teacher_disagreement_score":0.1706718,"about_ca_system_score_codex":0.00002512693,"about_ca_system_score_gemma":0.000011030329,"threshold_uncertainty_score":0.5773379},"labels":[],"label_agreement":null},{"id":"W1969598027","doi":"10.1007/s00220-008-0528-z","title":"Braided Hopf Algebras Obtained from Coquasitriangular Hopf Algebras","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Mount Allison University","funders":"","keywords":"Hopf algebra; Quantum group; Representation theory of Hopf algebras; Mathematics; Quasitriangular Hopf algebra; Pure mathematics; Complex system; Algebra over a field; Algebra representation; Division algebra; Computer science","score_opus":0.09468326719079721,"score_gpt":0.3338927539087234,"score_spread":0.2392094867179262,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1969598027","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9465906,0.0006376176,0.03609564,0.0013994519,0.00028305434,0.0011196436,0.00003717408,0.00044543063,0.0133914],"genre_scores_gemma":[0.9290424,0.00014796098,0.069777966,0.0002735856,0.00022337884,0.0001293459,0.000070913295,0.00009690961,0.00023756265],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9969939,0.00038918204,0.0010265168,0.00046994886,0.0005942665,0.00052618707],"domain_scores_gemma":[0.99205405,0.003105471,0.00032929456,0.0041358285,0.00018445149,0.00019091905],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00039624042,0.0004479607,0.00087727327,0.00010711156,0.0006142439,0.00006793447,0.0021861135,0.00027896182,0.00026005015],"category_scores_gemma":[0.0012718323,0.00042876642,0.00029489773,0.00071874994,0.0005810593,0.0002939729,0.0008632981,0.0007556995,0.00022984622],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001930967,0.0007221901,0.0002847639,0.000046592668,0.00009270638,0.000008749768,0.0028147942,0.00000893962,0.00013805849,0.99384636,0.0012902324,0.00072729064],"study_design_scores_gemma":[0.0012148968,0.000037539343,0.000400795,0.00013354016,0.000079610814,0.000012170995,0.00030220157,0.004757187,0.00042308163,0.9917858,0.0003918227,0.00046133],"about_ca_topic_score_codex":0.00007734402,"about_ca_topic_score_gemma":0.000020802067,"teacher_disagreement_score":0.033682328,"about_ca_system_score_codex":0.00017174889,"about_ca_system_score_gemma":0.00015175625,"threshold_uncertainty_score":0.9998164},"labels":[],"label_agreement":null},{"id":"W1969647972","doi":"10.1007/s00220-007-0410-4","title":"Random Walk on the Incipient Infinite Cluster for Oriented Percolation in High Dimensions","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":77,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Carleton University; University of British Columbia","funders":"","keywords":"Random walk; Percolation (cognitive psychology); Conjecture; Mathematics; Cluster (spacecraft); Dimension (graph theory); Random graph; Simple random sample; Combinatorics; Graph; Statistical physics; Discrete mathematics; Physics; Computer science; Statistics","score_opus":0.1192624077415901,"score_gpt":0.35538077936247625,"score_spread":0.23611837162088617,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1969647972","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.062473256,0.000026110096,0.9308825,0.002883017,0.00006446938,0.0016870523,0.000040222796,0.000055212276,0.0018881621],"genre_scores_gemma":[0.8687935,0.000041648003,0.12984164,0.00038304678,0.000028967876,0.0007854927,0.000026745663,0.00003119958,0.00006780682],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984382,0.00017688434,0.00063996797,0.00020454063,0.00027099802,0.0002694475],"domain_scores_gemma":[0.9840544,0.014260688,0.00013830305,0.0013335025,0.0001583456,0.000054746983],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00068022654,0.00018496263,0.00036758924,0.00007545589,0.00032120934,0.000018888217,0.0005824985,0.00009027225,0.000025865165],"category_scores_gemma":[0.005710121,0.00013191477,0.000082139406,0.00048399394,0.00019756918,0.000078871104,0.00026613133,0.0003982531,0.000045453526],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000062511346,0.0008162758,0.000016190439,0.0000595784,0.000010817737,6.6186595e-7,0.0016098273,0.00013234532,0.00002009227,0.99646515,0.00042708608,0.00037945993],"study_design_scores_gemma":[0.0012094745,0.000059842743,0.00006902831,0.00018209463,0.000021043601,0.000002717428,0.00018372171,0.20385411,0.0000337289,0.79407597,0.00018142423,0.00012683103],"about_ca_topic_score_codex":0.000005409832,"about_ca_topic_score_gemma":0.000021832131,"teacher_disagreement_score":0.8063202,"about_ca_system_score_codex":0.000112397815,"about_ca_system_score_gemma":0.000056844514,"threshold_uncertainty_score":0.6835961},"labels":[],"label_agreement":null},{"id":"W1970218941","doi":"10.1007/s00220-011-1361-3","title":"Symmetry-Breaking Bifurcation in the Nonlinear Schrödinger Equation with Symmetric Potentials","year":2011,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":79,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McMaster University","funders":"Natural Sciences and Engineering Research Council of Canada; Alexander von Humboldt-Stiftung; National Science Foundation","keywords":"Pitchfork bifurcation; Bifurcation; Degenerate energy levels; Eigenvalues and eigenvectors; Nonlinear system; Symmetry breaking; Symmetry (geometry); Saddle-node bifurcation; Transcritical bifurcation; Mathematics; Bifurcation theory; Nonlinear Schrödinger equation; Physics; Mathematical analysis; Mathematical physics; Quantum mechanics; Geometry","score_opus":0.23057975696778818,"score_gpt":0.36991562674028433,"score_spread":0.13933586977249615,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1970218941","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.04867995,0.00015026086,0.855798,0.0007536801,0.0000438354,0.0023694716,0.000009784042,0.00022052963,0.09197448],"genre_scores_gemma":[0.6384603,0.000024747595,0.36103088,0.00007073149,0.000031225412,0.0002955527,0.000014577735,0.000050769664,0.000021214935],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9972225,0.00040832174,0.0009831301,0.0003516918,0.00058677903,0.0004475899],"domain_scores_gemma":[0.9933035,0.0032180527,0.00042547574,0.0028016968,0.00018918021,0.00006212822],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0016620941,0.0003255892,0.0005212789,0.00027885192,0.00019846836,0.000073547,0.001757331,0.0001233367,0.00003882811],"category_scores_gemma":[0.0012596587,0.00023245797,0.00010619289,0.0024723245,0.00036053883,0.0005355696,0.0003497295,0.00073073443,0.00012525643],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000011649226,0.0023303025,0.00011411316,0.00020976418,0.000022539312,0.0000022190118,0.0036902793,0.00002710443,0.0001001255,0.9894358,0.000020714186,0.004035412],"study_design_scores_gemma":[0.00048447918,0.000082385006,0.00016018626,0.00040737467,0.00006778761,0.000008901173,0.0009441238,0.020517135,0.00041447603,0.9765989,0.000026401436,0.00028783412],"about_ca_topic_score_codex":0.000020865002,"about_ca_topic_score_gemma":0.000024800986,"teacher_disagreement_score":0.58978033,"about_ca_system_score_codex":0.0001521773,"about_ca_system_score_gemma":0.000057939105,"threshold_uncertainty_score":0.94793606},"labels":[],"label_agreement":null},{"id":"W1970885754","doi":"10.1007/s00220-004-1128-1","title":"Solitary Wave Dynamics in an External Potential","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":179,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto; Fields Institute for Research in Mathematical Sciences; University of British Columbia","funders":"","keywords":"Physics; Dynamics (music); Point particle; Center of mass (relativistic); Classical mechanics; Nonlinear system; Motion (physics); Equations of motion; Inertial frame of reference; Point (geometry); Mathematical analysis; Mathematics; Quantum mechanics; Geometry","score_opus":0.09502154454273606,"score_gpt":0.3762443114280679,"score_spread":0.2812227668853319,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1970885754","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.11914732,0.00008678596,0.86315495,0.00086148334,0.000058040794,0.0009962854,0.000020993799,0.00022625668,0.015447864],"genre_scores_gemma":[0.60547954,0.000022893437,0.39414263,0.000067177985,0.000041186537,0.00012985135,0.000023995888,0.00006281166,0.000029928211],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9973434,0.00018943519,0.0010623065,0.00040283185,0.00043530363,0.00056667347],"domain_scores_gemma":[0.99561435,0.0007977154,0.00021849028,0.00309069,0.00011639687,0.00016238113],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0006190945,0.00035586287,0.0006367546,0.00013709553,0.0001392236,0.000063931104,0.0014431524,0.00016021893,0.00003451519],"category_scores_gemma":[0.0003920162,0.0003597192,0.00014750344,0.0006078399,0.00047100533,0.0007091157,0.0007257042,0.0009146033,0.00010623018],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010135662,0.003132234,0.00003681996,0.00017467553,0.000009897179,0.000013572848,0.0009300063,0.0010978439,0.0003336008,0.99227226,0.0000061692012,0.001982768],"study_design_scores_gemma":[0.00087565096,0.00005028694,0.00005631093,0.00037545623,0.000023245128,0.000013718306,0.0006403955,0.099285245,0.00017221493,0.898164,0.0000026837542,0.00034079698],"about_ca_topic_score_codex":0.00001663871,"about_ca_topic_score_gemma":0.00016887441,"teacher_disagreement_score":0.4863322,"about_ca_system_score_codex":0.000836404,"about_ca_system_score_gemma":0.00009602357,"threshold_uncertainty_score":0.9998855},"labels":[],"label_agreement":null},{"id":"W1972114209","doi":"10.1007/s00220-002-0787-z","title":"Enhanced Binding in Non-Relativistic QED","year":2003,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Chromodynamics and Particle Interactions","field":"Physics and Astronomy","cited_by":42,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Physics; Quantum electrodynamics","score_opus":0.03679867414390397,"score_gpt":0.338523296462489,"score_spread":0.30172462231858505,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1972114209","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.56050086,0.000010262326,0.2288735,0.00012165945,0.000044646684,0.00025799166,0.000008582882,0.000017556422,0.21016496],"genre_scores_gemma":[0.9933688,0.0000031292316,0.006238367,0.000009504672,0.000013626265,0.00011141291,0.00001778907,0.000015838,0.00022153635],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991156,0.00010749892,0.0003529919,0.00013634397,0.00008017971,0.0002074062],"domain_scores_gemma":[0.9984019,0.0006001966,0.000077653385,0.00084754504,0.00003085689,0.000041843607],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00020584752,0.000113567316,0.00019449154,0.000059719026,0.00009508751,0.000035889218,0.00032763238,0.000027159911,0.00017787915],"category_scores_gemma":[0.000056469253,0.000117138,0.000059389775,0.0004320615,0.00009517627,0.00013600335,0.00007871152,0.0003424253,0.00028516326],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000011380904,0.00071922614,0.0013440477,0.00000989427,0.000011210246,2.5194396e-7,0.0007374146,0.00041995422,0.0017958645,0.9938488,0.000011611594,0.0011006054],"study_design_scores_gemma":[0.0003796691,0.000009711471,0.0005975347,0.00013027701,0.0000096945205,3.6259672e-7,0.00046822513,0.14875764,0.001311394,0.8481031,0.00007332112,0.00015906383],"about_ca_topic_score_codex":0.000015931055,"about_ca_topic_score_gemma":0.0000105902955,"teacher_disagreement_score":0.43286797,"about_ca_system_score_codex":0.000059671438,"about_ca_system_score_gemma":0.000033020013,"threshold_uncertainty_score":0.47767487},"labels":[],"label_agreement":null},{"id":"W1973152599","doi":"10.1007/s00220-003-0817-5","title":"A Small-Scale Density of States Formula","year":2003,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Mathematics; Pointwise; Integrable system; Hamiltonian (control theory); Pure mathematics; Mathematical physics; Degenerate energy levels; Hamiltonian system; Quantum; Quantization (signal processing); Mathematical analysis; Quantum mechanics; Physics","score_opus":0.04242100910858519,"score_gpt":0.2899523171161481,"score_spread":0.2475313080075629,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1973152599","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5393805,0.000054811764,0.3934438,0.0001083612,0.000026311976,0.0003348713,0.00002217274,0.000024878027,0.06660434],"genre_scores_gemma":[0.97967505,0.00000481769,0.020154329,0.000009869839,0.0000121852145,0.000034386903,0.000020751711,0.000011192226,0.00007742495],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991829,0.00010798711,0.0003620648,0.000102184364,0.00008975556,0.00015512352],"domain_scores_gemma":[0.9984346,0.0003436959,0.000106616666,0.0010060618,0.00006201223,0.000047022117],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00022769973,0.000098653145,0.0002572262,0.000020045163,0.0000651365,0.000013318266,0.00037473853,0.000027423628,0.00005585967],"category_scores_gemma":[0.000020386398,0.000087291955,0.000088740264,0.00020166069,0.00014464844,0.000053933996,0.000119244076,0.00015576957,0.00003974642],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000012433551,0.00058053475,0.010441909,0.000036701156,0.000013503234,4.8510923e-8,0.0004492191,0.00006325712,0.00023821976,0.9870407,0.000016529386,0.0011181221],"study_design_scores_gemma":[0.00021870884,0.00001229562,0.00043325292,0.00006858816,0.000012356886,3.0321192e-7,0.00048140128,0.02979478,0.0011668326,0.96746254,0.00024262359,0.0001062891],"about_ca_topic_score_codex":0.000049185586,"about_ca_topic_score_gemma":0.000011203179,"teacher_disagreement_score":0.44029456,"about_ca_system_score_codex":0.000017254051,"about_ca_system_score_gemma":0.00002335121,"threshold_uncertainty_score":0.35596627},"labels":[],"label_agreement":null},{"id":"W1973522571","doi":"10.1007/s00220-012-1452-9","title":"A van Est Isomorphism for Bicrossed Product Hopf Algebras","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":10,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of New Brunswick","funders":"","keywords":"Hopf algebra; Mathematics; Isomorphism (crystallography); Representation theory of Hopf algebras; Pure mathematics; Quasitriangular Hopf algebra; Lie algebra; Quantum group; Algebra over a field; Universal enveloping algebra; Cohomology; Product (mathematics); Cellular algebra; Algebra representation","score_opus":0.11731232334423326,"score_gpt":0.37696714733202386,"score_spread":0.2596548239877906,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1973522571","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.60906905,0.0026924044,0.33211175,0.0058889617,0.001532102,0.008220767,0.00009867815,0.00094368827,0.03944261],"genre_scores_gemma":[0.8988845,0.00002665399,0.0999205,0.00010497696,0.0003028592,0.00046639217,0.000023231765,0.000065507855,0.0002054048],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99830276,0.000120038036,0.0005925197,0.00023245202,0.0002429142,0.0005092925],"domain_scores_gemma":[0.99518627,0.0016832862,0.00020600716,0.002659005,0.00013759942,0.0001278059],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006298761,0.00026270666,0.00046980125,0.00005776405,0.00031018708,0.000060379665,0.0011681488,0.00011163549,0.000056457684],"category_scores_gemma":[0.0010062407,0.00023827695,0.0001706594,0.00036148925,0.00028672602,0.00028003647,0.0004374609,0.00034680718,0.00007787671],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009601108,0.0009061804,0.00011462096,0.00015919222,0.00003289437,9.0789136e-8,0.0017439622,0.0000031255681,0.00015320559,0.9944843,0.0008178526,0.0015749624],"study_design_scores_gemma":[0.0005857128,0.000026620037,0.00008006611,0.00008475874,0.00006171512,0.000004147472,0.00016904596,0.0015126358,0.00060737756,0.99473876,0.0018504419,0.00027870465],"about_ca_topic_score_codex":0.000004605723,"about_ca_topic_score_gemma":0.0000028543582,"teacher_disagreement_score":0.28981543,"about_ca_system_score_codex":0.000100766825,"about_ca_system_score_gemma":0.000059299495,"threshold_uncertainty_score":0.9716652},"labels":[],"label_agreement":null},{"id":"W1973862918","doi":"10.1007/s00220-014-2187-6","title":"Universal Subspaces for Local Unitary Groups of Fermionic Systems","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Guelph; University of Waterloo","funders":"","keywords":"Orthonormal basis; Linear subspace; Subspace topology; Unitary state; Hilbert space; Basis (linear algebra); Space (punctuation); Unitary operator","score_opus":0.11373822844839908,"score_gpt":0.3959738871730179,"score_spread":0.2822356587246188,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1973862918","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.05159299,0.00018971962,0.9419945,0.00037103394,0.000040109964,0.0010017555,0.000017330882,0.00008121355,0.0047113434],"genre_scores_gemma":[0.9179081,0.00003705012,0.08168818,0.000010960193,0.00003174075,0.00014522554,0.000018468221,0.000041456606,0.000118817756],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984218,0.0003232922,0.00052023574,0.00017983779,0.00027296637,0.00028187607],"domain_scores_gemma":[0.99233884,0.005143004,0.00014985261,0.0020344858,0.00025920858,0.000074604584],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00087906426,0.0001621229,0.00045594142,0.00008971299,0.00013435181,0.000022141277,0.0012089472,0.000093769435,0.000009421004],"category_scores_gemma":[0.0009785597,0.0001519165,0.00009617851,0.0004370063,0.00057676795,0.00018507344,0.000408919,0.0003098039,0.000021152346],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000012605922,0.00045845704,0.000047809914,0.000512251,0.000022958831,1.8075521e-7,0.00043794027,0.00041406785,0.00009730462,0.9965089,0.00010370921,0.0013838086],"study_design_scores_gemma":[0.0004718281,0.00006844573,0.000015932677,0.00020289687,0.000024426885,0.0000017125141,0.0012369654,0.1733091,0.0002382213,0.8241148,0.0001792249,0.00013643442],"about_ca_topic_score_codex":0.000007846157,"about_ca_topic_score_gemma":0.000017939705,"teacher_disagreement_score":0.8663151,"about_ca_system_score_codex":0.00013223688,"about_ca_system_score_gemma":0.00006642899,"threshold_uncertainty_score":0.6194975},"labels":[],"label_agreement":null},{"id":"W1974998275","doi":"10.1007/s00220-008-0580-8","title":"Random Repeated Interaction Quantum Systems","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum many-body systems","field":"Physics and Astronomy","cited_by":24,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Memorial University of Newfoundland","funders":"","keywords":"Ergodic theory; Quantum; Quantum system; Coupling (piping); State (computer science); Weak interaction; Fermion; Perturbation theory (quantum mechanics); Perturbation (astronomy)","score_opus":0.07542306994159308,"score_gpt":0.3265600230016582,"score_spread":0.2511369530600651,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1974998275","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.54782486,0.00035842916,0.29111218,0.000496374,0.00053937116,0.0018031013,0.000036752248,0.00032996092,0.15749894],"genre_scores_gemma":[0.997657,0.000015116463,0.0015190551,0.000010773866,0.00014627737,0.0002356819,0.00006700171,0.000031322226,0.00031778516],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9984067,0.0003010215,0.00065505534,0.00020342568,0.00020088081,0.00023289073],"domain_scores_gemma":[0.99698794,0.0006557944,0.0002239489,0.0019591777,0.000108360924,0.0000647685],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003446713,0.00018101906,0.00040102468,0.00006761456,0.00024546418,0.00005260471,0.0007371747,0.000046818022,0.0000627197],"category_scores_gemma":[0.00004995125,0.0001711201,0.000118311546,0.00037809074,0.00021509289,0.00024818865,0.00022370143,0.0003838023,0.00056462357],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000014290032,0.00076495577,0.0031053985,0.00005644888,0.00005626039,0.000001492329,0.0014348835,0.00047429468,0.0002808611,0.9923588,0.00088315853,0.0005691497],"study_design_scores_gemma":[0.001504218,0.000029557576,0.0004352811,0.00038703447,0.000036505804,0.000016580341,0.0018609689,0.8380834,0.00019950914,0.15454112,0.0025093488,0.00039648594],"about_ca_topic_score_codex":0.00014427601,"about_ca_topic_score_gemma":0.000001225206,"teacher_disagreement_score":0.83781767,"about_ca_system_score_codex":0.00006747981,"about_ca_system_score_gemma":0.00004490839,"threshold_uncertainty_score":0.7257282},"labels":[],"label_agreement":null},{"id":"W1975952948","doi":"10.1007/s00220-014-2184-9","title":"Parabolic Refined Invariants and Macdonald Polynomials","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic Geometry and Number Theory","field":"Mathematics","cited_by":32,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"","keywords":"Mathematics; Symplectic geometry; Pure mathematics; Orbifold; Macdonald polynomials; Context (archaeology); Character (mathematics); Conjecture; Holomorphic function; Cohomology; Stack (abstract data type); String (physics); Algebra over a field; Geometry; Orthogonal polynomials; Difference polynomials; Computer science","score_opus":0.07935860493841036,"score_gpt":0.34637876193920963,"score_spread":0.2670201570007993,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1975952948","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.53234476,0.0006304981,0.16962652,0.009159887,0.0001529263,0.0014345977,0.000024914818,0.0004903691,0.28613555],"genre_scores_gemma":[0.94622314,0.00006498406,0.052911624,0.00031802309,0.000059697057,0.00006538644,0.000007817667,0.000029876997,0.0003194777],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985555,0.0003738895,0.00047720934,0.00019575149,0.00015878596,0.00023887317],"domain_scores_gemma":[0.99439263,0.0034829811,0.00013797516,0.0018555884,0.000043215932,0.00008759518],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0011728214,0.00017346298,0.00039733518,0.00006528771,0.00015770427,0.000040864135,0.00074567046,0.00009780912,0.00008102133],"category_scores_gemma":[0.0016700297,0.00016082068,0.000056270474,0.0003281874,0.00033987174,0.00013449752,0.00050673925,0.00031588445,0.00014530541],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000062627205,0.0003120396,0.00013308562,0.00008669775,0.00001603243,2.424656e-7,0.0004473837,6.712951e-7,0.000116646785,0.99145025,0.00035733302,0.0070733833],"study_design_scores_gemma":[0.00039105743,0.00001765812,0.000504481,0.00009004318,0.000027817261,0.0000069948683,0.00010081915,0.0032978784,0.00020284351,0.9939521,0.0012319789,0.00017636141],"about_ca_topic_score_codex":0.0000036376862,"about_ca_topic_score_gemma":0.0000045771617,"teacher_disagreement_score":0.41387838,"about_ca_system_score_codex":0.000027018381,"about_ca_system_score_gemma":0.000020119922,"threshold_uncertainty_score":0.6558077},"labels":[],"label_agreement":null},{"id":"W1976008060","doi":"10.1007/s00220-015-2357-1","title":"On the Asymptotic Behavior of a Log Gas in the Bulk Scaling Limit in the Presence of a Varying External Potential I","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":31,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal","funders":"Banff International Research Station for Mathematical Innovation and Discovery; Indiana University-Purdue University Indianapolis; Purdue University; Concordia University; Imperial College London; National Science Foundation","keywords":"Scaling; Fredholm determinant; Limit (mathematics); Interval (graph theory); Integrable system; Kernel (algebra); Scaling limit; Operator (biology)","score_opus":0.16569628573253417,"score_gpt":0.3802536069643645,"score_spread":0.21455732123183033,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1976008060","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.96223474,0.0001100336,0.02146703,0.0018793386,0.000040611725,0.0019165411,0.000009994349,0.000027428921,0.012314295],"genre_scores_gemma":[0.98259157,0.000017418293,0.016864726,0.00011741705,0.000034043915,0.00033461608,0.0000022328306,0.000030499645,0.0000075027206],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9960434,0.001418581,0.0011152049,0.00020958413,0.0008685913,0.00034464913],"domain_scores_gemma":[0.98083556,0.015377526,0.00039374697,0.0032303056,0.00012211714,0.000040744293],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.004277047,0.00025184444,0.00052966736,0.00009364844,0.00009779319,0.00005371921,0.0038301894,0.00009481874,0.000019790892],"category_scores_gemma":[0.0039531034,0.00014106598,0.0001771924,0.00096409937,0.00084652513,0.00014426041,0.0004641956,0.00098581,0.00002454864],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00002390209,0.0032265414,0.00007646077,0.00013857985,0.000011896279,0.0000041611097,0.013993218,0.0005713571,0.00041906824,0.981074,0.000034051736,0.0004268059],"study_design_scores_gemma":[0.0004150599,0.00007141383,0.00016856017,0.00075051485,0.00006463328,0.0000122770525,0.0030443424,0.028094044,0.0005285804,0.96671337,0.0000014375747,0.0001357547],"about_ca_topic_score_codex":0.000020276211,"about_ca_topic_score_gemma":0.000012835525,"teacher_disagreement_score":0.027522687,"about_ca_system_score_codex":0.000085313804,"about_ca_system_score_gemma":0.00007020532,"threshold_uncertainty_score":0.71175086},"labels":[],"label_agreement":null},{"id":"W1977673587","doi":"10.1007/s00220-014-2260-1","title":"A Combinatorial Approach to Nonlocality and Contextuality","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Complexity and Algorithms in Graphs","field":"Computer Science","cited_by":185,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Agence Nationale de la Recherche","keywords":"Kochen–Specker theorem; Quantum nonlocality; Quantum; Formalism (music); Graph; Probabilistic logic; Diagrammatic reasoning; Qubit; Hierarchy","score_opus":0.1682497022073137,"score_gpt":0.3497480707735672,"score_spread":0.18149836856625348,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1977673587","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0019995961,0.00006499858,0.9549099,0.0012012254,0.00007183064,0.00027899846,0.0000032655284,0.000089062734,0.041381083],"genre_scores_gemma":[0.60564905,0.0000039880492,0.39406276,0.00019413154,0.000022098311,0.00005170511,0.0000030337003,0.0000044995454,0.000008696162],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988575,0.00023013937,0.00028036683,0.00023290818,0.0002261229,0.00017294989],"domain_scores_gemma":[0.9970926,0.0004061803,0.00004574422,0.0021704778,0.00010851274,0.00017650618],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0009176554,0.00010844865,0.00022843866,0.000041783853,0.00010580611,0.00011664449,0.0018431774,0.00004437551,6.11803e-7],"category_scores_gemma":[0.00031550968,0.00010513271,0.000035179604,0.0005732935,0.00026079777,0.00023103891,0.0017987093,0.00023912587,0.000032111533],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000018426149,0.00062676746,0.000052167972,0.000014897266,0.0000041437975,1.6424379e-7,0.0021912523,0.000010303065,0.000003210403,0.99078536,0.000138562,0.0061713425],"study_design_scores_gemma":[0.0002828064,0.00002105115,0.00014450397,0.000016957501,0.0000022442382,0.0000024958576,0.00014753704,0.21592447,0.000009709459,0.7826664,0.0006782942,0.00010356283],"about_ca_topic_score_codex":0.000018621186,"about_ca_topic_score_gemma":0.0000026603836,"teacher_disagreement_score":0.6036495,"about_ca_system_score_codex":0.000049860388,"about_ca_system_score_gemma":0.000052025054,"threshold_uncertainty_score":0.42871875},"labels":[],"label_agreement":null},{"id":"W1978698538","doi":"10.1007/s00220-006-0176-0","title":"High Energy Limits of Laplace-Type and Dirac-Type EigenFunctions and Frame Flows","year":2007,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":20,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Type (biology); Dirac (video compression format); Ergodicity; Eigenfunction; Laplace transform; Limit (mathematics); Mathematics; Observable; Commutative property; Mathematical physics; Quantum; Frame (networking); Space (punctuation); Pure mathematics; Mathematical analysis; Physics; Quantum mechanics; Eigenvalues and eigenvectors; Computer science","score_opus":0.03284918834285308,"score_gpt":0.297087354031749,"score_spread":0.2642381656888959,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1978698538","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.81900185,0.0005451727,0.16451709,0.00025920433,0.00012251853,0.0002499784,0.000022070917,0.00003981503,0.015242293],"genre_scores_gemma":[0.9891108,0.000055205408,0.010584466,0.000016837841,0.000059624963,0.000009009304,0.000030878356,0.000014693649,0.000118459175],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991808,0.000054821558,0.00036656272,0.0001346285,0.000101138125,0.00016205267],"domain_scores_gemma":[0.9983169,0.0006890697,0.00010029423,0.00070981163,0.00010824701,0.00007566562],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00022868473,0.00011896339,0.00026669478,0.000038295177,0.00010590834,0.000022543076,0.00022746995,0.000054367025,0.000038368238],"category_scores_gemma":[0.0000407987,0.000107170796,0.00003134408,0.00035718325,0.00019058173,0.00008281449,0.00018626022,0.00017085385,0.000008708878],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008297273,0.00030557506,0.002173635,0.00003002215,0.00002494318,1.0829427e-7,0.00022302431,0.00002423833,0.00084378704,0.98990214,0.00003334495,0.0064309137],"study_design_scores_gemma":[0.00033798994,0.00007042638,0.0021967753,0.00011946735,0.00003691806,0.0000010504336,0.00040393427,0.03165077,0.00034278256,0.9635629,0.0010847083,0.00019228536],"about_ca_topic_score_codex":0.00016840601,"about_ca_topic_score_gemma":0.000029493012,"teacher_disagreement_score":0.17010896,"about_ca_system_score_codex":0.000013491591,"about_ca_system_score_gemma":0.000019910256,"threshold_uncertainty_score":0.4370298},"labels":[],"label_agreement":null},{"id":"W1979139505","doi":"10.1007/s00220-003-0933-2","title":"Jack Polynomials in Superspace","year":2003,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":26,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université Laval","funders":"","keywords":"Eigenfunction; Orthogonal polynomials; Orthogonality; Orthogonal basis; Hahn polynomials; Hamiltonian (control theory); Superspace; Classical orthogonal polynomials; Discrete orthogonal polynomials","score_opus":0.11244390147677848,"score_gpt":0.3738674131800185,"score_spread":0.26142351170324,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1979139505","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7591943,0.0008193414,0.022503862,0.002369767,0.0003530755,0.0017082304,0.0000075782586,0.00022216824,0.21282168],"genre_scores_gemma":[0.9577836,0.00004843789,0.04180642,0.00006236814,0.00002387735,0.00008283872,0.0000021400476,0.000030805742,0.00015952611],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985674,0.00028759686,0.00048178766,0.00019090163,0.00018880494,0.00028353557],"domain_scores_gemma":[0.99647677,0.0014115672,0.00008937838,0.0019175409,0.00004544234,0.000059280603],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00053044973,0.00017491002,0.00038443645,0.000068027104,0.00007848005,0.000035032706,0.0007997445,0.00011178932,0.000087623004],"category_scores_gemma":[0.0011159228,0.00016698026,0.000084249084,0.00046491495,0.00016879657,0.00012439264,0.00020196624,0.00038609694,0.000055067434],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000025523204,0.00038499743,0.00024818076,0.00003695468,0.0000075014827,6.543752e-7,0.00111619,0.000012171122,0.00004024192,0.99773675,0.00017552813,0.00023826561],"study_design_scores_gemma":[0.00048140748,0.000011712341,0.000067422814,0.00008422433,0.000010235939,0.0000024465737,0.0005017162,0.0008242194,0.0002394205,0.99717957,0.00042063644,0.00017698639],"about_ca_topic_score_codex":0.000009786939,"about_ca_topic_score_gemma":0.000020464946,"teacher_disagreement_score":0.21266215,"about_ca_system_score_codex":0.00012487388,"about_ca_system_score_gemma":0.000063209,"threshold_uncertainty_score":0.6809257},"labels":[],"label_agreement":null},{"id":"W1979727122","doi":"10.1007/s00220-012-1436-9","title":"Binding of Polarons and Atoms at Threshold","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":10,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Polaron; Coulomb; Coupling constant; RADIUS; Complex system; Critical radius","score_opus":0.13698252607771885,"score_gpt":0.38862211840578564,"score_spread":0.25163959232806676,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1979727122","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9308991,0.00047733876,0.010990197,0.0003083578,0.000049462607,0.00063321664,0.00002156729,0.0001251503,0.056495644],"genre_scores_gemma":[0.90641856,0.000058677764,0.09321139,0.000026972837,0.000047613416,0.00005633253,0.000006419966,0.00004970684,0.00012431876],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99821085,0.0001569069,0.00070827897,0.00017339175,0.00030568964,0.00044490624],"domain_scores_gemma":[0.9943146,0.0031640097,0.00024442605,0.0020725895,0.000055596916,0.00014875272],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0009719246,0.00024196722,0.0005602798,0.000081197955,0.00015249076,0.00001859552,0.0008115876,0.00011144706,0.00009188488],"category_scores_gemma":[0.0006776984,0.00022020674,0.00011994965,0.00045127163,0.00071395404,0.00029961593,0.0009977005,0.00037770355,0.00012298214],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000054302513,0.00097284437,0.0021912465,0.0002801356,0.000031679516,1.7849334e-7,0.0018719585,7.242531e-7,0.0020471017,0.99217916,0.00009579136,0.00032372552],"study_design_scores_gemma":[0.0002563192,0.000019083493,0.00028640058,0.00021481342,0.0000614178,0.000008845204,0.00026872713,0.0013759537,0.003187998,0.9940185,0.000080090045,0.00022186014],"about_ca_topic_score_codex":0.0000015716683,"about_ca_topic_score_gemma":0.0000028379595,"teacher_disagreement_score":0.082221195,"about_ca_system_score_codex":0.00013195848,"about_ca_system_score_gemma":0.000016487722,"threshold_uncertainty_score":0.897977},"labels":[],"label_agreement":null},{"id":"W1980776249","doi":"10.1007/s00220-013-1736-8","title":"The Excitation Spectrum for Weakly Interacting Bosons in a Trap","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Cold Atom Physics and Bose-Einstein Condensates","field":"Physics and Astronomy","cited_by":124,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; McGill University","funders":"","keywords":"Boson; Trap (plumbing); Eigenvalues and eigenvectors; Spectrum (functional analysis); Excitation; Physics; Range (aeronautics); Operator (biology); Energy spectrum; Quantum mechanics; Quantum electrodynamics; Chemistry; Materials science","score_opus":0.04187275541394433,"score_gpt":0.3262303399056193,"score_spread":0.284357584491675,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1980776249","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.88261396,0.0001951001,0.04471744,0.01332521,0.00018302955,0.0033786115,0.00003062593,0.00008357249,0.055472452],"genre_scores_gemma":[0.9940398,0.000007313356,0.0048632333,0.000029607269,0.00008141517,0.0008123866,0.000017916358,0.000019536392,0.0001288427],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.999027,0.00007364446,0.00040511056,0.00014628784,0.00009318086,0.0002547387],"domain_scores_gemma":[0.9964389,0.0024573759,0.00012655118,0.0008840986,0.000058669266,0.000034375033],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00024548947,0.00013129528,0.00019067198,0.00003329874,0.00024812936,0.00018353245,0.0006487597,0.00002389291,0.00003710224],"category_scores_gemma":[0.00005655464,0.000105174615,0.000101560385,0.00027515678,0.00011868423,0.00026299938,0.0001743154,0.0002668682,0.000078636476],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000025239704,0.00035141766,0.0018057633,0.00001683583,0.000016353644,3.3431505e-8,0.0008701811,0.000039607927,0.0005488192,0.9689317,0.00015972408,0.027257051],"study_design_scores_gemma":[0.00023889658,0.000012362916,0.0014761995,0.000089563946,0.0000073220567,9.881847e-8,0.0014460548,0.09675796,0.00031760012,0.8990586,0.00047560426,0.00011976232],"about_ca_topic_score_codex":0.00009286895,"about_ca_topic_score_gemma":0.00005992065,"teacher_disagreement_score":0.11142579,"about_ca_system_score_codex":0.000044841356,"about_ca_system_score_gemma":0.00003645424,"threshold_uncertainty_score":0.42888963},"labels":[],"label_agreement":null},{"id":"W1983688054","doi":"10.1007/s002200200614","title":"Integrable Fredholm Operators and Dual Isomonodromic Deformations","year":2002,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Topics in Algebra","field":"Mathematics","cited_by":70,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University","funders":"","keywords":"Mathematics; Pure mathematics; Meromorphic function; Mathematical analysis","score_opus":0.1147895983180122,"score_gpt":0.3536478150086196,"score_spread":0.23885821669060736,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1983688054","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.36151603,0.0017166384,0.33465272,0.005571433,0.00020525491,0.002140167,0.00006173657,0.00078082876,0.29335517],"genre_scores_gemma":[0.70928234,0.00026873575,0.28961965,0.000101022044,0.00003229482,0.00012704187,0.000008138592,0.00003945905,0.0005213002],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998717,0.00011427128,0.0005505243,0.00018812469,0.00017118429,0.00025886294],"domain_scores_gemma":[0.99670273,0.0011563256,0.00011680077,0.0018726647,0.00006940591,0.0000820631],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00027307656,0.00019230283,0.0003177495,0.00008063544,0.00024675528,0.00006634261,0.00064651575,0.00009495782,0.00017683802],"category_scores_gemma":[0.00072604953,0.00018223535,0.0000577262,0.00037504084,0.0003758404,0.000395784,0.0005202841,0.000516203,0.00021772094],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[6.406144e-7,0.00042091106,0.00007138122,0.000058913978,0.00001359956,7.135655e-7,0.0019068283,0.000008092736,0.00004858745,0.9938199,0.000562853,0.0030875765],"study_design_scores_gemma":[0.00028715588,0.000015689875,0.000022016697,0.00010636489,0.00002083842,0.000015023851,0.0004763938,0.029505339,0.00017346138,0.96850455,0.0006811684,0.00019200094],"about_ca_topic_score_codex":0.000002843805,"about_ca_topic_score_gemma":0.000012020944,"teacher_disagreement_score":0.3477663,"about_ca_system_score_codex":0.000101199155,"about_ca_system_score_gemma":0.0000143903935,"threshold_uncertainty_score":0.7431342},"labels":[],"label_agreement":null},{"id":"W1985533088","doi":"10.1007/s00220-004-1082-y","title":"Local Minimizers of the Ginzburg-Landau Energy with Magnetic Field in Three Dimensions","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Modeling in Engineering","field":"Computer Science","cited_by":20,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Vortex; Mathematics; Magnetic field; Complex system; Landau quantization; Energy (signal processing); Boundary (topology); Field theory (psychology); Line (geometry); Mathematical analysis; Energy functional; Physics; Pure mathematics; Geometry; Mathematical physics; Quantum mechanics; Computer science; Mechanics","score_opus":0.023069316720752128,"score_gpt":0.2569168411019853,"score_spread":0.23384752438123318,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1985533088","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0039930963,0.00010603894,0.99296415,0.0013368157,0.000018598594,0.00014063339,5.3935315e-7,0.00003869681,0.001401444],"genre_scores_gemma":[0.6480336,0.000012936754,0.35181844,0.000081292696,0.0000025986728,0.00003753997,2.8544423e-7,0.000008271272,0.0000050381877],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99904984,0.00003608303,0.00035675196,0.00015779882,0.00020681573,0.00019269646],"domain_scores_gemma":[0.9968556,0.0007997375,0.00006900937,0.0021923136,0.000044641394,0.00003866495],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00013281289,0.00012459052,0.000229834,0.000050174676,0.000052977448,0.000015015471,0.0017456402,0.0000491668,0.0000021093401],"category_scores_gemma":[0.00013416114,0.0000875924,0.000048506237,0.00064826885,0.0002404784,0.00014139136,0.0006869812,0.00026877792,0.000003825546],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000001661111,0.00024356994,0.000022267554,0.000027126549,0.0000032263217,6.2605267e-7,0.00036779037,0.11336879,0.00008221131,0.88376415,0.0000018117195,0.0021168052],"study_design_scores_gemma":[0.00024975868,0.000029664925,0.0000430242,0.00027047916,0.000003913528,0.0000023771786,0.000028612007,0.3707862,0.00054904097,0.62795407,0.00000723373,0.000075606105],"about_ca_topic_score_codex":0.00001742192,"about_ca_topic_score_gemma":0.000060418242,"teacher_disagreement_score":0.6440405,"about_ca_system_score_codex":0.000068991416,"about_ca_system_score_gemma":0.000057151025,"threshold_uncertainty_score":0.35719144},"labels":[],"label_agreement":null},{"id":"W1986022669","doi":"10.1007/s00220-006-0096-z","title":"Symmetries in Generalized Kähler Geometry","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Homotopy and Cohomology in Algebraic Topology","field":"Mathematics","cited_by":72,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Homogeneous space; Hermitian matrix; Mathematics; Geometry; Simple (philosophy); Reduction (mathematics); Pure mathematics; Combinatorics; Algebra over a field","score_opus":0.06895166491046993,"score_gpt":0.3595430495413197,"score_spread":0.29059138463084977,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1986022669","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8055648,0.0008753673,0.046175186,0.004460681,0.00014995006,0.0010029476,0.000014640315,0.00028266042,0.14147377],"genre_scores_gemma":[0.8908694,0.00004963653,0.108013496,0.0001846567,0.000058836387,0.00017160235,0.000020430563,0.00003060946,0.0006013214],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99820167,0.00033854184,0.0007211948,0.0002188803,0.00016538436,0.00035435974],"domain_scores_gemma":[0.9959846,0.001943009,0.00013200818,0.0018367175,0.000067743844,0.000035892837],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006510861,0.00018976482,0.00048063035,0.00020871089,0.000101216276,0.0000239996,0.0010125189,0.00019054904,0.0001451422],"category_scores_gemma":[0.0007883474,0.00018450494,0.00009132368,0.00092764484,0.00056846894,0.00011266172,0.0004091397,0.000507,0.00014301059],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000048316056,0.0009810725,0.0017679579,0.000052141135,0.000010613452,0.000004547485,0.0002666981,0.000012662829,0.000057662986,0.995385,0.0006585469,0.0007982619],"study_design_scores_gemma":[0.0005462363,0.00001535293,0.0010608966,0.000055089986,0.00001597571,0.000009415707,0.00012758705,0.0021084757,0.0002909204,0.99506533,0.00051868224,0.00018604823],"about_ca_topic_score_codex":0.00004966872,"about_ca_topic_score_gemma":0.00015896471,"teacher_disagreement_score":0.14087245,"about_ca_system_score_codex":0.00010038034,"about_ca_system_score_gemma":0.000042974985,"threshold_uncertainty_score":0.7523893},"labels":[],"label_agreement":null},{"id":"W1988707400","doi":"10.1007/s00220-006-0101-6","title":"Uniform Decay of Local Energy and the Semi-Linear Wave Equation on Schwarzschild Space","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":144,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Omega; Wave equation; Mathematical physics; Bounded function; Physics; Schwarzschild radius; Norm (philosophy); Scalar (mathematics); Lambda; Energy (signal processing); Schwarzschild metric; Space (punctuation); Mathematical analysis; Mathematics; Quantum mechanics; Spacetime; Geometry; Law","score_opus":0.0693331412659014,"score_gpt":0.32243506799727273,"score_spread":0.25310192673137133,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1988707400","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0035719941,0.000115340794,0.9328478,0.0012815895,0.000016066597,0.0005248199,0.000010203188,0.00007776887,0.06155442],"genre_scores_gemma":[0.89898705,0.000067733774,0.1004813,0.00007412967,0.000045169632,0.00012570122,0.00002016284,0.00005302767,0.00014571096],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.997901,0.00025009134,0.0008927779,0.0002452815,0.00042147498,0.00028932918],"domain_scores_gemma":[0.9907774,0.0064356783,0.0003940371,0.0021825521,0.00015470212,0.00005568336],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00079073035,0.00027817834,0.0006092095,0.000073749165,0.00018270045,0.000026223986,0.00069761806,0.000112608875,0.000014394642],"category_scores_gemma":[0.00038422432,0.00020014554,0.00013186896,0.00051480875,0.0014707274,0.00018052993,0.0004957498,0.0003998432,0.000018708757],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000029441138,0.0008278232,0.000002823755,0.00016019262,0.000021914144,3.69804e-7,0.0002989468,0.0008652956,0.000108666405,0.9959262,0.00009141594,0.001666895],"study_design_scores_gemma":[0.0009241044,0.00003079432,0.0000055656756,0.00025247058,0.000045731955,0.0000031166571,0.00018784407,0.16908073,0.0026294414,0.8265764,0.00009598617,0.00016779026],"about_ca_topic_score_codex":0.000026085443,"about_ca_topic_score_gemma":0.000023051754,"teacher_disagreement_score":0.89541507,"about_ca_system_score_codex":0.0000914973,"about_ca_system_score_gemma":0.00004021125,"threshold_uncertainty_score":0.81616986},"labels":[],"label_agreement":null},{"id":"W1991718981","doi":"10.1007/s00220-011-1339-1","title":"Local Decay in Non-Relativistic QED","year":2011,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":22,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Physics; Momentum (technical analysis); Limiting; Energy–momentum relation; Conjunction (astronomy); Quantum; Mathematical physics; Quantum electrodynamics; Complex system; Quantum mechanics","score_opus":0.15839088237978236,"score_gpt":0.3737317377081591,"score_spread":0.21534085532837674,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1991718981","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.032729026,0.00004499023,0.5516015,0.00015491631,0.00005236186,0.0010168419,0.0000066104562,0.00019479847,0.41419894],"genre_scores_gemma":[0.85469335,0.000016152939,0.14469992,0.000053666885,0.000025390773,0.00023160917,0.000006147428,0.000078874255,0.00019486963],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9971245,0.0003552001,0.001169735,0.00038306648,0.0003787536,0.0005887731],"domain_scores_gemma":[0.9924599,0.0037794528,0.00023805372,0.0032885696,0.00009333568,0.00014067836],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0011193103,0.00039324383,0.00078308315,0.00016316713,0.000113305854,0.00003193214,0.0019534386,0.00018517545,0.00026048676],"category_scores_gemma":[0.00063327607,0.00037295432,0.00018009385,0.0010746467,0.0009219489,0.00029883397,0.0006458576,0.0009697485,0.0006652724],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000164888,0.0025411667,0.00014373721,0.00018849038,0.000024544375,0.0000074460604,0.0044709384,0.0000134819475,0.000079196936,0.990539,0.00005907837,0.0019164095],"study_design_scores_gemma":[0.00058837945,0.000044870652,0.00064819556,0.00042892963,0.000041161486,0.000005529294,0.00055973174,0.0174595,0.00095581973,0.9788586,0.0000146135435,0.0003946885],"about_ca_topic_score_codex":0.000014069332,"about_ca_topic_score_gemma":0.00004380745,"teacher_disagreement_score":0.8219643,"about_ca_system_score_codex":0.00026128165,"about_ca_system_score_gemma":0.00005894701,"threshold_uncertainty_score":0.99987227},"labels":[],"label_agreement":null},{"id":"W1992340309","doi":"10.1007/s002200100454","title":"Realizing Holonomic Constraints in Classical and Quantum Mechanics","year":2001,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":83,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Phase space; Submanifold; Holonomic constraints; Mathematics; Quantum; Holonomic; Limiting; Classical mechanics; Configuration space; Space (punctuation); Pure mathematics; Mathematical analysis; Physics; Quantum mechanics; Computer science","score_opus":0.14039148787833927,"score_gpt":0.38724988586413034,"score_spread":0.24685839798579107,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1992340309","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.50807035,0.00035530652,0.37790364,0.0049143867,0.000118933705,0.0024627217,0.000028501816,0.0005746821,0.10557147],"genre_scores_gemma":[0.9396218,0.00023936295,0.059765127,0.00010508499,0.00004568898,0.00011789592,0.000007188626,0.000065163214,0.00003270966],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99749404,0.00036508628,0.0009715576,0.00038321404,0.00027097375,0.0005151557],"domain_scores_gemma":[0.9934164,0.0041245646,0.00020216678,0.002063295,0.000055953955,0.00013761941],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0011955423,0.0003283351,0.00071344856,0.00013468768,0.00012631275,0.00007082945,0.0010639183,0.00018074716,0.000070004404],"category_scores_gemma":[0.0013570859,0.00032559832,0.000108076936,0.0006426034,0.0007508747,0.0002595056,0.00060820807,0.0008438147,0.000109868444],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000013287305,0.0009646168,0.0001453182,0.00011654981,0.000016168247,0.0000092754735,0.0008458403,0.000010534926,0.00030792976,0.9946085,0.000050416533,0.0029115202],"study_design_scores_gemma":[0.0005718591,0.00003244982,0.00013693051,0.0003403037,0.0000269007,0.000033464705,0.0006790161,0.060921375,0.00005266315,0.9368141,0.0000802405,0.00031064046],"about_ca_topic_score_codex":0.00000520869,"about_ca_topic_score_gemma":0.00003260741,"teacher_disagreement_score":0.43155143,"about_ca_system_score_codex":0.00020872678,"about_ca_system_score_gemma":0.00005123937,"threshold_uncertainty_score":0.9999196},"labels":[],"label_agreement":null},{"id":"W1993984289","doi":"10.1007/pl00005526","title":"The Stability of Magnetic VorticesRID=\"*\"ID=\"*\"Research on this paper was supported by NSERC under grant N7901","year":2000,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":49,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Higgs boson; Conjecture; Vortex; Abelian group; Mathematics; Stability (learning theory); Coupling constant; Physics; Mathematical physics; Coupling (piping); Pure mathematics; Condensed matter physics; Quantum mechanics; Computer science; Mechanics; Engineering","score_opus":0.18492401092071506,"score_gpt":0.4230576093099963,"score_spread":0.23813359838928125,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1993984289","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.40735084,0.0023714164,0.03206262,0.016195703,0.00017343467,0.009639928,0.00047599798,0.0007792607,0.5309508],"genre_scores_gemma":[0.9699944,0.00067214726,0.027135998,0.00018395386,0.00003703468,0.00058757054,0.000043926364,0.00012984393,0.0012151197],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99494576,0.0010184839,0.0015425554,0.0004814918,0.0011933978,0.00081828685],"domain_scores_gemma":[0.97745866,0.016100358,0.0002696613,0.005630248,0.00036876256,0.00017232867],"candidate_categories":["metaepi_narrow","insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0029423297,0.00039639956,0.00075054436,0.00006846923,0.00063311914,0.000089039866,0.0026216723,0.00017575537,0.001713358],"category_scores_gemma":[0.0012725312,0.00029107666,0.00020617126,0.001095375,0.0023331062,0.00030275734,0.000557284,0.0013781996,0.0004932011],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00004567596,0.003852851,0.000010671049,0.00032269704,0.000042795626,6.397176e-7,0.0010390036,0.00003294701,0.0022940298,0.97993875,0.0030268899,0.0093930615],"study_design_scores_gemma":[0.000508716,0.00015185443,0.000024754889,0.00022961867,0.000049997292,0.0000017306229,0.000584946,0.0050171427,0.0027207215,0.98856616,0.0018520001,0.00029232947],"about_ca_topic_score_codex":0.000019752351,"about_ca_topic_score_gemma":0.000024784604,"teacher_disagreement_score":0.5626436,"about_ca_system_score_codex":0.00020896642,"about_ca_system_score_gemma":0.00011187505,"threshold_uncertainty_score":0.99995416},"labels":[],"label_agreement":null},{"id":"W1995276970","doi":"10.1007/s00220-013-1666-5","title":"On the Rate of Convergence of Loop-Erased Random Walk to SLE2","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":22,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Regina","funders":"","keywords":"Mathematics; Rate of convergence; Random walk; Brownian motion; Unit circle; Convergence (economics); Normal convergence; Loop (graph theory); Function (biology); Mathematical analysis; Loop-erased random walk; Combinatorics; Heterogeneous random walk in one dimension; Computer science; Statistics","score_opus":0.09176673202486758,"score_gpt":0.35365059304715785,"score_spread":0.2618838610222903,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1995276970","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.04346195,0.00002590407,0.948194,0.002210514,0.000036151407,0.001111294,0.000026877193,0.00002466936,0.004908607],"genre_scores_gemma":[0.9250005,0.00001575526,0.07441461,0.00023181066,0.00000754862,0.00024175827,0.000002564914,0.00001873622,0.00006674522],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9986602,0.00017187883,0.0006529589,0.00013110746,0.0002063598,0.0001774877],"domain_scores_gemma":[0.98506516,0.012673226,0.00020138163,0.0017348999,0.00026231777,0.00006301192],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00059394626,0.00014077926,0.0004225123,0.000039900446,0.00006630192,0.0000141124665,0.0010901539,0.000050079103,0.0002867465],"category_scores_gemma":[0.0064933733,0.00009571405,0.000076787626,0.00042712703,0.00022291916,0.000049615985,0.00027930478,0.00021944534,0.00015951999],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000017503391,0.00049686845,0.0000020077418,0.00017763421,0.000017954006,1.01167515e-7,0.00053601764,0.000024471077,0.0011010582,0.99574417,0.0008178576,0.0010643485],"study_design_scores_gemma":[0.00035575381,0.000066508124,0.000015119476,0.00027253487,0.000024728295,3.3066115e-7,0.00021450564,0.056209512,0.003190853,0.93954563,0.000011346281,0.000093166396],"about_ca_topic_score_codex":0.000010782929,"about_ca_topic_score_gemma":0.0000023965245,"teacher_disagreement_score":0.8815385,"about_ca_system_score_codex":0.000022529974,"about_ca_system_score_gemma":0.000038154896,"threshold_uncertainty_score":0.7773643},"labels":[],"label_agreement":null},{"id":"W1995457790","doi":"10.1007/s00220-012-1537-5","title":"The Scaling Limit of the Critical One-Dimensional Random Schrödinger Operator","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":29,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto; Concordia University","funders":"","keywords":"Eigenvalues and eigenvectors; Scaling limit; Scaling; Random matrix; Point process; Limit (mathematics); Operator (biology); Determinantal point process; Transfer operator","score_opus":0.12754262266398161,"score_gpt":0.39086716696823703,"score_spread":0.26332454430425545,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1995457790","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.70825213,0.011740356,0.14274089,0.052166823,0.00088788295,0.0072280513,0.000106592845,0.0004318668,0.076445386],"genre_scores_gemma":[0.95029426,0.00009126807,0.049086068,0.0000850413,0.00009696287,0.00022491708,0.0000019997738,0.00002719353,0.00009232197],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9982082,0.00031586227,0.0006753946,0.00011870621,0.00036028778,0.00032152882],"domain_scores_gemma":[0.98688126,0.010416275,0.00016592415,0.0022953374,0.00016468122,0.000076553784],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.001380288,0.00014755075,0.00031840257,0.000023959183,0.0006552007,0.00005598668,0.0014031283,0.00007548056,0.000029953575],"category_scores_gemma":[0.0025305445,0.00008707289,0.00018056604,0.00046801823,0.00071552873,0.00016324411,0.0006730614,0.00042433594,0.00005460046],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010848044,0.0008398674,0.00017689713,0.000062247775,0.000023403167,1.824301e-8,0.00055232475,0.000013581781,0.00035765194,0.9966054,0.0004380717,0.00091970654],"study_design_scores_gemma":[0.0007816589,0.000006596726,0.00030033226,0.00027054868,0.00010885401,0.0000033866202,0.00030920617,0.009648875,0.0012807674,0.9857819,0.0013484288,0.00015943412],"about_ca_topic_score_codex":0.0000033015253,"about_ca_topic_score_gemma":0.0000029978648,"teacher_disagreement_score":0.24204208,"about_ca_system_score_codex":0.000044093893,"about_ca_system_score_gemma":0.000048523485,"threshold_uncertainty_score":0.503934},"labels":[],"label_agreement":null},{"id":"W1995491592","doi":"10.1007/s00220-007-0298-z","title":"One-Parameter Continuous Fields of Kirchberg Algebras","year":2007,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":15,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Separable space; Mathematics; Unital; Pure mathematics; Invariant (physics); Sheaf; Field (mathematics); Torsion (gastropod); Discrete mathematics; Algebra over a field; Mathematical analysis; Mathematical physics","score_opus":0.1352474735517794,"score_gpt":0.4219050475424313,"score_spread":0.2866575739906519,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1995491592","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.33955935,0.00022068936,0.61027616,0.00064208056,0.000043631022,0.0009971178,0.0000107664355,0.00012945368,0.048120752],"genre_scores_gemma":[0.70765734,0.000029666753,0.2920261,0.000048163514,0.000023879076,0.000038249535,0.000004955061,0.000031608593,0.0001400764],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998015,0.00015590781,0.00083046884,0.00019934212,0.0004086947,0.00039060062],"domain_scores_gemma":[0.9907187,0.006124127,0.00017328959,0.0026678708,0.00021975538,0.00009625736],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0012288837,0.00016578335,0.000498348,0.00010982093,0.00008632574,0.000021636273,0.0013357293,0.00013878476,0.0000896613],"category_scores_gemma":[0.0024581857,0.00016911699,0.00011770454,0.0005881299,0.0004957595,0.00016481927,0.00061596505,0.00061844056,0.000075269425],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000014412354,0.0012479731,0.00032178,0.00016797594,0.000034389854,0.0000014470581,0.0010967348,0.000005399004,0.0007754193,0.9852619,0.00010631821,0.010966213],"study_design_scores_gemma":[0.00035673278,0.00005050668,0.00026294414,0.00016388737,0.000020850563,0.0000021037442,0.00032342915,0.001485206,0.006756558,0.9903016,0.00010533313,0.00017084072],"about_ca_topic_score_codex":0.000006083705,"about_ca_topic_score_gemma":0.000035976278,"teacher_disagreement_score":0.36809796,"about_ca_system_score_codex":0.000083088795,"about_ca_system_score_gemma":0.000048888807,"threshold_uncertainty_score":0.6896391},"labels":[],"label_agreement":null},{"id":"W1995709790","doi":"10.1007/s00220-007-0242-2","title":"t 1/3 Superdiffusivity of Finite-Range Asymmetric Exclusion Processes on $${\\mathbb{Z}}$$","year":2007,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":40,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Range (aeronautics); Physics; Mathematics; Pure mathematics; Materials science; Composite material","score_opus":0.11846687727795008,"score_gpt":0.3881124950984066,"score_spread":0.26964561782045654,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1995709790","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.009700296,0.00015130352,0.9652671,0.00024316671,0.000044564706,0.0005086064,0.000039176724,0.000086254004,0.023959488],"genre_scores_gemma":[0.8515882,0.00008310689,0.1480609,0.00008314636,0.000036242604,0.000046051424,0.000010635893,0.000038267997,0.000053477444],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99790245,0.000084953055,0.0008663477,0.00025569074,0.00052139885,0.00036912944],"domain_scores_gemma":[0.9815725,0.016064893,0.00025116958,0.0016677548,0.00033397338,0.00010968107],"candidate_categories":["metaresearch"],"consensus_categories":[],"category_scores_codex":[0.0011833354,0.00024354414,0.0005503342,0.00020102486,0.00014688924,0.000022066113,0.001061178,0.00014010702,0.000036533616],"category_scores_gemma":[0.013664287,0.00021406732,0.00009105353,0.0016006674,0.0002424108,0.000109088964,0.0004854671,0.00043982625,0.000064680215],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000032245953,0.002315114,0.000051956886,0.0010017699,0.000014603084,0.0000025234724,0.00080521085,0.000009461918,0.00007316734,0.9825553,0.00009108852,0.013047552],"study_design_scores_gemma":[0.00043630655,0.00013689228,0.000116569616,0.00047944838,0.000042561667,0.0000028300833,0.0002594091,0.012028673,0.0010518596,0.9851288,0.0000970985,0.00021953872],"about_ca_topic_score_codex":0.0000043820337,"about_ca_topic_score_gemma":0.000019813346,"teacher_disagreement_score":0.8418879,"about_ca_system_score_codex":0.00008649093,"about_ca_system_score_gemma":0.000081188766,"threshold_uncertainty_score":0.99464405},"labels":[],"label_agreement":null},{"id":"W1996509636","doi":"10.1007/s00220-009-0739-y","title":"The Cauchy Two-Matrix Model","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":78,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Toronto Metropolitan University; University of Saskatchewan; Université de Montréal; Concordia University","funders":"","keywords":"Hermitian matrix; Mathematics; Method of steepest descent; Pure mathematics; Cauchy's integral formula; Cauchy distribution; Mathematical analysis; Applied mathematics; Initial value problem; Cauchy problem","score_opus":0.040159564256778135,"score_gpt":0.37805967889940106,"score_spread":0.33790011464262293,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1996509636","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.027120663,0.00043615085,0.46275434,0.011181303,0.0000658018,0.00081258256,0.000056416007,0.00012295657,0.4974498],"genre_scores_gemma":[0.96527106,0.000017611592,0.033761725,0.000073211435,0.00009549707,0.000023484798,0.00001905969,0.000010520258,0.00072785973],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9992583,0.000058723737,0.0002677048,0.000099769306,0.00010735508,0.00020817867],"domain_scores_gemma":[0.9979386,0.00035452264,0.000060082573,0.0015576398,0.000042200587,0.000046968944],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00019863623,0.00010469182,0.00014452181,0.0000132256855,0.00032338582,0.000070994254,0.0008336869,0.000018658,0.000014761262],"category_scores_gemma":[0.000015976393,0.00007646272,0.00009019609,0.00017579853,0.00014574666,0.00008287351,0.00015705265,0.00028583704,0.00009780062],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000010877961,0.000267692,0.00005408825,0.0000016262651,0.0000067405726,5.048324e-8,0.000245772,0.0012063703,0.000047269434,0.98670846,0.00020033862,0.011260475],"study_design_scores_gemma":[0.000111673544,0.0000044832573,0.000027363618,0.000011914281,0.0000065913455,1.2270311e-7,0.00011628503,0.34396008,0.000033538912,0.65507406,0.00059132173,0.00006258431],"about_ca_topic_score_codex":0.000006629279,"about_ca_topic_score_gemma":0.000002312075,"teacher_disagreement_score":0.93815035,"about_ca_system_score_codex":0.000020180576,"about_ca_system_score_gemma":0.000041915682,"threshold_uncertainty_score":0.31180593},"labels":[],"label_agreement":null},{"id":"W1997546363","doi":"10.1007/s00220-008-0598-y","title":"Mating Non-Renormalizable Quadratic Polynomials","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":39,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Uniqueness; Polynomial; Quadratic equation; Mathematics; Pure mathematics; Complex system; Combinatorics; Mathematical physics; Physics; Mathematical analysis; Computer science; Geometry","score_opus":0.16034207076307871,"score_gpt":0.3786765846170397,"score_spread":0.21833451385396097,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1997546363","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.17488296,0.00020006111,0.54225886,0.0012352918,0.000105053565,0.0017522894,0.000030224473,0.00039042535,0.2791448],"genre_scores_gemma":[0.72446764,0.00008647161,0.27419904,0.00010849198,0.00005533528,0.00018169696,0.000015985303,0.000064542575,0.00082078174],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99742395,0.00018963394,0.0012016615,0.00028641382,0.00039895088,0.00049937266],"domain_scores_gemma":[0.9937029,0.002908192,0.0003234864,0.0028004323,0.000118263946,0.00014673399],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0008843372,0.00031885772,0.0007586862,0.0001081754,0.00040111807,0.00005978038,0.0014051474,0.00015001502,0.00022754235],"category_scores_gemma":[0.0013244307,0.00029272932,0.00018850916,0.00059477915,0.00045563167,0.0003024009,0.0006204791,0.00051248545,0.0004314603],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000044066555,0.0013108011,0.00024650848,0.00036679435,0.0000325095,0.0000065730023,0.0022209426,0.000028504215,0.00035061003,0.9935648,0.0010890468,0.0007785197],"study_design_scores_gemma":[0.0003616436,0.000024299981,0.00010676679,0.0002626738,0.00002887308,0.000030288615,0.00021039492,0.1293715,0.00018418873,0.86895144,0.00015810417,0.00030985053],"about_ca_topic_score_codex":0.000014444885,"about_ca_topic_score_gemma":0.000009682354,"teacher_disagreement_score":0.5495847,"about_ca_system_score_codex":0.00010985324,"about_ca_system_score_gemma":0.000084084626,"threshold_uncertainty_score":0.9999525},"labels":[],"label_agreement":null},{"id":"W1997645248","doi":"10.1007/s00220-015-2365-1","title":"Finite-Time Blowup for the Inviscid Primitive Equations of Oceanic and Atmospheric Dynamics","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Navier-Stokes equation solutions","field":"Mathematics","cited_by":117,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Victoria","funders":"Natural Sciences and Engineering Research Council of Canada; Banff International Research Station for Mathematical Innovation and Discovery; Minerva Foundation; National Science Foundation","keywords":"Inviscid flow; Primitive equations; Gravitational singularity; Mathematical analysis; Mathematics; Boundary value problem; Flow (mathematics); Boundary (topology); Class (philosophy); Physics; Mechanics; Geometry; Differential equation; Simultaneous equations; Computer science","score_opus":0.17460141466828621,"score_gpt":0.3828214000863754,"score_spread":0.20821998541808917,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1997645248","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0029876258,0.00031134562,0.98640394,0.0024391604,0.000033449185,0.0013574108,0.000093818366,0.00006754808,0.006305702],"genre_scores_gemma":[0.6524822,0.00007737716,0.34647083,0.0000777838,0.00003233257,0.0004147424,0.000063064224,0.000047584632,0.00033405583],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99846524,0.00020573585,0.00067743345,0.0001708141,0.00026809663,0.00021269114],"domain_scores_gemma":[0.98213136,0.015333703,0.0003094741,0.0017464503,0.00039795478,0.00008106632],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.001083394,0.0001718433,0.0003637005,0.00002660273,0.00022684124,0.000036049027,0.0008530436,0.00008712184,0.000014372064],"category_scores_gemma":[0.0061183963,0.00014218588,0.00010559168,0.0006165706,0.0006280443,0.00018042728,0.00045257498,0.00026233066,0.00003509675],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006570034,0.0005015108,0.000034387656,0.00007202032,0.00004615493,5.750748e-8,0.0021459854,0.00031368696,0.000022102502,0.99379265,0.00047527484,0.0025896074],"study_design_scores_gemma":[0.0003235651,0.000026644442,0.000028003093,0.00005526895,0.00008021985,6.626389e-7,0.00058734085,0.46102235,0.00001407988,0.53764004,0.00013564501,0.00008618151],"about_ca_topic_score_codex":0.000004252752,"about_ca_topic_score_gemma":0.000017159284,"teacher_disagreement_score":0.6494946,"about_ca_system_score_codex":0.00016949687,"about_ca_system_score_gemma":0.00016256621,"threshold_uncertainty_score":0.7324734},"labels":[],"label_agreement":null},{"id":"W1998039813","doi":"10.1007/s00220-012-1592-y","title":"Jack Superpolynomials with Negative Fractional Parameter: Clustering Properties and Super-Virasoro Ideals","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Polynomial and algebraic computation","field":"Computer Science","cited_by":8,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université Laval","funders":"","keywords":"Conjecture; Invariant (physics); Ideal (ethics); Linear subspace; Eigenfunction; Linear span; Symmetric function; Symmetric polynomial; Space (punctuation); Orthogonal polynomials","score_opus":0.0833692117707384,"score_gpt":0.2913953568846495,"score_spread":0.2080261451139111,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W1998039813","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.29785132,0.00041062172,0.6971375,0.0017882936,0.000060305818,0.0004085696,0.000003091537,0.000115602896,0.0022246898],"genre_scores_gemma":[0.8679029,0.000034102697,0.13174203,0.00015141825,0.000049845345,0.00008008434,0.0000027537137,0.000010248955,0.000026635089],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9989284,0.00015947728,0.0002999981,0.00017733024,0.00017451656,0.00026027695],"domain_scores_gemma":[0.9978467,0.0010347652,0.00008052701,0.00089192536,0.000052567702,0.000093465635],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00032098006,0.00014993848,0.00023102382,0.00005275698,0.00019199638,0.00013459551,0.00072612613,0.000043597192,0.000006108963],"category_scores_gemma":[0.00015652057,0.000118046824,0.000032823926,0.00026763623,0.00025882397,0.0011213161,0.0006763707,0.00021978692,0.00004144078],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00003584782,0.0014821059,0.004891748,0.00018820346,0.0000959104,0.0000011484972,0.02113741,0.0007853999,0.0022257871,0.88194525,0.00016841512,0.087042786],"study_design_scores_gemma":[0.0008961223,0.000115241,0.010085547,0.00036204085,0.00002992696,0.000050651866,0.0007315111,0.6019256,0.0025240802,0.38224554,0.0004033086,0.0006304245],"about_ca_topic_score_codex":0.000021782493,"about_ca_topic_score_gemma":0.0000098039745,"teacher_disagreement_score":0.6011402,"about_ca_system_score_codex":0.00005534943,"about_ca_system_score_gemma":0.000041980755,"threshold_uncertainty_score":0.481381},"labels":[],"label_agreement":null},{"id":"W2000221457","doi":"10.1007/s00220-013-1703-4","title":"Addendum to: A Renormalizable 4-Dimensional Tensor Field Theory","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":44,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Addendum; Lemma (botany); Mathematical physics; Physics; Field (mathematics); Tensor (intrinsic definition); Mathematics; Theoretical physics; Pure mathematics; Philosophy","score_opus":0.021418167885345365,"score_gpt":0.28621215070760386,"score_spread":0.2647939828222585,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2000221457","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.06388121,0.00008343701,0.4146816,0.0057603642,0.000117994154,0.0015802968,0.000042717988,0.0001535649,0.5136988],"genre_scores_gemma":[0.9748641,0.0000014844832,0.02334259,0.0006007339,0.00015091253,0.0002463852,0.000027589176,0.000027599339,0.0007386082],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998834,0.00013105791,0.00034917763,0.00020014163,0.0001649642,0.00032066135],"domain_scores_gemma":[0.99722147,0.0009278893,0.000060895884,0.0015404512,0.00011090151,0.0001383987],"candidate_categories":["insufficient_payload"],"consensus_categories":["insufficient_payload"],"category_scores_codex":[0.00021472565,0.00017553908,0.0002632124,0.00003534015,0.00014721106,0.00007017837,0.00082939985,0.00004594548,0.0019841427],"category_scores_gemma":[0.000055304972,0.0001541023,0.000106254796,0.00034079357,0.00017004756,0.00018329379,0.0005938061,0.0003561886,0.0023234477],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000041740677,0.00051846384,0.0002148607,0.000011017859,0.000020610973,1.1278255e-7,0.00024068836,0.000061814535,0.00009196858,0.9852585,0.0038180642,0.009759723],"study_design_scores_gemma":[0.0001783038,0.000029891406,0.00012902293,0.00007556398,0.000015055973,2.2308262e-7,0.00023249553,0.0053685643,0.00055045204,0.9927349,0.0004936704,0.00019183726],"about_ca_topic_score_codex":0.00004240603,"about_ca_topic_score_gemma":6.221116e-7,"teacher_disagreement_score":0.9109829,"about_ca_system_score_codex":0.000021272926,"about_ca_system_score_gemma":0.000029162702,"threshold_uncertainty_score":0.9989282},"labels":[],"label_agreement":null},{"id":"W2000545069","doi":"10.1007/s00220-008-0423-7","title":"On the Renormalized Volume of Hyperbolic 3-Manifolds","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":93,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Mathematics; Equidistant; Simple (philosophy); Regular polygon; Regularization (linguistics); Invariant (physics); Curvature; Mathematical analysis; Pure mathematics; Mathematical physics; Geometry","score_opus":0.038358384182253895,"score_gpt":0.2793867799793145,"score_spread":0.2410283957970606,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2000545069","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.4506882,0.00006121803,0.05178306,0.0017919606,0.000037560156,0.0005712543,0.00003793531,0.00004875748,0.49498004],"genre_scores_gemma":[0.99773,0.000013032571,0.0018656572,0.00007942122,0.0000441978,0.00005319124,0.00001413707,0.000019801922,0.00018054173],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990374,0.00013572173,0.00035257,0.0001182844,0.00017490963,0.0001811169],"domain_scores_gemma":[0.99721456,0.0008179675,0.000110735746,0.001751199,0.0000649808,0.00004056108],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00019166085,0.00013371427,0.000264522,0.00002097141,0.00017479727,0.0000110157625,0.0009265622,0.000030577692,0.00029128848],"category_scores_gemma":[0.000037723814,0.000095327756,0.00013238889,0.00031627764,0.00067508186,0.00006222743,0.0002729209,0.00031816275,0.00023678118],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004698731,0.00069593766,0.0003965423,0.000008901578,0.000019593399,1.3560012e-7,0.0004756056,0.000038563834,0.000030173522,0.9972372,0.00036083144,0.00073182915],"study_design_scores_gemma":[0.00021170013,0.000023054241,0.00032285432,0.000050549024,0.000013736459,4.4538655e-7,0.00013538351,0.0047414233,0.0004717493,0.9936629,0.00026269813,0.0001035321],"about_ca_topic_score_codex":0.0000147831715,"about_ca_topic_score_gemma":2.758278e-7,"teacher_disagreement_score":0.54704183,"about_ca_system_score_codex":0.000013787316,"about_ca_system_score_gemma":0.000030206766,"threshold_uncertainty_score":0.3887353},"labels":[],"label_agreement":null},{"id":"W2001428881","doi":"10.1007/s00220-012-1629-2","title":"Vortex Density Models for Superconductivity and Superfluidity","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Physics of Superconductivity and Magnetism","field":"Physics and Astronomy","cited_by":13,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Vortex; Generalization; Superconductivity; Forcing (mathematics); Superfluidity; Magnetic field; Quantum vortex; Complex system","score_opus":0.10772515083048603,"score_gpt":0.32418540722729267,"score_spread":0.21646025639680663,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2001428881","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7135511,0.00024862197,0.27742106,0.00038857354,0.000054641918,0.00049040193,0.00004971273,0.00003585669,0.007760026],"genre_scores_gemma":[0.97630143,0.00002520338,0.023232799,0.000028094939,0.0001406789,0.00017113646,0.000035855526,0.000020719774,0.000044066655],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99906284,0.00009028484,0.00023511515,0.00017876354,0.000100409525,0.00033261144],"domain_scores_gemma":[0.99817884,0.0005743554,0.00003843892,0.0010276332,0.00006591585,0.00011483597],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004027427,0.00016918768,0.0003041687,0.000028231058,0.00022270247,0.00003667171,0.00037443454,0.00004997979,0.000031861335],"category_scores_gemma":[0.000027089334,0.00017421022,0.000090254245,0.00012919189,0.00032352406,0.002497876,0.00037026426,0.0002667228,0.000019990543],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000025129211,0.0009547423,0.0018837523,0.00004184294,0.000019659203,1.7717403e-8,0.0010733593,0.000009516294,0.0026628312,0.98716974,0.00004285477,0.006139185],"study_design_scores_gemma":[0.00028568128,0.000010797972,0.0006571017,0.000028217417,0.000034216053,6.7679775e-7,0.0004683834,0.010121956,0.0013352715,0.98670685,0.00014918798,0.00020168375],"about_ca_topic_score_codex":0.00006124409,"about_ca_topic_score_gemma":0.0000031898687,"teacher_disagreement_score":0.26275033,"about_ca_system_score_codex":0.000024509263,"about_ca_system_score_gemma":0.000026993219,"threshold_uncertainty_score":0.7104086},"labels":[],"label_agreement":null},{"id":"W2002842428","doi":"10.1007/s00220-014-1953-9","title":"Everything You Always Wanted to Know About LOCC (But Were Afraid to Ask)","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Applications","field":"Physics and Astronomy","cited_by":414,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo; Perimeter Institute","funders":"","keywords":"LOCC; Formalism (music); Quantum; Class (philosophy); Finite set; Quantum entanglement; Quantum state; Set (abstract data type)","score_opus":0.02778948599695028,"score_gpt":0.3068290111789717,"score_spread":0.2790395251820214,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2002842428","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.031081142,0.000034062898,0.92586833,0.004304278,0.00005897358,0.00074331014,0.000067144814,0.00009933439,0.037743416],"genre_scores_gemma":[0.95535403,0.0000069323983,0.04323586,0.00039069797,0.00014215599,0.00043553364,0.000067317094,0.00004475601,0.0003227176],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99850684,0.000106952946,0.00050108327,0.00031414762,0.00020885645,0.00036212226],"domain_scores_gemma":[0.9965505,0.00044418362,0.000105556086,0.0025618246,0.00012638797,0.00021154807],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0004297247,0.00022685903,0.00035317964,0.00007829855,0.0003043939,0.0001053341,0.0014053669,0.000054354212,0.00014062216],"category_scores_gemma":[0.000085437576,0.00022916685,0.00011695167,0.00057734345,0.000066534696,0.000120159,0.0007297175,0.0003899043,0.0015089773],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000022796007,0.00046512941,0.0000766616,0.000016554446,0.000015049118,5.14672e-8,0.0007084989,0.00011595262,0.0010493243,0.97920024,0.0011880465,0.017162215],"study_design_scores_gemma":[0.00022773002,0.000030364043,0.00012126757,0.0002398686,0.00002398578,3.7459327e-7,0.000488977,0.052702393,0.00082849176,0.91444236,0.030573715,0.000320489],"about_ca_topic_score_codex":0.000031590014,"about_ca_topic_score_gemma":0.0000067105243,"teacher_disagreement_score":0.9242729,"about_ca_system_score_codex":0.00005281941,"about_ca_system_score_gemma":0.000044992306,"threshold_uncertainty_score":0.9992685},"labels":[],"label_agreement":null},{"id":"W2004492771","doi":"10.1007/s00220-013-1720-3","title":"The Massive Wave Equation in Asymptotically AdS Spacetimes","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":52,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"","keywords":"Wave equation; Spacetime; Energy (signal processing); Space (punctuation); Range (aeronautics); Mathematical proof; Field (mathematics)","score_opus":0.12363009192125302,"score_gpt":0.3571716768582326,"score_spread":0.23354158493697957,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2004492771","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.02337445,0.00033415997,0.7588323,0.020073641,0.00013564386,0.0059632896,0.000011187537,0.0004606819,0.19081469],"genre_scores_gemma":[0.7106447,0.00011524908,0.28718174,0.00013469667,0.000049690923,0.0012309871,0.000011681612,0.00008640941,0.00054483186],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99706036,0.00037208505,0.0011365139,0.00032941755,0.00048925856,0.000612356],"domain_scores_gemma":[0.9860854,0.010241039,0.00030440182,0.0030079843,0.00024244013,0.00011870305],"candidate_categories":["metaepi_narrow","insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0009810467,0.0003336871,0.0005436381,0.000082820385,0.00027691387,0.00016444924,0.0014112396,0.0001465124,0.00012132986],"category_scores_gemma":[0.0031054777,0.00025080427,0.000139175,0.0007757961,0.0007138543,0.00050425634,0.0008095314,0.000861739,0.00078512274],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000036535846,0.00074519124,0.00003335835,0.00009978777,0.000018096383,8.002232e-7,0.0008307877,0.000084231535,0.00024477928,0.99113536,0.0004627185,0.006341243],"study_design_scores_gemma":[0.00036896404,0.000025825024,0.00013155492,0.00022471629,0.000017512899,0.00000179254,0.0004795842,0.10538039,0.00018267702,0.8928325,0.00009847433,0.00025597643],"about_ca_topic_score_codex":0.0000093598055,"about_ca_topic_score_gemma":0.000021762964,"teacher_disagreement_score":0.6872703,"about_ca_system_score_codex":0.0002528033,"about_ca_system_score_gemma":0.000075383614,"threshold_uncertainty_score":0.9999944},"labels":[],"label_agreement":null},{"id":"W2005167350","doi":"10.1007/s00220-014-2218-3","title":"Non-Computable Impressions of Computable External Rays of Quadratic Polynomials","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Computability, Logic, AI Algorithms","field":"Computer Science","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Quadratic equation; Prime (order theory); Computability; Construct (python library); Julia set; Algebra over a field","score_opus":0.037165089797624576,"score_gpt":0.3100786385459146,"score_spread":0.27291354874829005,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2005167350","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.024557345,0.0001263787,0.9692759,0.00028487752,0.00009105373,0.00039184935,0.000004730929,0.00006914709,0.005198747],"genre_scores_gemma":[0.5883499,0.000010557296,0.41153482,0.000027833818,0.000024125879,0.000023182089,0.000002351279,0.00001082958,0.0000164302],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99744284,0.0003657046,0.0011155157,0.00034198086,0.00039365282,0.00034031505],"domain_scores_gemma":[0.9925283,0.002467738,0.00045265676,0.0042044944,0.00023848623,0.00010831533],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0011925822,0.00022712044,0.0007773677,0.00012967059,0.00012935365,0.00006364671,0.0042527243,0.000093521645,0.000017479875],"category_scores_gemma":[0.00029321547,0.0002116229,0.00017215025,0.00084256433,0.00045156595,0.0003567591,0.0026203434,0.00034106767,0.000035319557],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000065255617,0.0036012256,0.0010839185,0.00048173504,0.000040523122,6.0120357e-7,0.0025078815,0.023177436,0.008024213,0.91803414,0.00021470261,0.042827122],"study_design_scores_gemma":[0.00026825254,0.00005195297,0.0005876794,0.00018683507,0.00000920283,0.000002525229,0.000021556049,0.6036694,0.0025622344,0.39248163,0.000033416083,0.00012530925],"about_ca_topic_score_codex":0.000048086156,"about_ca_topic_score_gemma":0.000003490377,"teacher_disagreement_score":0.58049196,"about_ca_system_score_codex":0.00006280809,"about_ca_system_score_gemma":0.000114866714,"threshold_uncertainty_score":0.86297315},"labels":[],"label_agreement":null},{"id":"W2005612588","doi":"10.1007/s00220-008-0625-z","title":"Counterexamples to Additivity of Minimum Output p-Rényi Entropy for p Close to 0","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Wireless Communication Security Techniques","field":"Engineering","cited_by":44,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"","keywords":"Additive function; Counterexample; Conjecture; Entropy (arrow of time); Quantum; Complex system","score_opus":0.08423763620704829,"score_gpt":0.3249570072784253,"score_spread":0.24071937107137703,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2005612588","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.246677,0.00022444993,0.7394397,0.0012669063,0.00004582884,0.0021065194,0.0003510298,0.000597667,0.009290845],"genre_scores_gemma":[0.76053196,0.00012926545,0.23862475,0.00008065507,0.000016450878,0.00052338664,0.00003771625,0.00003336289,0.000022433198],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99892676,0.0000701691,0.0005014628,0.00013347968,0.00016074463,0.00020736881],"domain_scores_gemma":[0.99592584,0.0011686174,0.000056888355,0.0026032755,0.00015790893,0.00008745076],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00024977658,0.00015651209,0.00036237817,0.00010988424,0.00008581836,0.000013398618,0.0014032499,0.000068544236,0.000010670631],"category_scores_gemma":[0.0003349759,0.00017634052,0.00008668846,0.00038970093,0.000156376,0.0001097235,0.00044004022,0.00019553423,0.00005503101],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000036067537,0.001955339,0.00020388133,0.000704161,0.00009293005,7.729995e-7,0.019098192,0.0014517294,0.01780649,0.9160521,0.026013566,0.016584793],"study_design_scores_gemma":[0.0015020695,0.0003354983,0.0035405878,0.001444125,0.00007673301,0.000014089461,0.00097249023,0.1864051,0.08207706,0.62451553,0.097419515,0.0016971716],"about_ca_topic_score_codex":0.0000059700083,"about_ca_topic_score_gemma":0.000013237847,"teacher_disagreement_score":0.513855,"about_ca_system_score_codex":0.00009858389,"about_ca_system_score_gemma":0.000024630544,"threshold_uncertainty_score":0.71909577},"labels":[],"label_agreement":null},{"id":"W2006730257","doi":"10.1007/s002200200663","title":"Duality, Biorthogonal Polynomials¶and Multi-Matrix Models","year":2002,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Molecular spectroscopy and chirality","field":"Chemistry","cited_by":106,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal","funders":"","keywords":"Mathematics; Biorthogonal system; Eigenvalues and eigenvectors; Pure mathematics; Overdetermined system; Difference polynomials; Duality (order theory); Polynomial; Differential equation; Matrix (chemical analysis); Rank (graph theory); Orthogonal polynomials; Mathematical analysis; Combinatorics","score_opus":0.12375360433089184,"score_gpt":0.3585152118400352,"score_spread":0.23476160750914338,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2006730257","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.41590703,0.0061284998,0.20981343,0.005091037,0.000058002286,0.0005902174,0.00016435503,0.00048569357,0.36176172],"genre_scores_gemma":[0.94124633,0.00029931933,0.05775261,0.00006903227,0.000026454021,0.000042647353,0.000016454807,0.000019862142,0.0005273153],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9990335,0.00006377358,0.00036452423,0.00019053483,0.00014713465,0.00020053468],"domain_scores_gemma":[0.9980165,0.00021384467,0.000081418475,0.001585263,0.000028028568,0.00007495963],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00016363237,0.00014607752,0.00023599672,0.0000216469,0.00013699873,0.000046964476,0.0006110414,0.00009363361,0.00031347125],"category_scores_gemma":[0.00007251864,0.00014710362,0.00007633409,0.0001289134,0.00029063455,0.00011986106,0.0004515311,0.00035029638,0.00007364832],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000057746674,0.0022369183,0.00055656594,0.00029631847,0.00004466941,0.0000026657904,0.0017807838,0.000112462694,0.01544516,0.9752527,0.00015951766,0.004106471],"study_design_scores_gemma":[0.00062104425,0.0000073752926,0.00006626316,0.0001126603,0.000034225523,0.000007640772,0.00010961994,0.5168641,0.004115185,0.4773238,0.00043795764,0.00030009265],"about_ca_topic_score_codex":0.000009814066,"about_ca_topic_score_gemma":0.000007958031,"teacher_disagreement_score":0.52533925,"about_ca_system_score_codex":0.000041191804,"about_ca_system_score_gemma":0.000009643308,"threshold_uncertainty_score":0.59987116},"labels":[],"label_agreement":null},{"id":"W2007648274","doi":"10.1007/s00220-015-2295-y","title":"A Blow-Up Result for Dyadic Models of the Euler Equations","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Navier-Stokes equation solutions","field":"Mathematics","cited_by":6,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Euler's formula; Semi-implicit Euler method; Euler equations; Complex system; Euler method; Backward Euler method","score_opus":0.4663444054860714,"score_gpt":0.43952273321682833,"score_spread":0.02682167226924309,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2007648274","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.004790419,0.0001685135,0.9714074,0.0032303256,0.0001522192,0.0016137986,0.00011588729,0.00009331747,0.018428128],"genre_scores_gemma":[0.79778713,0.000013052512,0.2008847,0.00006797894,0.000040336527,0.0005778135,0.00002703617,0.000041964675,0.0005599628],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9979602,0.00029866878,0.0008974261,0.00018003646,0.0004156305,0.00024802086],"domain_scores_gemma":[0.9904982,0.0051900637,0.00036662855,0.0032654905,0.0005910056,0.000088629546],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0012475636,0.0001698405,0.00036409573,0.00007753132,0.00021577836,0.000027766404,0.0015752722,0.000105492596,0.000016031197],"category_scores_gemma":[0.0061570606,0.00013764216,0.00019833096,0.00079930446,0.0004658673,0.00025038494,0.00051386526,0.00031371246,0.0000376139],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000066475613,0.00059572235,0.000008805484,0.00007227374,0.000023949127,2.3522954e-8,0.0034455163,0.0006789649,0.0000731037,0.9920845,0.0023946122,0.0006158691],"study_design_scores_gemma":[0.0006097127,0.000014339279,0.0000058027313,0.00012255722,0.00006399681,6.3982475e-7,0.00047644784,0.2563876,0.00013781883,0.7416266,0.000447572,0.000106919055],"about_ca_topic_score_codex":0.000008641339,"about_ca_topic_score_gemma":0.000031586907,"teacher_disagreement_score":0.7929967,"about_ca_system_score_codex":0.00017189194,"about_ca_system_score_gemma":0.00024654166,"threshold_uncertainty_score":0.73710215},"labels":[],"label_agreement":null},{"id":"W2007795997","doi":"10.1007/s00220-011-1319-5","title":"Morrey Potentials and Harmonic Maps","year":2011,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Harmonic Analysis Research","field":"Mathematics","cited_by":39,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Memorial University of Newfoundland","funders":"","keywords":"Smoothness; TRACE (psycholinguistics); Harmonic; Harmonic function; Class (philosophy); Mathematics; Complex system; Mathematical analysis; Harmonic map; Pure mathematics; Physics; Quantum mechanics; Computer science; Artificial intelligence; Philosophy","score_opus":0.3179120398182405,"score_gpt":0.4250689468656567,"score_spread":0.1071569070474162,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2007795997","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.069952585,0.0020096258,0.7357676,0.0014409986,0.00005418465,0.0018869765,0.00003859264,0.00044243905,0.18840699],"genre_scores_gemma":[0.7241877,0.00041438016,0.27491784,0.000032941272,0.000013742471,0.000101794736,0.0000074581894,0.00003351063,0.00029063],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984477,0.00022219773,0.0005188558,0.00023567073,0.00026192138,0.00031365512],"domain_scores_gemma":[0.99641657,0.0009996806,0.00013085721,0.0022449289,0.00010479858,0.00010318326],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00066236575,0.00017190166,0.00038680527,0.00009387042,0.00015480742,0.000030283136,0.0010498744,0.000077128265,0.00017586691],"category_scores_gemma":[0.0007101438,0.00015915718,0.00008954465,0.00042585284,0.00048749257,0.0002033645,0.0008756532,0.00044615183,0.00016735066],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000005722065,0.0006321235,0.00015118426,0.000085639454,0.00004293892,0.000002381624,0.0015728786,9.297996e-7,0.00025640154,0.99186426,0.00025327716,0.005132244],"study_design_scores_gemma":[0.00024430128,0.000015028304,0.00021570786,0.000071685754,0.000046997422,0.000005117652,0.00049321103,0.006251971,0.0005474607,0.99181837,0.00012848515,0.0001616409],"about_ca_topic_score_codex":0.000007796982,"about_ca_topic_score_gemma":0.000011937877,"teacher_disagreement_score":0.6542351,"about_ca_system_score_codex":0.00006513659,"about_ca_system_score_gemma":0.000036617887,"threshold_uncertainty_score":0.6490241},"labels":[],"label_agreement":null},{"id":"W2008068006","doi":"10.1007/s00220-012-1582-0","title":"Continuum Statistics of the Airy2 Process","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":67,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Statistics; Computer science; Mathematics","score_opus":0.10270933697487239,"score_gpt":0.4087486519982346,"score_spread":0.30603931502336224,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2008068006","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.26099005,0.0010461808,0.5892594,0.0030824328,0.00024786673,0.0039536217,0.00026848694,0.00023717403,0.14091481],"genre_scores_gemma":[0.909081,0.00002581029,0.090466216,0.0000425198,0.000041388204,0.000156396,0.00000551098,0.000021238719,0.00015996334],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988514,0.00011852104,0.00051444,0.000082775245,0.00021681716,0.00021601225],"domain_scores_gemma":[0.99602437,0.0016655425,0.0002663273,0.0018749965,0.0001204215,0.000048321683],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00047184326,0.000115983625,0.00026974632,0.000024470719,0.00012753392,0.0000137016195,0.0011008879,0.000051861287,0.000035146404],"category_scores_gemma":[0.0005710465,0.00008203039,0.00007701287,0.0004745769,0.00030781413,0.00011755924,0.00028856896,0.0002445561,0.000034522705],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000002092707,0.0009017026,0.0013779518,0.00017481994,0.000012012869,1.529129e-8,0.0014873,0.0000031489603,0.00007135497,0.99392116,0.0012696328,0.0007788022],"study_design_scores_gemma":[0.000288718,0.0000048355882,0.0009324591,0.00008434038,0.00005112051,0.0000015867759,0.00033862778,0.0016239039,0.0006710389,0.99512076,0.0007812177,0.00010138746],"about_ca_topic_score_codex":0.0000029605958,"about_ca_topic_score_gemma":0.000008222209,"teacher_disagreement_score":0.6480909,"about_ca_system_score_codex":0.000027978076,"about_ca_system_score_gemma":0.00003351421,"threshold_uncertainty_score":0.3345102},"labels":[],"label_agreement":null},{"id":"W2009573753","doi":"10.1007/s00220-004-1269-2","title":"Stable Bundles on Non-Kähler Elliptic Surfaces","year":2005,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":14,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Fields Institute for Research in Mathematical Sciences; McGill University","funders":"","keywords":"Moduli space; Integrable system; Vector bundle; Mathematics; Pure mathematics; Moduli; Rank (graph theory); Mathematical analysis; Hamiltonian system; Physics; Combinatorics; Quantum mechanics","score_opus":0.13007062840799719,"score_gpt":0.3639297124616526,"score_spread":0.23385908405365544,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2009573753","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.49170518,0.00039555464,0.08027441,0.004834555,0.000106777006,0.0013983949,0.000026878532,0.0004672765,0.42079094],"genre_scores_gemma":[0.8589767,0.000054716453,0.13913673,0.00014163632,0.00006849519,0.00007651323,0.00000931463,0.000036101537,0.0014997616],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99847233,0.0001331763,0.0005277064,0.00022585079,0.00029779322,0.000343116],"domain_scores_gemma":[0.9951702,0.0019477948,0.00013210479,0.0025941846,0.00007842922,0.000077291006],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0005250244,0.00022734623,0.0003852932,0.000088066205,0.00020616032,0.00007240349,0.001289913,0.00009035118,0.00026941896],"category_scores_gemma":[0.0002820099,0.00020868123,0.000106125255,0.0005092529,0.00018564101,0.00020238887,0.00040114316,0.00042083263,0.001246241],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000005669095,0.00196359,0.00009097407,0.000104724095,0.000024638262,4.924874e-7,0.00072811113,0.0005414269,0.0001437449,0.9927895,0.0014095214,0.0021975744],"study_design_scores_gemma":[0.00029888586,0.000045630142,0.00021425127,0.00017494695,0.00002861041,0.0000022903748,0.00028422763,0.048640694,0.0006297748,0.9455911,0.0038305272,0.00025908503],"about_ca_topic_score_codex":0.000004365035,"about_ca_topic_score_gemma":0.000021169792,"teacher_disagreement_score":0.4192912,"about_ca_system_score_codex":0.00009759165,"about_ca_system_score_gemma":0.00003239626,"threshold_uncertainty_score":0.9995314},"labels":[],"label_agreement":null},{"id":"W2009795221","doi":"10.1007/s00220-010-1079-7","title":"On the Best Constant in the Moser-Onofri-Aubin Inequality","year":2010,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Partial Differential Equations","field":"Mathematics","cited_by":23,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Omega; Nabla symbol; Combinatorics; Unit sphere; Mathematics; Sobolev space; Space (punctuation); Lebesgue measure; Physics; Lebesgue integration; Mathematical analysis; Quantum mechanics; Philosophy","score_opus":0.20520000609297487,"score_gpt":0.4167215221970572,"score_spread":0.21152151610408235,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2009795221","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.87512606,0.000026147598,0.027285261,0.018095316,0.00013994481,0.0021361057,0.00006509293,0.00010311177,0.077022985],"genre_scores_gemma":[0.9848941,0.000011314953,0.014272772,0.00035654762,0.000054207903,0.00032142858,0.000017009022,0.000026345278,0.000046277062],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9977333,0.00075564603,0.0006804968,0.00018606057,0.00037088664,0.0002735969],"domain_scores_gemma":[0.9844134,0.011583099,0.00016602274,0.0037106765,0.0000842658,0.000042563148],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0018918164,0.00019719641,0.00029210295,0.000053954467,0.00026811723,0.00009627986,0.0020647312,0.00010288778,0.00012386413],"category_scores_gemma":[0.0040486907,0.00011899283,0.00010358188,0.0006054546,0.0005953724,0.00009440218,0.0003501241,0.0013366592,0.00034286102],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000040841414,0.0019221775,0.000095323674,0.000025277337,0.000009028553,5.7090386e-7,0.001763341,0.000006276168,0.00043642503,0.9947914,0.00021854648,0.00072754256],"study_design_scores_gemma":[0.00022951048,0.000022940492,0.00014761252,0.00008629924,0.000022699707,0.0000018315839,0.0009347449,0.013873631,0.00019550341,0.98416346,0.00018362005,0.00013815319],"about_ca_topic_score_codex":0.00002464345,"about_ca_topic_score_gemma":0.0005410923,"teacher_disagreement_score":0.10976806,"about_ca_system_score_codex":0.000042571985,"about_ca_system_score_gemma":0.00006929809,"threshold_uncertainty_score":0.58071935},"labels":[],"label_agreement":null},{"id":"W2009818601","doi":"10.1007/s00220-012-1604-y","title":"Symmetry of Bipolaron Bound States for Small Coulomb Repulsion","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Chemical Physics Studies","field":"Physics and Astronomy","cited_by":12,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Bipolaron; Coulomb; Ground state; Symmetry (geometry); Physics; Bound state; Quantum mechanics; Condensed matter physics; Electron; State (computer science); Circular symmetry; Polaron; Mathematics; Geometry","score_opus":0.05553793862126102,"score_gpt":0.3453031028535153,"score_spread":0.2897651642322543,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2009818601","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.35914832,0.0019405192,0.5862371,0.00059161166,0.00013212673,0.0015290079,0.00027005654,0.00009818008,0.05005309],"genre_scores_gemma":[0.9373053,0.000027978125,0.06220346,0.000017208036,0.000099043435,0.00014739197,0.000102957245,0.000025499234,0.00007119122],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990459,0.000037499052,0.00040424798,0.00012251807,0.000103133236,0.00028667756],"domain_scores_gemma":[0.997443,0.0011022894,0.00018286062,0.0011050551,0.000108995904,0.00005779109],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00019703105,0.00014901001,0.00032419688,0.000027331145,0.00011572735,0.000010988913,0.00049257575,0.000032077904,0.000015443697],"category_scores_gemma":[0.000057018206,0.0001409569,0.000116145835,0.0002271562,0.00027361547,0.00016854145,0.0003763243,0.00019667111,0.000013343712],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000107587175,0.0020523227,0.006142856,0.00017394224,0.00007891842,1.0665888e-8,0.001231599,0.00007486217,0.0050394554,0.9734625,0.0004303267,0.011302425],"study_design_scores_gemma":[0.00027936074,0.00001636962,0.00017411348,0.00008828036,0.000037870806,6.283791e-8,0.0005833309,0.0015311377,0.011323125,0.98499566,0.00081663445,0.00015405],"about_ca_topic_score_codex":0.0000095321575,"about_ca_topic_score_gemma":4.5217922e-7,"teacher_disagreement_score":0.57815695,"about_ca_system_score_codex":0.000041083305,"about_ca_system_score_gemma":0.000014961144,"threshold_uncertainty_score":0.57480556},"labels":[],"label_agreement":null},{"id":"W2011031193","doi":"10.1007/s002200050008","title":"Eigenfunctions and Eigenvalues for a Scalar Riemann-Hilbert Problem Associated to Inverse Scattering","year":2000,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":25,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Eigenfunction; Korteweg–de Vries equation; Eigenvalues and eigenvectors; Mathematics; Scalar (mathematics); Mathematical analysis; Nonlinear system; Inverse scattering problem; Singularity; Mathematical physics; Inverse problem; Physics; Quantum mechanics","score_opus":0.038337334566152154,"score_gpt":0.3183711593607418,"score_spread":0.2800338247945896,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2011031193","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7445713,0.00011846158,0.116717584,0.006209105,0.00007042929,0.0035894844,0.00051675667,0.00020086713,0.12800598],"genre_scores_gemma":[0.89637035,0.000016533613,0.101029806,0.0002016019,0.00011364855,0.0004439343,0.00015553365,0.00004078304,0.0016278],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991612,0.000058181362,0.000294707,0.00017480137,0.00008019309,0.00023093124],"domain_scores_gemma":[0.99877226,0.00028384285,0.000045256475,0.00074985466,0.000053446656,0.000095345735],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0001970387,0.00013312549,0.0002211495,0.000033979653,0.0002757619,0.00006227905,0.00032541566,0.00003567079,0.00015668264],"category_scores_gemma":[0.00002356338,0.00013324077,0.00008075231,0.00024220045,0.00012542728,0.00011146131,0.00015523311,0.00015899031,0.00010267148],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000027370128,0.0033911236,0.0070193075,0.00015027737,0.00026077195,3.2147082e-7,0.007368332,0.00169477,0.0006806846,0.8777397,0.0029494269,0.09871786],"study_design_scores_gemma":[0.00058604183,0.000054043685,0.0011058243,0.00020419619,0.00006687114,5.1610084e-7,0.0005501244,0.068171635,0.0001278024,0.919449,0.009350567,0.0003333922],"about_ca_topic_score_codex":0.00004411102,"about_ca_topic_score_gemma":0.000020083047,"teacher_disagreement_score":0.15179902,"about_ca_system_score_codex":0.00003202131,"about_ca_system_score_gemma":0.000027696435,"threshold_uncertainty_score":0.5433401},"labels":[],"label_agreement":null},{"id":"W2012734828","doi":"10.1007/s00220-005-1390-x","title":"An Integral Spectral Representation of the Propagator for the Wave Equation in the Kerr Geometry","year":2005,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":31,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Mathematics; Mathematical analysis; Superposition principle; Ode; Propagator; Scalar (mathematics); Integral equation; Geometry; Mathematical physics","score_opus":0.21838254484526284,"score_gpt":0.42483315233868557,"score_spread":0.20645060749342273,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2012734828","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.09421077,0.00012317213,0.885693,0.008283277,0.00006985473,0.005509266,0.000029152907,0.000081787664,0.005999678],"genre_scores_gemma":[0.8382351,0.000017372176,0.16079901,0.00013553398,0.00008465984,0.00064575823,0.000011107588,0.000034139364,0.000037316346],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99770343,0.00041794192,0.0009065441,0.0002245522,0.00045251826,0.000294982],"domain_scores_gemma":[0.9891977,0.0066721477,0.0004959291,0.0034524275,0.00014981761,0.000031987725],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0015034484,0.00020990276,0.00036876297,0.000055566197,0.00023672517,0.00005477124,0.0021311108,0.00008061899,0.000017194303],"category_scores_gemma":[0.0024217742,0.000111812704,0.00019477069,0.0009958314,0.0005513057,0.00036995028,0.0002765555,0.00059343,0.000009832011],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001095415,0.0012924054,0.00005628731,0.000124572,0.000017022723,6.488506e-8,0.0045738705,0.00059225183,0.00065275084,0.9864715,0.00012819949,0.0060801273],"study_design_scores_gemma":[0.00032228872,0.00003111636,0.0002476408,0.000115305134,0.000047753354,0.0000021279184,0.0012834102,0.18194875,0.0021438205,0.8137056,0.00004120814,0.00011093021],"about_ca_topic_score_codex":0.0000073796928,"about_ca_topic_score_gemma":0.000049175324,"teacher_disagreement_score":0.74402434,"about_ca_system_score_codex":0.0001360402,"about_ca_system_score_gemma":0.000059108166,"threshold_uncertainty_score":0.45595896},"labels":[],"label_agreement":null},{"id":"W2013557783","doi":"10.1007/s00220-008-0438-0","title":"On the Exact Evaluation of Certain Instances of the Potts Partition Function by Quantum Computers","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":37,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Mathematics; Potts model; Partition function (quantum field theory); Exponential function; Discrete mathematics; Combinatorics; Partition (number theory); Quantum; Polynomial; Frequency partition of a graph; Graph; Ising model; Line graph; Quantum mechanics; Graph power","score_opus":0.06980303628868849,"score_gpt":0.2985053218965596,"score_spread":0.2287022856078711,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2013557783","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.4726669,0.00016600944,0.5221874,0.0029508532,0.000117524,0.00045388422,0.0000051871452,0.00003468565,0.0014175291],"genre_scores_gemma":[0.99385595,0.000019201929,0.005970634,0.0001054218,0.000010451664,0.000025391142,0.0000034345967,0.000005219263,0.000004274242],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.998347,0.00057881343,0.00034175633,0.00013231729,0.0004905155,0.00010959594],"domain_scores_gemma":[0.9966753,0.0012510634,0.00024304526,0.001669232,0.00014451164,0.000016846368],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0008696684,0.000094085306,0.00015464735,0.00003029423,0.00023408957,0.000015417314,0.0014905811,0.00003240442,0.0000038741446],"category_scores_gemma":[0.00020597744,0.00005673575,0.000076495504,0.0005611237,0.00032857741,0.00009680388,0.0003119163,0.00022873237,0.00000415037],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000031711338,0.0004927223,0.00007707442,0.000021629046,0.000014721231,4.3337696e-8,0.0017650424,0.015597865,0.00030508122,0.96491826,0.0005587578,0.016245617],"study_design_scores_gemma":[0.00010299178,0.000028559292,0.00088057097,0.00008898833,0.000006474605,8.757456e-7,0.000030171352,0.6000766,0.00040181886,0.3983167,0.00002685283,0.000039380462],"about_ca_topic_score_codex":0.0000070303176,"about_ca_topic_score_gemma":0.0000024225985,"teacher_disagreement_score":0.58447874,"about_ca_system_score_codex":0.00003590128,"about_ca_system_score_gemma":0.000062511695,"threshold_uncertainty_score":0.27698952},"labels":[],"label_agreement":null},{"id":"W2015468498","doi":"10.1007/s00220-014-2038-5","title":"Asymptotically Well-Behaved Input States Do Not Violate Additivity for Conjugate Pairs of Random Quantum Channels","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":10,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"","keywords":"Additive function; Mathematics; Quantum; Entropy (arrow of time); Quantum channel; Sequence (biology); Pure mathematics; Statistical physics; Discrete mathematics; Quantum entanglement; Quantum mechanics; Mathematical analysis; Physics","score_opus":0.029012514287888497,"score_gpt":0.2863578510257103,"score_spread":0.25734533673782184,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2015468498","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.011581146,0.000020899428,0.98327667,0.0010937692,0.00007400242,0.000571081,0.000024476112,0.0001133663,0.0032446177],"genre_scores_gemma":[0.9205816,0.00006338229,0.078780286,0.0003162163,0.00001890321,0.00017867543,0.000038135586,0.000014287837,0.000008528434],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99814403,0.0002832342,0.0007930677,0.00021150552,0.0002712004,0.00029694854],"domain_scores_gemma":[0.9945169,0.002744256,0.000262945,0.0021043965,0.0002734221,0.00009808256],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0013259039,0.00019444007,0.0004663503,0.00012098112,0.00017254798,0.00012936379,0.00194655,0.00008544588,0.000014946599],"category_scores_gemma":[0.0003925513,0.00017618202,0.00019924005,0.0004969248,0.00037736315,0.0005041731,0.0005097863,0.00024754571,0.000070415714],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000020562988,0.0004020656,0.000020217743,0.00012844143,0.000019976402,6.106028e-8,0.0012070781,0.00038030112,0.00019309668,0.9929848,0.00015228178,0.0044911616],"study_design_scores_gemma":[0.0008051486,0.000059287595,0.000085455365,0.000089080786,0.000009663768,6.02283e-7,0.000053829037,0.5417733,0.0009380289,0.45551664,0.00053859793,0.0001303131],"about_ca_topic_score_codex":0.0000035571666,"about_ca_topic_score_gemma":0.000001707386,"teacher_disagreement_score":0.90900046,"about_ca_system_score_codex":0.000022406295,"about_ca_system_score_gemma":0.00004267669,"threshold_uncertainty_score":0.7184494},"labels":[],"label_agreement":null},{"id":"W2016997301","doi":"10.1007/s00220-013-1833-8","title":"Cauchy–Laguerre Two-Matrix Model and the Meijer-G Random Point Field","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":49,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Saskatchewan; Université de Montréal; Concordia University","funders":"","keywords":"Laguerre polynomials; Biorthogonal system; Random matrix; Fredholm determinant; Random field; Eigenvalues and eigenvectors; Determinantal point process; Cauchy distribution; Random compact set; Point process","score_opus":0.053664564509518856,"score_gpt":0.3651884540607192,"score_spread":0.31152388955120036,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2016997301","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.06764947,0.0014886922,0.7517477,0.04792173,0.00005498563,0.00636657,0.000021649834,0.00035288258,0.12439632],"genre_scores_gemma":[0.8897646,0.00031036648,0.10773981,0.0003085585,0.00004471009,0.0012251256,0.000006396029,0.000033419223,0.00056701864],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99848557,0.00021321703,0.0006371556,0.00020188038,0.00021100853,0.0002511667],"domain_scores_gemma":[0.9907119,0.0066323634,0.00018656091,0.0022841408,0.000108619264,0.00007636233],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00078233646,0.0002037021,0.00047911704,0.000044212764,0.00031847827,0.00013734472,0.001046224,0.0000768335,0.000072824405],"category_scores_gemma":[0.00072049553,0.00013486423,0.00014081622,0.00031204618,0.00043450718,0.00021835526,0.0005415806,0.00044209498,0.0001359625],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000018985094,0.0002493744,0.000012038885,0.00006723576,0.000023348985,9.853602e-8,0.0014010569,0.00018220345,0.00004641516,0.9938364,0.0022296712,0.0019331563],"study_design_scores_gemma":[0.002441258,0.0000048354414,0.000005246902,0.00004193013,0.000047445003,0.0000032573782,0.0002892216,0.3361715,0.000027441865,0.66077304,0.00008597197,0.00010883396],"about_ca_topic_score_codex":0.00007217949,"about_ca_topic_score_gemma":0.00002591018,"teacher_disagreement_score":0.8221151,"about_ca_system_score_codex":0.00003087683,"about_ca_system_score_gemma":0.000029590421,"threshold_uncertainty_score":0.5499604},"labels":[],"label_agreement":null},{"id":"W2017565711","doi":"10.1007/s00220-011-1251-8","title":"Spectral Dimension and Random Walks on the Two Dimensional Uniform Spanning Tree","year":2011,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":18,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Random walk; Mathematics; Combinatorics; Spanning tree; Euclidean minimum spanning tree; Dimension (graph theory); Shortest-path tree; Loop-erased random walk; Minimum spanning tree; Euclidean geometry; Tree (set theory); Random graph; Random tree; Graph; Euclidean distance; Discrete mathematics; Minimum degree spanning tree; Geometry; Statistics; Computer science","score_opus":0.1347383039528844,"score_gpt":0.34603152606836174,"score_spread":0.21129322211547735,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2017565711","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0947859,0.00020079754,0.7994872,0.0029601015,0.00013442936,0.0016116728,0.000030955318,0.00022428858,0.100564666],"genre_scores_gemma":[0.83183384,0.000017615155,0.16774291,0.00020064836,0.00002639781,0.00007560005,0.0000046444084,0.000028592664,0.00006977284],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987247,0.00011941386,0.00042924803,0.00020223895,0.00026048048,0.0002639489],"domain_scores_gemma":[0.99334055,0.005149299,0.00011974095,0.0012374588,0.00007218788,0.0000807902],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006071667,0.00019995123,0.00032681692,0.000041027608,0.00026351772,0.000030790437,0.00059275026,0.00005832521,0.00010074902],"category_scores_gemma":[0.001401185,0.00013222657,0.00006281774,0.00023010372,0.0002984254,0.000077313074,0.0004092434,0.00045654946,0.000058158366],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000038688086,0.00043404888,0.0000073022793,0.000039192917,0.000017948376,0.0000019405327,0.0012424085,0.0000062331915,0.00006148579,0.99452686,0.000103520266,0.0035203751],"study_design_scores_gemma":[0.00064488704,0.00006457032,0.000057804235,0.00020970813,0.00004273442,0.000007818566,0.00020085862,0.09920788,0.00023921861,0.89916223,0.00001596074,0.00014630078],"about_ca_topic_score_codex":0.0000064085707,"about_ca_topic_score_gemma":0.000010474948,"teacher_disagreement_score":0.7370479,"about_ca_system_score_codex":0.000041077066,"about_ca_system_score_gemma":0.000027446338,"threshold_uncertainty_score":0.5392043},"labels":[],"label_agreement":null},{"id":"W2017709835","doi":"10.1007/s00220-006-0095-0","title":"The Green-Kubo Formula for the Spin-Fermion System","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Thermodynamics and Statistical Mechanics","field":"Physics and Astronomy","cited_by":26,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Fermion; Entropy production; Inverse; Reciprocity (cultural anthropology); Physics; Quantum; Entropy (arrow of time); Coupling (piping); Thermal equilibrium; Spin (aerodynamics); Kubo formula; Complex system; Quantum mechanics; Mathematical physics; Mathematics; Thermodynamics; Materials science","score_opus":0.024551898635906406,"score_gpt":0.3165186021500118,"score_spread":0.2919667035141054,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2017709835","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00052300387,0.00011829726,0.9852453,0.0008801215,0.000049568625,0.000626046,0.00005534549,0.000027998789,0.012474358],"genre_scores_gemma":[0.9759417,0.00000869464,0.02310962,0.000018430388,0.00012932946,0.0004590725,0.000039649447,0.000024759413,0.00026873284],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99909836,0.000055804485,0.0003657034,0.000120437464,0.00012007565,0.00023962601],"domain_scores_gemma":[0.9959924,0.002430014,0.00011760769,0.0013531212,0.00008119874,0.000025665526],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003053525,0.00012935943,0.00016591219,0.0000101211845,0.00068029884,0.0000677502,0.0009151998,0.000027404378,0.0000047026797],"category_scores_gemma":[0.000024850133,0.000077030534,0.00010292475,0.00015830422,0.00016581232,0.000058587284,0.00021063395,0.00021005499,0.000023827697],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000039564775,0.00010917952,0.00001058197,0.000021681975,0.000012945305,4.305458e-8,0.000042440013,0.0002287158,0.000031453787,0.9723257,0.00004196485,0.02717138],"study_design_scores_gemma":[0.00012907217,0.0000070471237,0.00002849236,0.000025996877,0.00001596245,2.0390462e-7,0.00022265465,0.39958292,0.000020114863,0.5987027,0.0012033818,0.00006140284],"about_ca_topic_score_codex":0.000041634594,"about_ca_topic_score_gemma":0.000018746365,"teacher_disagreement_score":0.9754187,"about_ca_system_score_codex":0.00005120143,"about_ca_system_score_gemma":0.000020786953,"threshold_uncertainty_score":0.52323776},"labels":[],"label_agreement":null},{"id":"W2018005568","doi":"10.1007/s00220-009-0818-0","title":"Extinctions and Correlations for Uniformly Discrete Point Processes with Pure Point Dynamical Spectra","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":13,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Victoria","funders":"","keywords":"Dynamical systems theory; Point (geometry); Dynamical system (definition); Graph; Point process; Physical system; Space (punctuation); Upper and lower bounds","score_opus":0.04651000419897491,"score_gpt":0.3442928049611706,"score_spread":0.2977828007621957,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2018005568","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.018554436,0.000074210744,0.93867,0.0054642954,0.000026201413,0.0022263415,0.00005840266,0.0003589918,0.034567144],"genre_scores_gemma":[0.65453553,0.00005203528,0.34472707,0.0001222381,0.00006611164,0.0002860902,0.000041213985,0.00006016296,0.000109542416],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99788517,0.0001226643,0.0007858715,0.00040125533,0.0003209999,0.00048406518],"domain_scores_gemma":[0.99207747,0.005288541,0.00026060827,0.001957265,0.0002486752,0.00016746974],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0005408104,0.0003983331,0.00063251867,0.0001027109,0.00040777834,0.00012727176,0.0008511746,0.00013896165,0.000054587286],"category_scores_gemma":[0.0016130918,0.00032407674,0.00012601772,0.0007847365,0.00062369363,0.0004959099,0.00018304361,0.00059651537,0.000028040426],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00003609539,0.0012069091,0.0000263411,0.00035899907,0.000038425733,9.727415e-7,0.0014135528,0.000046315512,0.000102428894,0.99599475,0.00008957206,0.0006856194],"study_design_scores_gemma":[0.0007059843,0.00024446406,0.00013013034,0.00039786156,0.00014506285,0.000030854007,0.0008242162,0.023224233,0.00013359173,0.973713,0.00004625058,0.00040434758],"about_ca_topic_score_codex":0.0000012826916,"about_ca_topic_score_gemma":0.000044810888,"teacher_disagreement_score":0.6359811,"about_ca_system_score_codex":0.0001530518,"about_ca_system_score_gemma":0.0001229699,"threshold_uncertainty_score":0.99992114},"labels":[],"label_agreement":null},{"id":"W2018211673","doi":"10.1007/s00220-005-1505-4","title":"Semiclassical Orthogonal Polynomials, Matrix Models and Isomonodromic Tau Functions","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical functions and polynomials","field":"Mathematics","cited_by":68,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Concordia University","funders":"","keywords":"Logarithmic derivative; Ramanujan tau function; Normal matrix; Mathematics; Orthogonal polynomials; Pure mathematics; Semiclassical physics; Monodromy matrix; Logarithm; Covariant transformation; Matrix (chemical analysis); Rational function; Monodromy; Complex plane; Partition (number theory); Mathematical analysis; Mathematical physics; Combinatorics; Eigenvalues and eigenvectors; Physics; Quantum mechanics; Quantum","score_opus":0.08312821210069593,"score_gpt":0.3484627646429628,"score_spread":0.26533455254226684,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2018211673","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.23232582,0.0010630845,0.6132961,0.004437842,0.00022146915,0.0019858242,0.00019730923,0.00066348,0.14580907],"genre_scores_gemma":[0.8489323,0.00009454513,0.14616506,0.000080025,0.0002406803,0.00029554658,0.00006542855,0.00009011381,0.0040362985],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9975193,0.00023774907,0.0010977604,0.00038501256,0.00029978936,0.00046038133],"domain_scores_gemma":[0.9945999,0.0029287487,0.00022425708,0.0020089129,0.00009599488,0.00014218806],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0007005183,0.0003538037,0.00067991496,0.0001463819,0.0003543685,0.00012433469,0.0006937941,0.00021314184,0.00022805971],"category_scores_gemma":[0.00031705858,0.00032608936,0.00018268761,0.0004799262,0.0005216288,0.00034268104,0.00054115796,0.00056949427,0.00020517223],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000011442998,0.001074535,0.00009871091,0.00013598717,0.000026341695,0.0000011341132,0.0001646382,0.00010052056,0.00044578413,0.9892228,0.007939121,0.00077895663],"study_design_scores_gemma":[0.0004941435,0.000027047823,0.00008112818,0.00012569547,0.00008530111,0.00002652836,0.00014546218,0.07100762,0.00008016314,0.9262309,0.0013724712,0.0003235617],"about_ca_topic_score_codex":0.00003255866,"about_ca_topic_score_gemma":0.0000502478,"teacher_disagreement_score":0.6166065,"about_ca_system_score_codex":0.00012643883,"about_ca_system_score_gemma":0.000082889,"threshold_uncertainty_score":0.9999191},"labels":[],"label_agreement":null},{"id":"W2018324567","doi":"10.1007/s00220-007-0280-9","title":"The Manifold of Compatible Almost Complex Structures and Geometric Quantization","year":2007,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":15,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Western University","funders":"","keywords":"Mathematics; Geometric quantization; Symplectic manifold; Symplectic geometry; Parallel transport; Quantization (signal processing); Constant curvature; Pure mathematics; Hamiltonian (control theory); Curvature; Connection (principal bundle); Hilbert manifold; Manifold (fluid mechanics); Classical limit; Hilbert space; Mathematical analysis; Quantum; Canonical quantization; Geometry; Physics; Quantum mechanics; Quantum gravity","score_opus":0.1676499025757205,"score_gpt":0.38963785503667064,"score_spread":0.22198795246095016,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2018324567","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.36045513,0.0009501475,0.585065,0.0007906926,0.00008781397,0.0012501151,0.000021827174,0.0001477047,0.051231567],"genre_scores_gemma":[0.93055433,0.00009561969,0.06919937,0.000026657226,0.00001927565,0.000011733002,0.000011645027,0.000018539191,0.000062840394],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99851835,0.0001229141,0.0006875013,0.000143718,0.00027864033,0.0002488803],"domain_scores_gemma":[0.99337864,0.0046711667,0.0002546934,0.0015012699,0.00014169801,0.000052551175],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0011522582,0.00015345169,0.00031499224,0.00014682522,0.00031733038,0.000048543498,0.0009091516,0.00006522776,0.000030060843],"category_scores_gemma":[0.0006566984,0.000118288415,0.00005864338,0.0012010607,0.0003373206,0.000093146155,0.00045483644,0.00023761384,0.000009665853],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008159345,0.00026122344,0.0018518558,0.00012661231,0.000021827736,3.157695e-7,0.00036778275,0.000009056486,0.00021054313,0.99348307,0.0002030807,0.0034564764],"study_design_scores_gemma":[0.00027046923,0.000033293567,0.019983718,0.00004867245,0.000028650053,0.000006379341,0.00070327875,0.0058460226,0.00046532502,0.97204244,0.00044117976,0.00013055155],"about_ca_topic_score_codex":0.00001218171,"about_ca_topic_score_gemma":0.000056919587,"teacher_disagreement_score":0.5700992,"about_ca_system_score_codex":0.00003125331,"about_ca_system_score_gemma":0.00001640345,"threshold_uncertainty_score":0.48236617},"labels":[],"label_agreement":null},{"id":"W2018681324","doi":"10.1007/s00220-013-1750-x","title":"Log-Gamma Polymer Free Energy Fluctuations via a Fredholm Determinant Identity","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":113,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Fredholm determinant; Laplace transform; Fredholm integral equation; Mathematics; Identity (music); Scaling; Pure mathematics; Formalism (music); Mathematical analysis; Mathematical physics; Integral equation; Physics; Geometry","score_opus":0.05491535084917315,"score_gpt":0.34067247217942154,"score_spread":0.2857571213302484,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2018681324","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.034586564,0.00050306827,0.92917013,0.003615568,0.00006877201,0.0012216629,0.00003765878,0.00029379877,0.030502785],"genre_scores_gemma":[0.87366235,0.00013186451,0.12321774,0.00019645222,0.00010045044,0.0015958206,0.000038610215,0.000068324436,0.0009883663],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99795073,0.00017373281,0.00084725645,0.00029206523,0.00035942905,0.00037675764],"domain_scores_gemma":[0.9933031,0.0018005327,0.00026954466,0.004310218,0.00018534751,0.00013124796],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00033432042,0.00026375955,0.00045255074,0.00011626156,0.00034591518,0.0001588041,0.0023297598,0.00013219056,0.0003700071],"category_scores_gemma":[0.00043563553,0.00024209636,0.00018694658,0.0007725145,0.00033776808,0.0006552511,0.000920173,0.0003315428,0.000538356],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000001733354,0.0008895456,0.000059089663,0.00005819833,0.000026567031,4.6480596e-7,0.00044802975,0.0000028983293,0.0010378887,0.988742,0.002115884,0.0066176774],"study_design_scores_gemma":[0.00055450684,0.000013441195,0.00029208197,0.000065446424,0.000062357576,0.000007610781,0.00014705853,0.024786796,0.0005618171,0.97283286,0.00041086416,0.0002651813],"about_ca_topic_score_codex":0.00029470806,"about_ca_topic_score_gemma":0.00022304412,"teacher_disagreement_score":0.8390758,"about_ca_system_score_codex":0.00009014777,"about_ca_system_score_gemma":0.000051999094,"threshold_uncertainty_score":0.98724025},"labels":[],"label_agreement":null},{"id":"W2018788956","doi":"10.1007/s00220-003-0885-6","title":"End-to-End Distance from the Green's Function for a Hierarchical Self-Avoiding Walk in Four Dimensions","year":2003,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":15,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Laplace transform; Lattice (music); Inverse; Function (biology); Lévy process; Inverse Laplace transform; Rate function; Simple (philosophy)","score_opus":0.08713348281451928,"score_gpt":0.3406059887961292,"score_spread":0.2534725059816099,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2018788956","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0036177877,0.00008689961,0.9912356,0.0021668463,0.00006948202,0.0009705646,0.000084294064,0.00007391959,0.00169461],"genre_scores_gemma":[0.6589486,0.000019602096,0.34014365,0.00027342665,0.00003680229,0.00048742897,0.000013561766,0.00003580766,0.00004109585],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9980502,0.00032605528,0.0006371351,0.0003118002,0.0002927933,0.0003820207],"domain_scores_gemma":[0.9802349,0.01782859,0.00011947926,0.0015947877,0.00011173331,0.000110491324],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0009555201,0.00022576297,0.0004069154,0.000050109986,0.00035663857,0.00005464059,0.0008247845,0.00010147651,0.000035508525],"category_scores_gemma":[0.0061816247,0.00017716133,0.00009838016,0.00060455914,0.000120600285,0.00009440364,0.00026341047,0.0006336427,0.000039174327],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001980964,0.0005065817,0.000023814993,0.00007884969,0.000023506109,8.1272646e-7,0.001399988,0.00001677949,0.00006683724,0.9952283,0.00019197354,0.002442763],"study_design_scores_gemma":[0.00044748033,0.000051500396,0.000064004504,0.00022843474,0.000068199486,0.0000018986501,0.00041554638,0.060310252,0.000035957037,0.936706,0.0014752685,0.00019547486],"about_ca_topic_score_codex":0.000015420605,"about_ca_topic_score_gemma":0.00014932382,"teacher_disagreement_score":0.65533084,"about_ca_system_score_codex":0.00013796246,"about_ca_system_score_gemma":0.0000825836,"threshold_uncertainty_score":0.74004287},"labels":[],"label_agreement":null},{"id":"W2020582875","doi":"10.1007/s00220-014-1990-4","title":"One-Shot Decoupling","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":142,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; McGill University","funders":"Engineering and Physical Sciences Research Council; CHIST-ERA; Natural Sciences and Engineering Research Council of Canada; University of Bristol; Schweizerischer Nationalfonds zur Förderung der Wissenschaftlichen Forschung; Agence Nationale de la Recherche; National Science Foundation","keywords":"Decoupling (probability); Quantum entanglement; Correlation; Quantum; Mathematics; Statistical physics; Computer science; Quantum discord; Total correlation; Applied mathematics; Physics; Quantum mechanics; Geometry","score_opus":0.08052535266334204,"score_gpt":0.3285108011254938,"score_spread":0.24798544846215176,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2020582875","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.006959789,0.000050705657,0.9795784,0.001618093,0.000035654382,0.00008917974,3.268455e-7,0.00014604803,0.011521805],"genre_scores_gemma":[0.5488862,0.000007842324,0.45089507,0.00014912714,0.000033146658,0.000010495193,0.0000014299901,0.000006570857,0.000010112592],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99910563,0.00009860432,0.0002541516,0.00018814112,0.00015443732,0.00019903189],"domain_scores_gemma":[0.9966471,0.00080334995,0.000063763466,0.0023920478,0.00004053998,0.000053198226],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00045094208,0.0000957428,0.00017537,0.000044917,0.00015979438,0.00009754025,0.0023646515,0.00003743641,0.000002916589],"category_scores_gemma":[0.00015220694,0.000095742755,0.00005171386,0.00040535533,0.0001007441,0.0001270469,0.00096539716,0.00030271793,0.00009874064],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[2.0697865e-7,0.00020677387,0.00003187654,0.000016836177,0.0000034530503,1.1448922e-7,0.0004968529,0.0020400197,0.000060031743,0.89632964,0.000016076146,0.10079809],"study_design_scores_gemma":[0.000059797254,0.00000844018,0.00013187852,0.00004602445,0.0000013448164,9.332856e-7,0.0000042685583,0.5521222,0.000060921328,0.44722775,0.00026938392,0.00006711254],"about_ca_topic_score_codex":0.0000020023172,"about_ca_topic_score_gemma":0.0000015618009,"teacher_disagreement_score":0.55008215,"about_ca_system_score_codex":0.000021093598,"about_ca_system_score_gemma":0.000019362338,"threshold_uncertainty_score":0.43941504},"labels":[],"label_agreement":null},{"id":"W2020706201","doi":"10.1007/s00220-010-1145-1","title":"Spanning Forest Polynomials and the Transcendental Weight of Feynman Graphs","year":2010,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"advanced mathematical theories","field":"Mathematics","cited_by":33,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Simon Fraser University","funders":"","keywords":"Transcendental number; Feynman diagram; Feynman integral; Transcendental equation; Spanning tree; Transcendental function; Minimum spanning tree; Feynman graph","score_opus":0.05273623764521134,"score_gpt":0.358989727965902,"score_spread":0.30625349032069066,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2020706201","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.85084057,0.00041315894,0.09805452,0.003010897,0.00015918566,0.0020848007,0.000031473453,0.0002006785,0.045204733],"genre_scores_gemma":[0.8182506,0.000060504724,0.18144761,0.000029051376,0.000028999115,0.000102701335,0.0000028920365,0.00003359509,0.00004406408],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99837893,0.00019199727,0.00075289013,0.0001779549,0.00025102898,0.00024721565],"domain_scores_gemma":[0.9909198,0.006649231,0.00025074123,0.002037493,0.00007575148,0.00006695771],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.001150243,0.0002133086,0.00059807446,0.00006059776,0.00018928369,0.000033552547,0.0010917216,0.000101876845,0.00003079106],"category_scores_gemma":[0.0016079278,0.00014683127,0.0001506118,0.00031802335,0.002652004,0.00017865779,0.0003982249,0.0006601963,0.000011156488],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000024239182,0.00036137187,0.00014546479,0.00018679781,0.000028626366,3.114287e-7,0.0024697394,0.000001806667,0.0007644031,0.9950719,0.000022339173,0.0009229845],"study_design_scores_gemma":[0.0010009418,0.000012952173,0.00008233486,0.00014211045,0.00006448126,0.000010727121,0.0005319128,0.0026563082,0.0012676402,0.994023,0.000055037206,0.0001525572],"about_ca_topic_score_codex":0.0000037560237,"about_ca_topic_score_gemma":0.00003615159,"teacher_disagreement_score":0.08339308,"about_ca_system_score_codex":0.000014931029,"about_ca_system_score_gemma":0.000023586485,"threshold_uncertainty_score":0.97714186},"labels":[],"label_agreement":null},{"id":"W2020778082","doi":"10.1007/s00220-004-1273-6","title":"Diffusion of Power in Randomly Perturbed Hamiltonian Partial Differential Equations","year":2005,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Bell (Canada)","funders":"","keywords":"Mathematics; Mathematical analysis; Hamiltonian (control theory); Partial differential equation; Hamiltonian system; Statistical physics; Physics","score_opus":0.026474434133800493,"score_gpt":0.2987352152139873,"score_spread":0.2722607810801868,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2020778082","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6651108,0.00007814684,0.31764695,0.00085735583,0.00005112628,0.00058546936,0.000034813536,0.00002806532,0.015607236],"genre_scores_gemma":[0.99781275,0.000004550803,0.0018635745,0.000012881083,0.00006577284,0.00009144947,0.000043309596,0.000014865311,0.00009085207],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.998713,0.00015053239,0.00062162435,0.00014590671,0.00016826917,0.00020067084],"domain_scores_gemma":[0.9982183,0.00060479186,0.0001349275,0.0009460771,0.000042725194,0.000053200394],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00017301663,0.000135994,0.0003577553,0.000055607085,0.00007158633,0.000023279908,0.0005003418,0.000048024558,0.000239378],"category_scores_gemma":[0.000042544892,0.00011828431,0.00012225684,0.0002528954,0.00016088369,0.00011479215,0.00022309362,0.0002497229,0.00005513918],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000018019364,0.0021925713,0.00256608,0.000021411714,0.000016994425,9.365211e-8,0.0017869576,0.0003156692,0.0016430313,0.986993,0.000025735942,0.0044204365],"study_design_scores_gemma":[0.0025403516,0.000029606585,0.0035296928,0.00022883712,0.000023582572,1.942169e-7,0.0004304883,0.78550434,0.00029058664,0.20677593,0.00039075824,0.0002556004],"about_ca_topic_score_codex":0.000062796666,"about_ca_topic_score_gemma":0.000026335054,"teacher_disagreement_score":0.7851887,"about_ca_system_score_codex":0.00003874083,"about_ca_system_score_gemma":0.00002725394,"threshold_uncertainty_score":0.48234943},"labels":[],"label_agreement":null},{"id":"W2022390604","doi":"10.1007/s00220-005-1410-x","title":"Superpotentials and the Cohomogeneity One Einstein Equations","year":2005,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometric Analysis and Curvature Flows","field":"Mathematics","cited_by":14,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McMaster University","funders":"","keywords":"Mathematics; Einstein; Complex system; Regular polygon; Pure mathematics; Mathematical physics; Hamiltonian system; Mathematical analysis; Hamiltonian (control theory); Geometry","score_opus":0.11597940699699386,"score_gpt":0.34802363703148936,"score_spread":0.2320442300344955,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2022390604","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.08956704,0.0028338348,0.8284942,0.025685929,0.000040506606,0.0016970142,0.000021178694,0.00017779689,0.051482517],"genre_scores_gemma":[0.9041025,0.00023810669,0.095031306,0.00016942166,0.0000657081,0.000118237454,0.000011021485,0.000016955282,0.00024671783],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99843425,0.00033983766,0.0005747492,0.00016760666,0.00028688333,0.00019667149],"domain_scores_gemma":[0.99384886,0.0039100708,0.00014128487,0.0019322034,0.000112155576,0.000055434473],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0014774245,0.00014696077,0.00042772116,0.000075203134,0.0002888805,0.00009225516,0.0008157341,0.00007575735,0.00009841425],"category_scores_gemma":[0.0018494424,0.00010377039,0.00013064903,0.000767728,0.0005496502,0.00017639014,0.0004410747,0.00033996854,0.00009346574],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004093874,0.00056321424,0.000048940285,0.000026186248,0.000056185963,7.3015265e-8,0.00076354056,0.00002516571,0.000033604632,0.9895703,0.00015003071,0.008758662],"study_design_scores_gemma":[0.0007430564,0.0000062709564,0.00014324236,0.00004761121,0.00016146098,0.0000014333025,0.0002637283,0.06306774,0.00006183376,0.9345333,0.0008381117,0.00013219395],"about_ca_topic_score_codex":0.000009966052,"about_ca_topic_score_gemma":0.000082511244,"teacher_disagreement_score":0.8145355,"about_ca_system_score_codex":0.000043648783,"about_ca_system_score_gemma":0.000025759346,"threshold_uncertainty_score":0.42316338},"labels":[],"label_agreement":null},{"id":"W2022846708","doi":"10.1007/s00220-006-0004-6","title":"The Green-Kubo Formula and the Onsager Reciprocity Relations in Quantum Statistical Mechanics","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Thermodynamics and Statistical Mechanics","field":"Physics and Astronomy","cited_by":49,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Natural Sciences and Engineering Research Council of Canada; Japan Society for the Promotion of Science; Centre National de la Recherche Scientifique; Canon Foundation in Europe","keywords":"Reciprocity (cultural anthropology); Ergodic theory; Axiom; Statistical mechanics; Quantum statistical mechanics; Algebraic number; Mathematics; Quantum; Onsager reciprocal relations; Statistical physics; Quantum mechanics; Physics; Classical mechanics; Mathematical analysis; Geometry","score_opus":0.015236823348122302,"score_gpt":0.2835372163642168,"score_spread":0.2683003930160945,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2022846708","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0028182508,0.00012830224,0.9845478,0.0020026963,0.000025835338,0.00051897357,0.00007203055,0.000018361685,0.009867784],"genre_scores_gemma":[0.9739724,0.000037744354,0.025498293,0.00003565444,0.000033403438,0.00020308948,0.000044980523,0.000021886062,0.0001525853],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9986005,0.0002511525,0.00052781485,0.00017536813,0.00016757118,0.0002776253],"domain_scores_gemma":[0.99438006,0.004376932,0.00012022474,0.0010248017,0.00005774068,0.00004022083],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00066406466,0.00015835396,0.0002566378,0.000023494938,0.00048391666,0.00007337431,0.0005819577,0.000045857592,0.00002295174],"category_scores_gemma":[0.00013848643,0.00010164293,0.00005340625,0.00029002785,0.00042794851,0.000096879296,0.0003416349,0.0005685034,0.000023594946],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000013528544,0.00019223029,0.00007763479,0.0000067287133,0.000009092937,2.7130102e-7,0.00017085958,0.00020045796,0.000008010549,0.99013287,0.000024161984,0.009164136],"study_design_scores_gemma":[0.00036698516,0.000005303869,0.0001576055,0.000018323446,0.000011064231,3.1510325e-7,0.00015628446,0.43135074,0.00000168021,0.56766695,0.00019336911,0.000071394104],"about_ca_topic_score_codex":0.0001694614,"about_ca_topic_score_gemma":0.00016901018,"teacher_disagreement_score":0.9711541,"about_ca_system_score_codex":0.00005102066,"about_ca_system_score_gemma":0.000034718032,"threshold_uncertainty_score":0.41448784},"labels":[],"label_agreement":null},{"id":"W2023466136","doi":"10.1007/s00220-013-1784-0","title":"A Framework for Bounding Nonlocality of State Discrimination","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":108,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"","keywords":"Quantum nonlocality; LOCC; Quantum entanglement; Bounding overwatch; Quantum state; Bipartite graph; Orthonormal basis; Quantum teleportation; Quantum; Set (abstract data type); Computer science; Mathematics; Discrete mathematics; Quantum mechanics; Quantum channel; Physics","score_opus":0.07578648863155643,"score_gpt":0.3551790674189526,"score_spread":0.2793925787873962,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2023466136","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0048015546,0.000020925996,0.9910212,0.0010784846,0.000025993986,0.00039832672,0.0000032518133,0.000045301447,0.0026049183],"genre_scores_gemma":[0.5185464,0.000011395412,0.48122233,0.000069385234,0.0000035056537,0.00013521062,0.000004564346,0.0000031499644,0.0000040523914],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991639,0.000057196397,0.00041041512,0.000089990455,0.00014291836,0.00013557739],"domain_scores_gemma":[0.99750584,0.0007878262,0.00015658468,0.0013553998,0.00015768124,0.00003666361],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00032476094,0.00007511794,0.00015205418,0.00006834123,0.000094008705,0.00009074298,0.0012343851,0.000035460867,0.000008360214],"category_scores_gemma":[0.00021071444,0.00006880629,0.000073475974,0.00047470714,0.0001520503,0.0006610697,0.0002762626,0.000128527,0.00003835701],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[5.195996e-7,0.00018001933,0.0000453198,0.0000807138,0.000004278032,6.6428747e-9,0.0021754806,0.000016157088,0.00005581468,0.9810774,0.000047325873,0.016316982],"study_design_scores_gemma":[0.00007286318,0.000011094828,0.00033203367,0.000059436716,0.0000018952741,1.5733976e-7,0.00013165291,0.32906657,0.00023292513,0.66997564,0.00006374583,0.00005200275],"about_ca_topic_score_codex":0.0000053267167,"about_ca_topic_score_gemma":0.0000013763583,"teacher_disagreement_score":0.5137449,"about_ca_system_score_codex":0.00002403213,"about_ca_system_score_gemma":0.000023855482,"threshold_uncertainty_score":0.2805839},"labels":[],"label_agreement":null},{"id":"W2023918750","doi":"10.1007/s00220-010-1116-6","title":"Asymptotic Stability, Concentration, and Oscillation in Harmonic Map Heat-Flow, Landau-Lifshitz, and Schrödinger Maps on $${\\mathbb R^2}$$","year":2010,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":68,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Harmonic map; Equivariant map; Flow (mathematics); Mathematics; Harmonic oscillator; Mathematical physics; Schrödinger's cat; Harmonic; Oscillation (cell signaling); Landau–Lifshitz–Gilbert equation; Symmetry (geometry); Stability (learning theory); Schrödinger equation; Work (physics); Energy (signal processing); Degree (music); Mathematical analysis; Physics; Quantum mechanics; Pure mathematics; Geometry; Magnetization; Magnetic field","score_opus":0.07529117680032416,"score_gpt":0.34609794478184,"score_spread":0.2708067679815158,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2023918750","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9455707,0.00020474245,0.034839325,0.0043139574,0.00013309298,0.0024132058,0.000047565598,0.00025956353,0.012217852],"genre_scores_gemma":[0.8925358,0.00007063081,0.10695922,0.00011577409,0.0000455746,0.00016428028,0.00002538866,0.000057895322,0.00002542525],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9976209,0.00020711224,0.00090398913,0.00046928698,0.00037034726,0.00042838647],"domain_scores_gemma":[0.9940596,0.003580236,0.00017170247,0.001909945,0.00012324423,0.00015522506],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0010709014,0.00035276142,0.0006131615,0.00007589083,0.00019917049,0.000116319265,0.00056018325,0.00019784106,0.000050217594],"category_scores_gemma":[0.0011923513,0.00033484993,0.00006415847,0.00040537026,0.00068890984,0.00042085393,0.00050494005,0.0011380067,0.0000565291],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000016426728,0.0009661054,0.0010724792,0.0004990285,0.000015059411,0.0000010756534,0.0018387261,0.000047310936,0.0016707121,0.99228483,0.00007630634,0.0015119384],"study_design_scores_gemma":[0.0008143161,0.000049276463,0.0003819743,0.0003299591,0.00002400568,0.0000052050104,0.00016539017,0.0527064,0.0004987306,0.9446079,0.00009885034,0.00031795044],"about_ca_topic_score_codex":0.0000053891868,"about_ca_topic_score_gemma":0.000070135065,"teacher_disagreement_score":0.07211989,"about_ca_system_score_codex":0.0000944434,"about_ca_system_score_gemma":0.000058372796,"threshold_uncertainty_score":0.99991035},"labels":[],"label_agreement":null},{"id":"W2026688161","doi":"10.1007/s00220-009-0858-5","title":"Constructing Locally Connected Non-Computable Julia Sets","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Julia set; Computable analysis; Computable number; Simple (philosophy); Mathematics; Quadratic equation; Set (abstract data type); Computable function; Pure mathematics; Discrete mathematics; Algebra over a field; Topology (electrical circuits); Computer science; Combinatorics; Geometry","score_opus":0.06812447505152873,"score_gpt":0.3635635981762621,"score_spread":0.29543912312473336,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2026688161","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.044923253,0.00007557878,0.7107832,0.002655509,0.00007359099,0.0012111396,0.000027138756,0.00036409046,0.23988655],"genre_scores_gemma":[0.66939676,0.000016050002,0.3301389,0.0001959063,0.000029425435,0.000035246798,0.0000234849,0.00003247677,0.00013179929],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99768215,0.00015425573,0.0010155372,0.00031476736,0.00034489788,0.00048839394],"domain_scores_gemma":[0.9943404,0.002671928,0.0002890678,0.0023646827,0.00018196988,0.00015194862],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00074965163,0.0003189716,0.0007384844,0.00009285044,0.00019626656,0.00011489011,0.0013141712,0.0001679979,0.000117695134],"category_scores_gemma":[0.0012341317,0.0002998028,0.00015889668,0.00064754125,0.00031466913,0.00021929183,0.00035662705,0.00064181694,0.00019658262],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000048955358,0.0010050149,0.000046634836,0.00013780175,0.000022119051,0.000003358695,0.00045258368,0.000022108426,0.0001199134,0.98491395,0.0004335103,0.0128381215],"study_design_scores_gemma":[0.00037087052,0.0000342816,0.000048332135,0.0002923419,0.000027712596,0.000013635647,0.0002251169,0.27720776,0.00008700071,0.7213903,0.000057831978,0.0002448446],"about_ca_topic_score_codex":0.0000031190016,"about_ca_topic_score_gemma":0.0000066967664,"teacher_disagreement_score":0.62447345,"about_ca_system_score_codex":0.00013890499,"about_ca_system_score_gemma":0.00006710798,"threshold_uncertainty_score":0.9999454},"labels":[],"label_agreement":null},{"id":"W2028545967","doi":"10.1007/s00220-012-1586-9","title":"SAYD Modules over Lie-Hopf Algebras","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":4,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of New Brunswick","funders":"","keywords":"Hopf algebra; Isomorphism (crystallography); Lie algebra; Cohomology; Algebra over a field; Quasitriangular Hopf algebra; Universal enveloping algebra","score_opus":0.09268966294290489,"score_gpt":0.36659753946041795,"score_spread":0.2739078765175131,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2028545967","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8870499,0.0012752014,0.049434636,0.0010533041,0.00057354383,0.0010843226,0.000014130607,0.00040903577,0.059105933],"genre_scores_gemma":[0.9461448,0.000054055858,0.053188045,0.00011261147,0.00021291307,0.00010297938,0.000008820474,0.000050743616,0.00012503781],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9983811,0.00016550625,0.00052478747,0.00017387359,0.00031333786,0.00044139777],"domain_scores_gemma":[0.9958032,0.0013086,0.00015241849,0.0025403027,0.00006171509,0.00013380169],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00043378666,0.00023787319,0.00040087153,0.00005539392,0.00020179011,0.000046187608,0.0011413274,0.00014021857,0.00017232107],"category_scores_gemma":[0.00045828213,0.00021342166,0.0001405605,0.00034730084,0.00023145996,0.0003218131,0.00066671043,0.00043687562,0.0001445155],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000033980427,0.000665419,0.00047183386,0.0000613167,0.000025937163,1.6002586e-7,0.001276533,0.0000030066183,0.000030573516,0.99513835,0.00071063184,0.0016128479],"study_design_scores_gemma":[0.0003089197,0.000011590183,0.00063377206,0.00007102455,0.000031658423,0.0000027658077,0.00016779531,0.0020191611,0.00011451879,0.99563164,0.00076398376,0.00024315111],"about_ca_topic_score_codex":0.0000059255553,"about_ca_topic_score_gemma":0.0000030974054,"teacher_disagreement_score":0.059094902,"about_ca_system_score_codex":0.0001022901,"about_ca_system_score_gemma":0.000025264859,"threshold_uncertainty_score":0.8703083},"labels":[],"label_agreement":null},{"id":"W2028590441","doi":"10.1007/s002200200602","title":"Non-Equilibrium Steady States of Finite¶Quantum Systems Coupled to Thermal Reservoirs","year":2002,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Thermodynamics and Statistical Mechanics","field":"Physics and Astronomy","cited_by":114,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Entropy production; Statistical mechanics; Quantum statistical mechanics; Quantum; Statistical physics; Eigenfunction; Thermal equilibrium; Entropy (arrow of time); Quantum system; Physics; Quantum mechanics; Mathematics; Theoretical physics","score_opus":0.04215195114771509,"score_gpt":0.3021079832057297,"score_spread":0.2599560320580146,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2028590441","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.11274549,0.00009414901,0.8763431,0.00043217582,0.000074488016,0.0007676046,0.00031873008,0.000032407657,0.009191868],"genre_scores_gemma":[0.98612994,0.0000052017726,0.013387059,0.00002162544,0.000030024485,0.00017416508,0.000053446416,0.000033337757,0.00016517784],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9986809,0.000097154254,0.0005412307,0.00018095282,0.0002257275,0.00027406964],"domain_scores_gemma":[0.99734646,0.00084245374,0.00015984228,0.0014387866,0.000119613374,0.000092817325],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00021668957,0.00016674164,0.00038695833,0.000051728355,0.000108986256,0.000030230907,0.0009461882,0.000029529012,0.00009267173],"category_scores_gemma":[0.000037502683,0.00016268945,0.00007203511,0.00038186967,0.0001150322,0.000080467915,0.00056367053,0.00030203146,0.00008866914],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000081430035,0.00083662267,0.00007419828,0.00005763053,0.00003036741,4.4265545e-7,0.00088975776,0.04180767,0.0011001204,0.9538278,0.00006084228,0.001306424],"study_design_scores_gemma":[0.00017516752,0.000042522403,0.000013726698,0.000061882376,0.000010145747,1.0743292e-7,0.00048335877,0.6366746,0.00003715496,0.36234927,0.000041337888,0.00011077867],"about_ca_topic_score_codex":0.000028802504,"about_ca_topic_score_gemma":9.679981e-7,"teacher_disagreement_score":0.8733845,"about_ca_system_score_codex":0.000040981384,"about_ca_system_score_gemma":0.000018854409,"threshold_uncertainty_score":0.6634283},"labels":[],"label_agreement":null},{"id":"W2029306691","doi":"10.1007/pl00005580","title":"Asymptotic Statistics of Zeroes for the Lamé Ensemble","year":2001,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":10,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Pointwise; Mathematics; Integrable system; Eigenfunction; Pure mathematics; Mathematical analysis; Physics; Quantum mechanics","score_opus":0.05807211280928413,"score_gpt":0.35356772868065844,"score_spread":0.2954956158713743,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2029306691","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0067854277,0.000082839375,0.9746479,0.00060658815,0.000029612143,0.00040127448,0.00013033481,0.0000112981825,0.01730472],"genre_scores_gemma":[0.90172297,0.000032634063,0.097657315,0.000023354876,0.00007708994,0.000069574315,0.000046907804,0.000014580374,0.00035555798],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9993952,0.000040057344,0.0002720567,0.000073832445,0.00007918453,0.00013965913],"domain_scores_gemma":[0.99703205,0.0017549448,0.00008545885,0.0010258497,0.00007760232,0.000024071502],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00016760691,0.00007982141,0.00016710012,0.000013760922,0.00012209207,0.000018915214,0.00053869793,0.00001758569,0.00004748078],"category_scores_gemma":[0.000040693216,0.00005873984,0.00006970513,0.00014284521,0.00018597422,0.00004107856,0.00014000341,0.00012419886,0.000020109359],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000002572514,0.0003697709,0.0007809904,0.000019734674,0.000026323705,3.483173e-8,0.00031137414,0.00012385935,0.00006348223,0.9854099,0.00027450177,0.012617463],"study_design_scores_gemma":[0.00020532623,0.000015746633,0.0002788106,0.000034066215,0.00003558378,2.416113e-7,0.0004771607,0.0766363,0.00018132002,0.9194362,0.002626809,0.00007243957],"about_ca_topic_score_codex":0.000015799335,"about_ca_topic_score_gemma":0.000005014507,"teacher_disagreement_score":0.8949376,"about_ca_system_score_codex":0.00000945281,"about_ca_system_score_gemma":0.000031046206,"threshold_uncertainty_score":0.23953411},"labels":[],"label_agreement":null},{"id":"W2029509656","doi":"10.1007/s00220-003-0892-7","title":"Energy Growth in Schrödinger's Equation with Markovian Forcing","year":2003,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Toronto Metropolitan University","funders":"","keywords":"Mathematics; Trigonometric polynomial; Torus; Kinetic energy; Mathematical physics; Schrödinger equation; Coupling constant; Mathematical analysis; Constant (computer programming); Norm (philosophy); Square root; Physics; Trigonometry; Quantum mechanics; Geometry","score_opus":0.03212063478394115,"score_gpt":0.27007514911339336,"score_spread":0.23795451432945222,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2029509656","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.054234356,0.00006984312,0.78421724,0.00025141603,0.000026662346,0.00029366734,0.0000056233885,0.000035535948,0.16086563],"genre_scores_gemma":[0.9876434,0.0000049974433,0.012069896,0.000020089972,0.000024948853,0.00012322587,0.000023988221,0.000020183714,0.00006927907],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99896824,0.0001621002,0.0003491182,0.00015997076,0.00013666457,0.00022392866],"domain_scores_gemma":[0.9987351,0.00035337245,0.00009741023,0.0007154441,0.000047239937,0.000051487703],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00026723242,0.000135053,0.00023523113,0.00005697486,0.000088955545,0.000044754885,0.00035402222,0.00003563727,0.00004702015],"category_scores_gemma":[0.00002512829,0.0001161755,0.00004647459,0.00045002523,0.00009491165,0.00016397302,0.00007864313,0.0002060579,0.000022167804],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000023731209,0.0003945335,0.009464137,0.000020012281,0.000008740887,2.4403184e-7,0.00021243359,0.00013148332,0.00003577282,0.98818386,0.000008424409,0.0015379721],"study_design_scores_gemma":[0.00042092556,0.000021090165,0.00024156932,0.00020505846,0.000007911966,5.3891074e-7,0.00037729376,0.12346514,0.00016293245,0.87478054,0.00014330259,0.00017372421],"about_ca_topic_score_codex":0.00016022829,"about_ca_topic_score_gemma":0.00003496598,"teacher_disagreement_score":0.93340904,"about_ca_system_score_codex":0.00005843248,"about_ca_system_score_gemma":0.000037625912,"threshold_uncertainty_score":0.47374994},"labels":[],"label_agreement":null},{"id":"W2033336691","doi":"10.1007/s00220-012-1451-x","title":"Entanglement can Increase Asymptotic Rates of Zero-Error Classical Communication over Classical Channels","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Wireless Communication Security Techniques","field":"Engineering","cited_by":32,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"","keywords":"Quantum entanglement; Communication source; Limit (mathematics); Channel (broadcasting); Decoding methods; Zero (linguistics); Quantum channel; Amplitude damping channel","score_opus":0.05755825214140101,"score_gpt":0.33312630322653997,"score_spread":0.27556805108513893,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2033336691","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7350363,0.008536279,0.17201367,0.00812188,0.00037783443,0.0044942405,0.00023806731,0.002712917,0.0684688],"genre_scores_gemma":[0.9502902,0.0005340001,0.04850578,0.000071739734,0.000029259745,0.00033938914,0.00013222164,0.000065619366,0.000031804895],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99775016,0.0004317315,0.0009087747,0.00014763526,0.00033880997,0.0004229128],"domain_scores_gemma":[0.99435776,0.0012087849,0.0001739076,0.003969024,0.00011421909,0.00017627013],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00072750996,0.00028629575,0.00051677733,0.00014357214,0.00012900465,0.000041543095,0.001983929,0.00017648777,0.00006614436],"category_scores_gemma":[0.00020096936,0.00030196356,0.00013556199,0.0005716088,0.0005578122,0.00037506325,0.00095285935,0.0007331059,0.000050444294],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010728769,0.0028373771,0.0030753885,0.0003300145,0.0001054353,2.987138e-7,0.0048146555,0.00056735973,0.0023045149,0.9783959,0.0029377497,0.0046206187],"study_design_scores_gemma":[0.0017123623,0.000101115045,0.0067398157,0.0013844507,0.00019788551,0.000012819567,0.0011573608,0.4938302,0.0201165,0.4621975,0.011085325,0.0014646349],"about_ca_topic_score_codex":0.00002037672,"about_ca_topic_score_gemma":0.000022195349,"teacher_disagreement_score":0.51619834,"about_ca_system_score_codex":0.00029549218,"about_ca_system_score_gemma":0.000034749883,"threshold_uncertainty_score":0.99994326},"labels":[],"label_agreement":null},{"id":"W2033675685","doi":"10.1007/s00220-014-2170-2","title":"Generalized Kähler Geometry of Instanton Moduli Spaces","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Homotopy and Cohomology in Algebraic Topology","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Instanton; Moduli space; Mathematics; Kähler manifold; Realization (probability); Pure mathematics; Moduli; Manifold (fluid mechanics); Space (punctuation); Modular equation; Mathematical analysis; Analogy; Geometry; Moduli of algebraic curves; Mathematical physics; Physics; Quantum mechanics; Computer science","score_opus":0.07444541994894101,"score_gpt":0.3603120603974365,"score_spread":0.2858666404484955,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2033675685","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7922843,0.00022628247,0.13462737,0.0021232825,0.000114678165,0.0005341817,0.00001107856,0.00015036255,0.06992842],"genre_scores_gemma":[0.86406016,0.000063952364,0.13541427,0.00010605964,0.000038551294,0.00006326392,0.000008970083,0.000026011267,0.00021874723],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99823457,0.00045506703,0.00065935816,0.0001956358,0.00019188426,0.00026350108],"domain_scores_gemma":[0.9949439,0.002254952,0.00024768966,0.0024016264,0.00009453407,0.00005730991],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0007949785,0.00018162988,0.00057320495,0.00010726492,0.000100100704,0.0000141213295,0.0011771312,0.00017724071,0.00014765811],"category_scores_gemma":[0.0011612021,0.00016680571,0.00011436509,0.00044627208,0.0007609833,0.00009414221,0.0004701154,0.00037713884,0.000068869915],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006669633,0.00068287627,0.00029601884,0.00012588447,0.000032840977,3.8541094e-7,0.000823665,0.000011694262,0.00039656373,0.994303,0.00019013375,0.0031302858],"study_design_scores_gemma":[0.00045647737,0.000046128524,0.0001315667,0.00008196757,0.000036267287,0.00000525679,0.00014940625,0.008198556,0.0012144785,0.98884076,0.0006787856,0.00016032688],"about_ca_topic_score_codex":0.000008793247,"about_ca_topic_score_gemma":0.000015445032,"teacher_disagreement_score":0.07177584,"about_ca_system_score_codex":0.00003859007,"about_ca_system_score_gemma":0.00003379313,"threshold_uncertainty_score":0.6802139},"labels":[],"label_agreement":null},{"id":"W2034077639","doi":"10.1007/s00220-005-1344-3","title":"The Volume of the Moduli Space of Flat Connections on a Nonorientable 2-Manifold","year":2005,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometric and Algebraic Topology","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Moduli space; Moduli of algebraic curves; Moduli; Volume form; Volume (thermodynamics); Space (punctuation); Mapping class group","score_opus":0.0579124815168717,"score_gpt":0.3288995454904001,"score_spread":0.27098706397352845,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2034077639","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5886468,0.0009900526,0.104625896,0.05031439,0.00045778023,0.0030527657,0.00008064394,0.00018061904,0.25165105],"genre_scores_gemma":[0.9798284,0.000056003348,0.01841148,0.000038528055,0.000029688545,0.00004880484,0.0000012299517,0.000015263038,0.0015705783],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988117,0.00016828443,0.00051748153,0.00010913358,0.00020922003,0.00018416633],"domain_scores_gemma":[0.99386543,0.0032832022,0.00027913312,0.0024358686,0.000108560766,0.000027833374],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004778808,0.00011326531,0.00027467648,0.000049926613,0.00024980036,0.000011201627,0.0012222833,0.00006274558,0.000044550405],"category_scores_gemma":[0.0012501634,0.000070695256,0.0001296735,0.0007548507,0.0005073164,0.000057313653,0.00042693818,0.00031023985,0.000045447418],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000003326114,0.0004954298,0.00017341693,0.000033948076,0.000022590475,2.3384917e-8,0.0006474662,0.000078830344,0.00009559128,0.9965229,0.00092416996,0.001002331],"study_design_scores_gemma":[0.00024078425,0.00003680033,0.00025794428,0.0000858456,0.000036604357,0.000002013379,0.000694883,0.010817051,0.0019856107,0.9821787,0.0035813504,0.000082418796],"about_ca_topic_score_codex":0.000012706058,"about_ca_topic_score_gemma":0.0000452236,"teacher_disagreement_score":0.39118162,"about_ca_system_score_codex":0.000055920907,"about_ca_system_score_gemma":0.000043006086,"threshold_uncertainty_score":0.2882869},"labels":[],"label_agreement":null},{"id":"W2035080381","doi":"10.1007/s002200100585","title":"Pauli Operator and Aharonov-Casher Theorem¶ for Measure Valued Magnetic Fields","year":2002,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":35,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Counterexample; Pauli exclusion principle; Scalar (mathematics); Mathematics; Operator (biology); Magnetic field; Vector potential; Measure (data warehouse); Pure mathematics; Scalar potential; Discrete mathematics; Mathematical physics; Mathematical analysis; Physics; Quantum mechanics; Computer science","score_opus":0.1395817648844977,"score_gpt":0.3547191239589832,"score_spread":0.2151373590744855,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2035080381","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.09525294,0.00313929,0.6786378,0.008919545,0.00028005484,0.008125739,0.00011890029,0.0010180561,0.20450765],"genre_scores_gemma":[0.75646746,0.000069327194,0.24191216,0.00027188184,0.00011568862,0.0005476575,0.000007217186,0.00010436481,0.0005042724],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99778086,0.00028544015,0.000766275,0.00037533403,0.0003236905,0.0004683856],"domain_scores_gemma":[0.99345213,0.0035719643,0.00015390359,0.0025197743,0.00015796044,0.00014428061],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00088483223,0.0003687568,0.0006528661,0.0000663413,0.0002554859,0.00011088838,0.0011979854,0.00019359996,0.00034301777],"category_scores_gemma":[0.0018066914,0.00032778355,0.00017575051,0.00039059954,0.00059695146,0.00022969602,0.0004107655,0.0005348151,0.00016234895],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009223433,0.0010015457,0.000015410138,0.00029890856,0.000034124852,7.47597e-7,0.001636687,0.000003778379,0.00018666481,0.9917273,0.00085995084,0.00422566],"study_design_scores_gemma":[0.00072754605,0.000097920165,0.000011725481,0.00025022472,0.00009308278,0.000007227153,0.0002369808,0.046576347,0.00023041734,0.95115876,0.0002454994,0.00036425766],"about_ca_topic_score_codex":0.0000014274463,"about_ca_topic_score_gemma":0.000005883077,"teacher_disagreement_score":0.6612145,"about_ca_system_score_codex":0.00008370058,"about_ca_system_score_gemma":0.000018585382,"threshold_uncertainty_score":0.99991745},"labels":[],"label_agreement":null},{"id":"W2037236081","doi":"10.1007/s00220-006-0090-5","title":"Moments of the Derivative of Characteristic Polynomials with an Application to the Riemann Zeta Function","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Analytic Number Theory Research","field":"Mathematics","cited_by":45,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"Engineering and Physical Sciences Research Council; Isaac Newton Institute for Mathematical Sciences","keywords":"Mathematics; Riemann zeta function; Unit circle; Riemann hypothesis; Derivative (finance); Conjecture; Riemann Xi function; Bessel function; Z function; Polynomial; Pure mathematics; Unitary matrix; Mathematical analysis; Orthogonal polynomials; Unitary state","score_opus":0.06458158312456633,"score_gpt":0.3626191002055115,"score_spread":0.29803751708094517,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2037236081","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.515167,0.000025741037,0.4704609,0.0019500054,0.000019750718,0.002224445,0.00004316003,0.000037242437,0.010071794],"genre_scores_gemma":[0.98607874,0.000002346191,0.013439516,0.00003387304,0.000028716428,0.00021087221,0.000013976872,0.000023469514,0.00016851394],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984134,0.00036385868,0.00054854236,0.00014746939,0.00036631763,0.00016042634],"domain_scores_gemma":[0.99537784,0.0011972606,0.00033987555,0.0028309026,0.00022194587,0.00003217506],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00082941324,0.00012669405,0.00029855352,0.000044604105,0.00013960595,0.00001694605,0.0013805326,0.000042810032,0.00001652165],"category_scores_gemma":[0.000300586,0.00007408315,0.000060511604,0.0007002194,0.00047103918,0.00010306622,0.0003908671,0.00021417427,0.000019969466],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000046532565,0.0010108624,0.0008069434,0.00010890226,0.00003852388,3.7872823e-8,0.0010328097,0.000076886296,0.0022102813,0.99376243,0.00010906058,0.00079674606],"study_design_scores_gemma":[0.00021077397,0.00006712188,0.0055852705,0.00013186737,0.00007021402,0.00000106452,0.00050178764,0.005771418,0.00168186,0.9857968,0.00008978193,0.00009204595],"about_ca_topic_score_codex":0.000039574148,"about_ca_topic_score_gemma":0.00006243312,"teacher_disagreement_score":0.47091174,"about_ca_system_score_codex":0.00006462181,"about_ca_system_score_gemma":0.000052108848,"threshold_uncertainty_score":0.30210236},"labels":[],"label_agreement":null},{"id":"W2037968751","doi":"10.1007/s00220-013-1672-7","title":"On the Boyd-Kadomstev System for a Three-Wave Coupling Problem and its Asymptotic Limit","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Bruyère","funders":"","keywords":"Limit (mathematics); Nonlinear system; Physics; Brillouin zone; Group velocity; Coupling (piping); Asymptotic analysis; Mathematical analysis; Relaxation (psychology); Complex system; Term (time); Singular point of a curve; Laser; Mathematics; Optics; Quantum mechanics","score_opus":0.15075997938063956,"score_gpt":0.3353482169437045,"score_spread":0.18458823756306492,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2037968751","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.028006474,0.0006457069,0.9154354,0.008813297,0.00009464043,0.01113882,0.00003616897,0.0005250134,0.03530453],"genre_scores_gemma":[0.8565977,0.000024825506,0.13935974,0.00012114654,0.000055345925,0.0034772235,0.00000761054,0.00011333011,0.00024307042],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99779147,0.000103253726,0.0008714527,0.0003671708,0.00035137648,0.0005153022],"domain_scores_gemma":[0.98421985,0.0127942,0.00032045704,0.0022593723,0.0002822832,0.00012383582],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0009155178,0.00037067677,0.00062393787,0.000076136406,0.0003921943,0.0001441287,0.00099511,0.00013804165,0.000027533677],"category_scores_gemma":[0.0013886904,0.0002709633,0.00015100444,0.00046854944,0.00032905786,0.0003307952,0.0005736345,0.0005966169,0.0002237981],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000050518875,0.0005552626,0.000001768337,0.001284289,0.00004317108,3.0380522e-7,0.00047962772,0.00015305477,0.0001570982,0.99597454,0.00040441088,0.0009413975],"study_design_scores_gemma":[0.00031816887,0.00004613904,0.0000017600371,0.0008121198,0.00004727072,0.0000046003524,0.00032833766,0.31096265,0.00015140622,0.68709797,0.000023080069,0.00020650217],"about_ca_topic_score_codex":0.0000020959428,"about_ca_topic_score_gemma":0.00000353242,"teacher_disagreement_score":0.8285912,"about_ca_system_score_codex":0.00016624277,"about_ca_system_score_gemma":0.000041034193,"threshold_uncertainty_score":0.99997425},"labels":[],"label_agreement":null},{"id":"W2038541254","doi":"10.1007/s00220-009-0730-7","title":"A Rigorous Treatment of Energy Extraction from a Rotating Black Hole","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Pulsars and Gravitational Waves Research","field":"Physics and Astronomy","cited_by":12,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Wave packet; Rotating black hole; Penrose process; Infinitesimal; Angular momentum; Black hole (networking); Scalar (mathematics); Cauchy problem; Representation (politics)","score_opus":0.04967186609537545,"score_gpt":0.3969100728961405,"score_spread":0.34723820680076506,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2038541254","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.78533804,0.0004643243,0.1067156,0.0018868083,0.00003613436,0.0007188025,0.0005067265,0.000033784385,0.10429977],"genre_scores_gemma":[0.97341067,0.00002099573,0.025806526,0.000013346779,0.000051732528,0.000032757493,0.0002667566,0.00000734794,0.00038988312],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99927133,0.000076485165,0.00027721838,0.000112090696,0.0001360023,0.00012686427],"domain_scores_gemma":[0.99864197,0.000469593,0.00009677643,0.0006943727,0.000059800663,0.000037494905],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00005729642,0.00009334753,0.00019200546,0.000034407036,0.000066576766,0.000019620316,0.0002812252,0.000022855349,0.00006066403],"category_scores_gemma":[0.000011280727,0.00008511993,0.00008077826,0.00019587972,0.000104084145,0.00009589928,0.000040933603,0.000083389976,0.000026417787],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009996533,0.0029183899,0.00035706212,0.0000051076863,0.00003804716,4.0317138e-7,0.001206473,0.00057601713,0.005691171,0.8822237,0.00003685125,0.10693677],"study_design_scores_gemma":[0.00031970875,0.000070873764,0.0016779483,0.000038108235,0.000012244937,6.0332155e-8,0.00023201767,0.05412116,0.0015779587,0.9416178,0.00025422574,0.000077907076],"about_ca_topic_score_codex":0.0000683508,"about_ca_topic_score_gemma":0.0000023718178,"teacher_disagreement_score":0.1880726,"about_ca_system_score_codex":0.000034881683,"about_ca_system_score_gemma":0.000030757677,"threshold_uncertainty_score":0.347109},"labels":[],"label_agreement":null},{"id":"W2038885410","doi":"10.1007/s00220-006-0125-y","title":"Multidimensional Continued Fractions, Dynamical Renormalization and KAM Theory","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":54,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Complex system; Renormalization; Dynamical systems theory; Statistical physics; Physics; Mathematics; Mathematical physics; Theoretical physics; Quantum mechanics; Computer science; Artificial intelligence","score_opus":0.013561700910678418,"score_gpt":0.2771760024662058,"score_spread":0.26361430155552734,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2038885410","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.24274078,0.00022867096,0.7074283,0.0004613599,0.000061731036,0.0005103493,0.00004268781,0.00008736897,0.04843876],"genre_scores_gemma":[0.98932105,0.0000049836817,0.010053514,0.000019572173,0.00008308865,0.00006172034,0.00016092965,0.000016107726,0.00027905317],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990034,0.00017130436,0.00038021174,0.00015651358,0.00012473219,0.00016384355],"domain_scores_gemma":[0.99853635,0.0006261755,0.00010465497,0.0006326752,0.000055866,0.000044288183],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002625913,0.00012601994,0.00021213794,0.00003279119,0.00016913793,0.000038183374,0.00020959682,0.00004729076,0.00008268537],"category_scores_gemma":[0.000023714354,0.00011462284,0.000054869663,0.00017181016,0.00021230661,0.00013821316,0.00017351538,0.00021760682,0.000056090284],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000038157036,0.0004584533,0.0047860174,0.000012808678,0.000009604279,1.3193664e-7,0.00007154988,0.00009917064,0.00022338668,0.99256474,0.00007954327,0.0016907605],"study_design_scores_gemma":[0.0003072348,0.000006742884,0.0033883073,0.000054262535,0.000014315502,7.58253e-7,0.00013823215,0.23205484,0.00003170353,0.7633602,0.000519355,0.00012406144],"about_ca_topic_score_codex":0.000092916875,"about_ca_topic_score_gemma":0.000008189695,"teacher_disagreement_score":0.74658024,"about_ca_system_score_codex":0.00002740228,"about_ca_system_score_gemma":0.000016223197,"threshold_uncertainty_score":0.46741837},"labels":[],"label_agreement":null},{"id":"W2040137336","doi":"10.1007/s00220-009-0826-0","title":"Green’s Function for the Hodge Laplacian on Some Classes of Riemannian and Lorentzian Symmetric Spaces","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"advanced mathematical theories","field":"Mathematics","cited_by":2,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Natural Sciences and Engineering Research Council of Canada; Ministerio de Ciencia e Innovación; McGill University","keywords":"Mathematics; Riemannian manifold; Mathematical analysis; Constant curvature; Sectional curvature; Constant (computer programming); Pure mathematics; Laplace operator; Manifold (fluid mechanics); Generalization; Ricci curvature; Curvature; Function (biology); Riemannian geometry; Ricci-flat manifold; Scalar curvature; Geometry","score_opus":0.10504193973158737,"score_gpt":0.38046710033891473,"score_spread":0.27542516060732736,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2040137336","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.051967625,0.0022336303,0.89275014,0.018936303,0.0001894059,0.005255752,0.00010460008,0.00041789855,0.028144669],"genre_scores_gemma":[0.89202154,0.00017979107,0.10708366,0.00024245122,0.00006357859,0.00018756394,0.000007559291,0.000038586688,0.00017529295],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99854493,0.00012296381,0.00059030956,0.00021252892,0.00026442844,0.00026486345],"domain_scores_gemma":[0.9886098,0.009153063,0.00027753226,0.001780509,0.000115548355,0.00006356081],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006778422,0.00023499885,0.00048924825,0.00011971273,0.00023731995,0.000044219505,0.0007543371,0.00009472303,0.000008121808],"category_scores_gemma":[0.0019455061,0.00016740778,0.00012118665,0.00051231845,0.00053395063,0.00023074145,0.00017669794,0.00030768447,0.000012136376],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000036152425,0.0006815294,0.000012211192,0.0002650084,0.000031475633,1.3661456e-7,0.00071656576,0.000011134219,0.000063324274,0.9847148,0.00012028411,0.0133473985],"study_design_scores_gemma":[0.0004085076,0.0002244594,0.00019012253,0.00024474607,0.00009886296,0.000001624386,0.0007010957,0.0057352837,0.0003127809,0.9915376,0.00037531674,0.00016963713],"about_ca_topic_score_codex":0.000001588198,"about_ca_topic_score_gemma":0.0000059458944,"teacher_disagreement_score":0.8400539,"about_ca_system_score_codex":0.000054580993,"about_ca_system_score_gemma":0.000022583956,"threshold_uncertainty_score":0.6826691},"labels":[],"label_agreement":null},{"id":"W2040177667","doi":"10.1007/s00220-003-0886-5","title":"Green's Function for a Hierarchical Self-Avoiding Walk in Four Dimensions","year":2003,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":24,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Markov chain; Complex plane; Lattice (music); Function (biology); Markov process; Constant (computer programming); Simple (philosophy); Random walk","score_opus":0.10877003861435242,"score_gpt":0.35747620066816366,"score_spread":0.24870616205381124,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2040177667","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0032492192,0.000059995422,0.9903697,0.00056879973,0.00006002789,0.00081637717,0.000015155189,0.000104218016,0.004756507],"genre_scores_gemma":[0.58235306,0.00002308492,0.41702047,0.00009386771,0.000021700886,0.00038834877,0.0000063316556,0.00003654051,0.000056600165],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99819845,0.00025811855,0.0006533363,0.00027284285,0.00022764178,0.0003895901],"domain_scores_gemma":[0.990236,0.008225073,0.00011889576,0.0011986156,0.000120832716,0.0001005761],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0010053662,0.00021059594,0.000425814,0.00010036945,0.00023483395,0.000033721597,0.0005194325,0.00012916028,0.000021886073],"category_scores_gemma":[0.005206674,0.0002002302,0.000101203965,0.0005522544,0.00009473666,0.00011225148,0.00018087908,0.00058752176,0.000031680327],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000129954,0.00078785454,0.00001557774,0.0002470307,0.0000174723,0.0000010864452,0.0005275617,0.000010616561,0.000066538356,0.99660933,0.00009191463,0.0016120262],"study_design_scores_gemma":[0.00062122726,0.00006908213,0.000016113025,0.00017723501,0.000052903575,0.0000057291286,0.00021798431,0.1010507,0.000040471677,0.897101,0.00045167084,0.00019591946],"about_ca_topic_score_codex":0.0000030689923,"about_ca_topic_score_gemma":0.000023917968,"teacher_disagreement_score":0.5791038,"about_ca_system_score_codex":0.00013061878,"about_ca_system_score_gemma":0.00008614526,"threshold_uncertainty_score":0.8165151},"labels":[],"label_agreement":null},{"id":"W2040900678","doi":"10.1007/s00220-006-1546-3","title":"On Computational Complexity of Siegel Julia Sets","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":10,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Julia set; Quadratic equation; Polynomial; Class (philosophy); Complex quadratic polynomial; Computational complexity theory; Algebra over a field; Structural complexity theory","score_opus":0.14405306342303273,"score_gpt":0.38574885269176523,"score_spread":0.2416957892687325,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2040900678","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.16234842,0.000065570144,0.57640004,0.0020801877,0.00005588789,0.0012225102,0.00017398548,0.0002006046,0.25745282],"genre_scores_gemma":[0.7449883,0.0000031845077,0.25471368,0.000053637472,0.000014107914,0.000038832583,0.000053587457,0.000026846848,0.00010776559],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9980983,0.00015312851,0.0009092052,0.00019599184,0.00040611555,0.00023726982],"domain_scores_gemma":[0.9940483,0.0038761403,0.00029669626,0.0015797551,0.00014551281,0.000053569656],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005067941,0.00020739203,0.00052596506,0.000083484134,0.000104628845,0.000026654814,0.0008505443,0.00009328364,0.0002021328],"category_scores_gemma":[0.0005262259,0.00019032914,0.00014891879,0.00037460955,0.00068826065,0.00008418124,0.00028870147,0.00032832933,0.00016948977],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006341744,0.002403959,0.00005200574,0.00022744112,0.000014721894,6.7259e-7,0.00014345438,0.00049066736,0.00003694557,0.9953011,0.0009545705,0.0003680993],"study_design_scores_gemma":[0.0002944876,0.00002594668,0.00038144927,0.00017346957,0.000017143817,0.0000019267538,0.000027875332,0.1964594,0.000043792457,0.80240077,0.000029562007,0.00014418835],"about_ca_topic_score_codex":0.000007723353,"about_ca_topic_score_gemma":0.000012990464,"teacher_disagreement_score":0.58263993,"about_ca_system_score_codex":0.00006774333,"about_ca_system_score_gemma":0.00003504627,"threshold_uncertainty_score":0.77613974},"labels":[],"label_agreement":null},{"id":"W2041386890","doi":"10.1007/s00220-005-1321-x","title":"“Real Doubles” of Hurwitz Frobenius Manifolds","year":2005,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":24,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University","funders":"","keywords":"Pure mathematics; Mathematics; Space (punctuation); Hurwitz polynomial; Simple (philosophy); Manifold (fluid mechanics); Algebra over a field; Mathematical analysis; Computer science","score_opus":0.03945776925159857,"score_gpt":0.3359089229066418,"score_spread":0.29645115365504326,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2041386890","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.2550102,0.00010709785,0.044080056,0.001341841,0.000046133995,0.00051212666,0.00010114857,0.00006702008,0.6987344],"genre_scores_gemma":[0.93025684,0.000018430952,0.069193624,0.000014927919,0.00014029026,0.000022186905,0.000040829622,0.00001615484,0.0002967341],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99918664,0.00004871141,0.0003763226,0.000107683845,0.00011326609,0.00016738211],"domain_scores_gemma":[0.99832195,0.00021102739,0.00009993801,0.0012678722,0.000051761388,0.000047451504],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0001356612,0.00010943763,0.00023625081,0.000029412968,0.00006857379,0.00001807169,0.00063925114,0.000032706244,0.00021781342],"category_scores_gemma":[0.000005723119,0.000103868035,0.00010294166,0.0001837842,0.00014898245,0.000106938875,0.00026461712,0.00019878834,0.0001276383],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000021440726,0.0008227829,0.0012757439,0.000016418251,0.000020411897,5.889485e-8,0.00049541704,0.00011496156,0.00026788618,0.9878163,0.000115907744,0.009051975],"study_design_scores_gemma":[0.0007087997,0.000022390988,0.0010750815,0.000106938365,0.000041525735,5.067742e-7,0.0006448487,0.046709422,0.002104565,0.94484216,0.0034826407,0.0002611185],"about_ca_topic_score_codex":0.000051255363,"about_ca_topic_score_gemma":0.000008447821,"teacher_disagreement_score":0.6984377,"about_ca_system_score_codex":0.0000223798,"about_ca_system_score_gemma":0.000035817047,"threshold_uncertainty_score":0.42356154},"labels":[],"label_agreement":null},{"id":"W2041972128","doi":"10.1007/s00220-012-1549-1","title":"A Renormalizable 4-Dimensional Tensor Field Theory","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":194,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Propagator; Mathematical physics; Renormalization; Physics; Gauge theory; Quantum field theory; Renormalization group; Tensor field; Mathematics; Theoretical physics; Quantum mechanics; Exact solutions in general relativity","score_opus":0.028358175194727043,"score_gpt":0.3031011777630676,"score_spread":0.27474300256834056,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2041972128","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.059235036,0.0003834066,0.32220194,0.0011698697,0.00013869195,0.00055742543,0.000033683213,0.00011692564,0.616163],"genre_scores_gemma":[0.98697054,0.0000033744564,0.012178633,0.0002178568,0.00018649745,0.00006112248,0.000031359938,0.000023873054,0.00032672324],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99890876,0.00015552233,0.00030060543,0.00012169266,0.00014694687,0.00036645404],"domain_scores_gemma":[0.9974716,0.0010183653,0.000069790774,0.0012772196,0.000050333285,0.00011272617],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00041420534,0.00015381956,0.00023078568,0.000024850553,0.00014512337,0.000027422544,0.000572774,0.000045367095,0.0006869893],"category_scores_gemma":[0.000041627274,0.00013508696,0.00010933824,0.00024619146,0.00022191978,0.00022881918,0.00041937473,0.00036252147,0.0005077642],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000061333567,0.00093170314,0.002184117,0.000012864029,0.000022068105,6.140449e-8,0.00033505805,0.00001520063,0.000028524748,0.99106455,0.00038915445,0.005010546],"study_design_scores_gemma":[0.00019513658,0.000013204426,0.0002493249,0.000047315465,0.000025020456,5.3075576e-7,0.00017345021,0.0020276043,0.0005191526,0.99586475,0.00071733113,0.00016717236],"about_ca_topic_score_codex":0.000007902288,"about_ca_topic_score_gemma":1.5277722e-7,"teacher_disagreement_score":0.9277355,"about_ca_system_score_codex":0.000019971061,"about_ca_system_score_gemma":0.000021365438,"threshold_uncertainty_score":0.7522051},"labels":[],"label_agreement":null},{"id":"W2042009790","doi":"10.1007/s00220-009-0871-8","title":"Colliding Solitons for the Nonlinear Schrödinger Equation","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":19,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Nonlinear system; Collision; Dynamics (music); Radiation damping; Soliton; Order (exchange); Initial value problem","score_opus":0.24545719287940804,"score_gpt":0.43332781465025433,"score_spread":0.1878706217708463,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2042009790","genre_codex":"methods","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":"methods","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0011172619,0.00014205788,0.9818967,0.004628006,0.00004805994,0.0017838873,0.0000150202295,0.00018126713,0.01018774],"genre_scores_gemma":[0.3410665,0.000056976955,0.6577199,0.00026446505,0.00014362091,0.00048621968,0.000018144312,0.000054364533,0.0001897951],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99806464,0.00010570248,0.0007957254,0.0002720756,0.0003264886,0.0004353545],"domain_scores_gemma":[0.98753566,0.009368314,0.00026875164,0.0025423958,0.0002095998,0.00007529674],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.001027246,0.00026689397,0.00045374897,0.00005759737,0.00047543613,0.00008776822,0.0014683602,0.00010319832,0.000017242333],"category_scores_gemma":[0.0024183083,0.00020447174,0.00019888597,0.00057449564,0.00027667187,0.0003044108,0.0002557834,0.00046426262,0.00006415955],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000076513825,0.00095613353,0.0000022158174,0.00009732401,0.000021136657,1.501782e-7,0.0006794263,0.0002014807,0.0005648316,0.99069166,0.0004254835,0.0063525154],"study_design_scores_gemma":[0.0003539581,0.000046257723,0.0000054755437,0.00015579996,0.000059329388,0.000001498043,0.00019166952,0.18720953,0.00061775197,0.8106646,0.0004992041,0.00019495974],"about_ca_topic_score_codex":9.206236e-7,"about_ca_topic_score_gemma":0.0000022532065,"teacher_disagreement_score":0.33994925,"about_ca_system_score_codex":0.00014433704,"about_ca_system_score_gemma":0.000058602287,"threshold_uncertainty_score":0.8338116},"labels":[],"label_agreement":null},{"id":"W2042743954","doi":"10.1007/s00220-012-1473-4","title":"The W N Minimal Model Classification","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":8,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta; MacEwan University","funders":"","keywords":"Minimal models; Modular design; Unitary state; Invariant (physics); Minimal model; Modular form; Conformal map; Modular curve; Modular invariance","score_opus":0.1861510168033602,"score_gpt":0.389026011847757,"score_spread":0.2028749950443968,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2042743954","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.3009948,0.0023731967,0.43444926,0.008189681,0.00088632846,0.00267327,0.000015327818,0.0005966737,0.24982144],"genre_scores_gemma":[0.95860636,0.000070614056,0.040800717,0.0000468831,0.00009976501,0.00015502283,0.0000036813374,0.000026175374,0.00019076506],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99875826,0.00013386378,0.00043005947,0.000109784196,0.00023891455,0.00032912105],"domain_scores_gemma":[0.99582183,0.0018064516,0.0001375179,0.00209309,0.000066747314,0.00007436626],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00063769997,0.0001412551,0.00019059086,0.000020980002,0.00035643525,0.000050566247,0.0011058958,0.00008272534,0.000008843198],"category_scores_gemma":[0.0005268645,0.0001003172,0.0000839716,0.00022841425,0.00026807262,0.00019611396,0.00035553475,0.0003261876,0.000042219577],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000037379386,0.00026362608,0.00009428536,0.00001594028,0.000009832249,1.7091319e-8,0.000828522,0.000011951534,0.000034286062,0.996169,0.00042176573,0.0021470794],"study_design_scores_gemma":[0.00013122779,0.0000050732515,0.00013198979,0.000020477475,0.000018342143,0.0000010787306,0.00028802417,0.09339451,0.000040218485,0.9054567,0.00040295528,0.00010935914],"about_ca_topic_score_codex":9.686406e-7,"about_ca_topic_score_gemma":0.0000018552,"teacher_disagreement_score":0.65761155,"about_ca_system_score_codex":0.00008389826,"about_ca_system_score_gemma":0.000036162393,"threshold_uncertainty_score":0.40908167},"labels":[],"label_agreement":null},{"id":"W2043793762","doi":"10.1007/s00220-015-2329-5","title":"Hypergeometric $${\\tau}$$ τ -Functions, Hurwitz Numbers and Enumeration of Paths","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Combinatorial Mathematics","field":"Mathematics","cited_by":61,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University; Université de Montréal","funders":"","keywords":"Mathematics; Combinatorics; Conjugacy class; Enumeration; Hypergeometric distribution; Cayley graph; Power series; Ramification; Symmetric group; Discrete mathematics; Graph; Pure mathematics; Mathematical analysis","score_opus":0.1408035381987969,"score_gpt":0.37528655527587684,"score_spread":0.23448301707707994,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2043793762","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.31549695,0.0015995887,0.6140453,0.0010581879,0.0005101515,0.0022616268,0.000044793345,0.00043931964,0.06454403],"genre_scores_gemma":[0.79121673,0.000076349854,0.20831515,0.00002330013,0.00003995114,0.0001035567,0.000013409417,0.000043732984,0.00016783676],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998157,0.00019687042,0.0008131337,0.00021070502,0.00039595828,0.00022630543],"domain_scores_gemma":[0.9952382,0.0021572404,0.00032713104,0.0018475686,0.00029918554,0.00013070059],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0008511698,0.00021357652,0.0005184736,0.00017492962,0.00009680003,0.0000308027,0.000623107,0.000116514224,0.0000133212],"category_scores_gemma":[0.0038975535,0.00020955136,0.00007295711,0.0011036308,0.00031954257,0.000295339,0.00045240097,0.00033098483,0.00004741581],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008056195,0.00090647844,0.00031369258,0.00020126259,0.000024701305,5.247456e-7,0.0017613632,0.000027887767,0.0001242327,0.9928884,0.00062442163,0.0031190165],"study_design_scores_gemma":[0.00064618496,0.000060014543,0.00003778867,0.00013617572,0.000052646,0.0000074337927,0.0011700472,0.0047453893,0.000295915,0.9922735,0.00037774496,0.00019717708],"about_ca_topic_score_codex":0.000008373764,"about_ca_topic_score_gemma":0.0000066863004,"teacher_disagreement_score":0.47571975,"about_ca_system_score_codex":0.0001286813,"about_ca_system_score_gemma":0.000081110775,"threshold_uncertainty_score":0.8545257},"labels":[],"label_agreement":null},{"id":"W2043804568","doi":"10.1007/s00220-004-1150-3","title":"Bihamiltonian Structures and Quadratic Algebras in Hydrodynamics and on Non-Commutative Torus","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":29,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Integrable system; Torus; Quadratic equation; Poisson algebra; Poisson bracket; Poisson manifold; Poisson distribution; Phase space","score_opus":0.019589606493775558,"score_gpt":0.3131056793669396,"score_spread":0.29351607287316406,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2043804568","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.98001546,0.000064347245,0.007211059,0.00067140075,0.000014167477,0.0003102906,0.000026705215,0.000012951795,0.011673593],"genre_scores_gemma":[0.97829413,0.000022167613,0.021522999,0.000048442238,0.000026145053,0.000028369277,0.000025554182,0.000016208349,0.000015973388],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9992767,0.00006164682,0.00025730635,0.00015374653,0.00008121423,0.00016941018],"domain_scores_gemma":[0.9988312,0.0003298431,0.000058768015,0.0007066693,0.000017157976,0.00005632551],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00011121304,0.0001455986,0.00024093351,0.000052451658,0.000113939284,0.000048316506,0.00027411265,0.000037166858,0.000007892562],"category_scores_gemma":[0.000018041532,0.00013363648,0.000031021485,0.00018396022,0.0002739873,0.000093005256,0.0002170679,0.00034589058,0.000010028946],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000031190134,0.00036341263,0.0016702993,0.000023281966,0.000014091302,5.693397e-7,0.0032214026,0.0005636825,0.00005127421,0.99094933,0.0000019803922,0.003137553],"study_design_scores_gemma":[0.00053401705,0.000032697364,0.0065524527,0.00011544657,0.000009578221,6.8381814e-7,0.0011120001,0.03062392,0.000075587326,0.96078104,0.000016764163,0.00014581882],"about_ca_topic_score_codex":0.00009529756,"about_ca_topic_score_gemma":0.00004857755,"teacher_disagreement_score":0.0301683,"about_ca_system_score_codex":0.00004009666,"about_ca_system_score_gemma":0.000034819295,"threshold_uncertainty_score":0.54495376},"labels":[],"label_agreement":null},{"id":"W2044378288","doi":"10.1007/s00220-013-1770-6","title":"Properties and Construction of Extreme Bipartite States Having Positive Partial Transpose","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":17,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"","keywords":"Transpose; Bipartite graph; Extreme point; Separable space; Product (mathematics); Separable state; Set (abstract data type); Simple (philosophy)","score_opus":0.06626186505051769,"score_gpt":0.2579173851589574,"score_spread":0.19165552010843973,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2044378288","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.27235088,0.00017680526,0.7232401,0.0015027791,0.000021022483,0.00036685498,0.0000029198006,0.00006777093,0.0022708913],"genre_scores_gemma":[0.887262,0.000093474686,0.11251561,0.000062049316,0.000003499798,0.000053340118,0.0000036017318,0.000003328668,0.0000031119193],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99928457,0.00006781448,0.0003437247,0.000084415726,0.000110877496,0.000108596425],"domain_scores_gemma":[0.9989697,0.00013484755,0.00009543504,0.0006577356,0.000104510684,0.000037771995],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00013150339,0.00007605616,0.00014144336,0.000059867623,0.00008553577,0.000075537064,0.00048319076,0.000026955182,0.000009722274],"category_scores_gemma":[0.000018841756,0.00006473051,0.000034162014,0.00029057407,0.00038711162,0.0007759697,0.00015374021,0.00010544899,0.000018326296],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000016130265,0.00013249251,0.00026059605,0.0000467183,0.000008701915,4.3704485e-8,0.005774954,0.00002294436,0.0009595677,0.9740325,0.0000114757595,0.018748388],"study_design_scores_gemma":[0.0002191158,0.000025253908,0.0013205572,0.00013557394,0.000006457694,0.0000028557301,0.00066949596,0.44740024,0.0045906566,0.5454903,0.000032422624,0.000107065986],"about_ca_topic_score_codex":0.00001704532,"about_ca_topic_score_gemma":0.0000017228103,"teacher_disagreement_score":0.6149111,"about_ca_system_score_codex":0.000008997433,"about_ca_system_score_gemma":0.000015777327,"threshold_uncertainty_score":0.26396337},"labels":[],"label_agreement":null},{"id":"W2044536506","doi":"10.1007/s00220-002-0731-2","title":"Jack Superpolynomials, Superpartition Ordering and Determinantal Formulas","year":2003,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":13,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University; Université Laval","funders":"","keywords":"Eigenfunction; Monomial; Hamiltonian (control theory); Trigonometry; Simple (philosophy); Basis (linear algebra); Monomial basis; Expression (computer science)","score_opus":0.08389318449086951,"score_gpt":0.3446140614229264,"score_spread":0.26072087693205687,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2044536506","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9741433,0.00019880629,0.0134816645,0.00014020377,0.00008751823,0.00040025244,0.0000029865253,0.00007182645,0.011473407],"genre_scores_gemma":[0.96406215,0.00007690603,0.035667177,0.000029252165,0.000026174486,0.00006753817,0.0000032875419,0.000027409984,0.00004009005],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99894994,0.00012291603,0.00038689756,0.00017199606,0.00013991955,0.00022834973],"domain_scores_gemma":[0.99802613,0.000726356,0.00006643733,0.0010753203,0.000041133906,0.00006463382],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00027907753,0.00016250364,0.0002890936,0.000037637456,0.00017619715,0.00005164972,0.00035900745,0.00008834963,0.000039128074],"category_scores_gemma":[0.00047331423,0.00015249594,0.00005825915,0.0001749793,0.0001846438,0.00019414464,0.00021141987,0.00023262975,0.000015605212],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000026007817,0.00016353493,0.00022856945,0.00006117688,0.0000082221795,4.5579182e-7,0.0006523954,0.0000021458548,0.00013678827,0.9978892,0.000030098803,0.00082479644],"study_design_scores_gemma":[0.00037811275,0.00002145222,0.00007890732,0.00007618991,0.000020886735,0.000012488396,0.0002509575,0.0035873926,0.0008561352,0.99430054,0.00024436146,0.00017258912],"about_ca_topic_score_codex":0.000004727767,"about_ca_topic_score_gemma":0.000011383289,"teacher_disagreement_score":0.022185512,"about_ca_system_score_codex":0.000053788473,"about_ca_system_score_gemma":0.000030299545,"threshold_uncertainty_score":0.6218604},"labels":[],"label_agreement":null},{"id":"W2044917318","doi":"10.1007/s00220-015-2310-3","title":"On a Categorical Boson–Fermion Correspondence","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":19,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"John Templeton Foundation; National Science Foundation","keywords":"Categorical variable; Fermion; Boson; Affine transformation; Quantum; Physics; Pure mathematics; Theoretical physics; Mathematics; Algebra over a field; Quantum mechanics; Statistics","score_opus":0.20336475167103948,"score_gpt":0.39911528653016726,"score_spread":0.19575053485912777,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2044917318","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6446783,0.00039213477,0.20142724,0.004162418,0.0010695307,0.0020028593,0.000010062953,0.0006933496,0.14556408],"genre_scores_gemma":[0.9862208,0.000010936035,0.013220729,0.00011585548,0.000067154026,0.00009047839,0.00000550837,0.00003172614,0.00023685221],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99845713,0.0002221086,0.000432628,0.00021699096,0.00041683446,0.0002543069],"domain_scores_gemma":[0.99557614,0.0018967434,0.00011891683,0.0021395849,0.000121874655,0.00014670742],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004775785,0.00019255611,0.0003406477,0.000058927442,0.000100010206,0.000044920394,0.0011583935,0.00011715062,0.00003634425],"category_scores_gemma":[0.0017133248,0.00016670574,0.00008306203,0.00041970174,0.0001923926,0.000120704804,0.0004196019,0.00047324787,0.00022941819],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000025032716,0.0005197627,0.000025207575,0.000020141548,0.0000075947773,0.0000018643484,0.00087610254,0.000034672612,0.000006634055,0.9962726,0.0015289489,0.00068143604],"study_design_scores_gemma":[0.0004821011,0.0000728644,0.00001516326,0.00006264921,0.000015613996,0.0000056629774,0.00019326771,0.00971491,0.000072578645,0.9889684,0.00021590819,0.00018088477],"about_ca_topic_score_codex":0.000006469425,"about_ca_topic_score_gemma":0.0000023572327,"teacher_disagreement_score":0.34154242,"about_ca_system_score_codex":0.00018931273,"about_ca_system_score_gemma":0.00009812772,"threshold_uncertainty_score":0.67980623},"labels":[],"label_agreement":null},{"id":"W2048258323","doi":"10.1007/s00220-014-2186-7","title":"The Minimum Size of Unextendible Product Bases in the Bipartite Case (and Some Multipartite Cases)","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Holomorphic and Operator Theory","field":"Mathematics","cited_by":59,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Guelph; University of Waterloo","funders":"","keywords":"Multipartite; Bipartite graph; Basis (linear algebra); Product (mathematics); Hilbert space; Coupling (piping)","score_opus":0.09471643811410839,"score_gpt":0.3641509937841432,"score_spread":0.26943455567003477,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2048258323","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.988256,0.0008637206,0.0014581436,0.003020107,0.000046857538,0.0010757612,0.000017731109,0.00003814131,0.005223578],"genre_scores_gemma":[0.99022776,0.00014502039,0.009181649,0.00014497121,0.000028822664,0.00016046604,0.0000018631664,0.000021060672,0.00008837908],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.997834,0.0010087842,0.0005791934,0.00016454981,0.00017758767,0.00023586742],"domain_scores_gemma":[0.98081577,0.016591704,0.00015061595,0.0023375622,0.000064450694,0.0000398916],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0026675614,0.00015505224,0.00030620466,0.00003058936,0.00027535023,0.000047818885,0.0007509941,0.000045848305,0.000009477102],"category_scores_gemma":[0.0051594945,0.0000928331,0.00006033746,0.00033645297,0.000785167,0.0001039184,0.00024620185,0.00032930155,0.000016197066],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008078885,0.00057266565,0.00019638913,0.0001244546,0.000011463519,0.000011361563,0.0025418438,0.000008905632,0.00013567861,0.99466753,0.00017980032,0.0015418244],"study_design_scores_gemma":[0.00039186748,0.00003837066,0.00009023197,0.00013508255,0.00004051889,0.00016038246,0.0020165127,0.0082565695,0.00052100956,0.9869402,0.0012639117,0.00014531374],"about_ca_topic_score_codex":0.000020017334,"about_ca_topic_score_gemma":0.00014261183,"teacher_disagreement_score":0.017018242,"about_ca_system_score_codex":0.000019705501,"about_ca_system_score_gemma":0.000029665423,"threshold_uncertainty_score":0.617677},"labels":[],"label_agreement":null},{"id":"W2049127761","doi":"10.1007/s00220-009-0942-x","title":"Diffraction of Stochastic Point Sets: Explicitly Computable Examples","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quasicrystal Structures and Properties","field":"Materials Science","cited_by":31,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Victoria","funders":"","keywords":"Aperiodic graph; Diffraction; Duality (order theory); Poisson summation formula; Autocorrelation; Lattice (music); Point process","score_opus":0.06142943622330905,"score_gpt":0.31311190525916627,"score_spread":0.2516824690358572,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2049127761","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7239899,0.00056433695,0.26637903,0.0014413388,0.00006915271,0.0004990359,0.000025100302,0.000113140886,0.0069189933],"genre_scores_gemma":[0.96937585,0.000014988815,0.030458122,0.000089115005,0.000019850686,0.000012791697,0.00000795956,0.000007347749,0.00001395499],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991571,0.00008783398,0.00034082594,0.00011399153,0.00014682279,0.00015344517],"domain_scores_gemma":[0.9985615,0.0003040775,0.000117864125,0.00093046407,0.000053755382,0.000032352524],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00022418462,0.00009787278,0.00022882281,0.000026673662,0.00009496147,0.000034172972,0.0005583755,0.000038197883,0.00009130172],"category_scores_gemma":[0.00008542871,0.00007992161,0.000042110438,0.00015426276,0.00016576951,0.00017567757,0.00015422239,0.00012798488,0.00004256241],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00003493136,0.00081800466,0.000013830867,0.00013920222,0.000008388628,3.8403982e-7,0.0037429596,0.0055580414,0.34703264,0.614749,0.00024647004,0.02765613],"study_design_scores_gemma":[0.00017851486,0.0000711808,0.00037952416,0.00014926856,0.000011134653,0.0000033164076,0.000347155,0.029427372,0.008602366,0.96058375,0.000116034884,0.00013040907],"about_ca_topic_score_codex":0.000023019904,"about_ca_topic_score_gemma":0.0000031881634,"teacher_disagreement_score":0.3458347,"about_ca_system_score_codex":0.000035883,"about_ca_system_score_gemma":0.000016862645,"threshold_uncertainty_score":0.32591084},"labels":[],"label_agreement":null},{"id":"W2050427623","doi":"10.1007/s00220-013-1787-x","title":"Non-homogeneous Systems of Hydrodynamic Type Possessing Lax Representations","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":6,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Brock University","funders":"","keywords":"Complex system; Type (biology); Class (philosophy); Lax pair; Algebra over a field; Dynamical systems theory","score_opus":0.03156708238458302,"score_gpt":0.3343623016931119,"score_spread":0.3027952193085289,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2050427623","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8534947,0.0001414112,0.040483408,0.00026183267,0.00010550697,0.0008132673,0.000037918417,0.00003866416,0.10462329],"genre_scores_gemma":[0.9872249,0.0000072835337,0.012244015,0.000006728554,0.000060059152,0.00005539221,0.00006407422,0.000018053242,0.00031949327],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9991803,0.0000595075,0.0003866217,0.00011634746,0.000104130064,0.00015306108],"domain_scores_gemma":[0.9980874,0.00027264367,0.00012455952,0.0013391472,0.00013150938,0.000044731252],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00009536261,0.00009998665,0.00022808865,0.000035663317,0.00009854808,0.00005185197,0.00049552403,0.000029303892,0.000087255576],"category_scores_gemma":[0.000016699183,0.00009449808,0.00006750502,0.0003005836,0.0001591188,0.00012975166,0.00020737805,0.00017337092,0.00016626737],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000020819975,0.0014473508,0.008243092,0.00013104522,0.00009130896,3.756195e-7,0.0013925219,0.0051803705,0.0028897934,0.97607344,0.00029051164,0.004258088],"study_design_scores_gemma":[0.00022019546,0.000018190853,0.0012668166,0.00016398693,0.000030338575,0.0000011841157,0.0014317931,0.6419916,0.00027745933,0.35433635,0.000083665764,0.00017842058],"about_ca_topic_score_codex":0.00028102816,"about_ca_topic_score_gemma":0.0000021892122,"teacher_disagreement_score":0.63681126,"about_ca_system_score_codex":0.000019713201,"about_ca_system_score_gemma":0.0000464476,"threshold_uncertainty_score":0.385352},"labels":[],"label_agreement":null},{"id":"W2050760584","doi":"10.1007/s00220-007-0198-2","title":"Adiabatic Theorems for Quantum Resonances","year":2007,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":37,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Adiabatic process; Adiabatic theorem; Eigenvalues and eigenvectors; Physics; Quantum; Quantum mechanics; Perturbation theory (quantum mechanics); Resonance (particle physics); Time evolution; Classical mechanics","score_opus":0.04595598142069232,"score_gpt":0.3469902792425277,"score_spread":0.30103429782183533,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2050760584","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.05192901,0.00019352777,0.8922055,0.00039238058,0.00008026181,0.0007292757,0.000036324316,0.000050851755,0.054382868],"genre_scores_gemma":[0.9849523,0.0000043567516,0.01455295,0.000030348903,0.00013921126,0.00013534684,0.000042078897,0.000020789637,0.00012265367],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99894285,0.000050043454,0.00044928727,0.00015145582,0.000118414784,0.00028796608],"domain_scores_gemma":[0.9972527,0.0014994406,0.0001133315,0.0010084037,0.000059433816,0.00006667432],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.000702273,0.00012845335,0.00025398305,0.000032381522,0.0001459641,0.000035030564,0.00063548866,0.00003807131,0.0000386108],"category_scores_gemma":[0.000048733433,0.00010991066,0.00011609441,0.00023598388,0.00019691538,0.00009173377,0.00012644092,0.00017486326,0.0000651859],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000005318443,0.00034415172,0.0010214592,0.000033363463,0.00001232998,7.1211154e-8,0.00032130777,0.000014169508,0.00008257541,0.9870729,0.00008971417,0.01100266],"study_design_scores_gemma":[0.00026120705,0.000019885503,0.00030597765,0.000088507106,0.00001062005,1.8002163e-7,0.000482871,0.092628255,0.000094132934,0.90410876,0.0018664801,0.00013310708],"about_ca_topic_score_codex":0.000022251474,"about_ca_topic_score_gemma":0.000007455181,"teacher_disagreement_score":0.9330233,"about_ca_system_score_codex":0.000029439532,"about_ca_system_score_gemma":0.000022156823,"threshold_uncertainty_score":0.44820264},"labels":[],"label_agreement":null},{"id":"W2050856262","doi":"10.1007/s00220-014-2081-2","title":"Baker–Akhiezer Spinor Kernel and Tau-functions on Moduli Spaces of Meromorphic Differentials","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Holomorphic and Operator Theory","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University","funders":"","keywords":"Meromorphic function; Riemann surface; Moduli space; Holomorphic function; Riemann–Hurwitz formula; Riemann Xi function; Abelian group; Bergman kernel; Context (archaeology)","score_opus":0.08398086452465872,"score_gpt":0.33446058278586255,"score_spread":0.25047971826120385,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2050856262","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.84932697,0.00013922444,0.11774143,0.001020627,0.00010739225,0.0007253987,0.000035953715,0.00010005736,0.03080293],"genre_scores_gemma":[0.979204,0.000057085654,0.020120138,0.00009725495,0.000035128156,0.00008457813,0.000010902103,0.000036927853,0.00035401294],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9983599,0.00045448742,0.0005453566,0.0002142155,0.00022206985,0.0002039305],"domain_scores_gemma":[0.9955026,0.0022030324,0.00019069276,0.0019317395,0.00008869319,0.00008325368],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0007285676,0.00020976011,0.0005174772,0.00007186784,0.00015721549,0.000035495294,0.0005473357,0.000109915076,0.00010677378],"category_scores_gemma":[0.0009262379,0.00017878204,0.00008864976,0.00023284846,0.00056984107,0.00009019451,0.0002556074,0.000341834,0.000089888],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000074657696,0.00089493545,0.00025247474,0.00015472565,0.00003456459,1.8317922e-7,0.00062061206,0.000010718611,0.0006196911,0.9960265,0.00039274254,0.0009853832],"study_design_scores_gemma":[0.00049118476,0.00007972227,0.00042606457,0.00024398616,0.0000728941,0.0000031086695,0.00039999068,0.005889585,0.0008448458,0.99101317,0.0003318761,0.00020359342],"about_ca_topic_score_codex":0.000004106369,"about_ca_topic_score_gemma":0.000005929985,"teacher_disagreement_score":0.12987699,"about_ca_system_score_codex":0.00002781247,"about_ca_system_score_gemma":0.000020955176,"threshold_uncertainty_score":0.72905195},"labels":[],"label_agreement":null},{"id":"W2052369248","doi":"10.1007/s00220-003-0998-y","title":"A Two Dimensional Fermi Liquid. Part 3: The Fermi Surface","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Cold Atom Physics and Bose-Einstein Condensates","field":"Physics and Astronomy","cited_by":19,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Fermi liquid theory; Fermi Gamma-ray Space Telescope; Fermi surface; Fermi gas; Physics; Condensed matter physics; Jump; Function (biology); Quantum oscillations; Zero (linguistics); Fermi level; Particle (ecology); Quantum mechanics; Superconductivity; Electron","score_opus":0.04602003806850213,"score_gpt":0.3194361560597738,"score_spread":0.2734161179912717,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2052369248","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.94252336,0.00023682047,0.004026579,0.006167448,0.00011553757,0.0007647552,0.000046517973,0.00009640816,0.04602258],"genre_scores_gemma":[0.9955587,0.000006409841,0.0037536041,0.00017759038,0.00016022086,0.000085081294,0.000047750946,0.000028553792,0.00018208518],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99869746,0.000106973595,0.00041254205,0.00022809906,0.00024830172,0.0003066194],"domain_scores_gemma":[0.99716467,0.0006102151,0.0001238444,0.0019354832,0.000091997594,0.00007378469],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00027067884,0.00022191655,0.00028354884,0.00001793047,0.0003754035,0.00009116595,0.0011020742,0.000032041826,0.00012673422],"category_scores_gemma":[0.000016186044,0.00016574336,0.0001615584,0.0003950384,0.00034127754,0.00015597818,0.0006550713,0.00045308136,0.000316808],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000061092746,0.00079934404,0.00027244247,0.000009669588,0.00004003995,4.9583855e-7,0.00042453318,0.003542005,0.0007777069,0.992572,0.000111837566,0.0014438349],"study_design_scores_gemma":[0.00070969365,0.000029052779,0.00010473147,0.00014763861,0.000036440975,0.0000010986803,0.0002526699,0.0055875983,0.0028261219,0.9887502,0.0012810732,0.00027368675],"about_ca_topic_score_codex":0.00007546567,"about_ca_topic_score_gemma":0.000014374498,"teacher_disagreement_score":0.05303535,"about_ca_system_score_codex":0.00006046064,"about_ca_system_score_gemma":0.000115345305,"threshold_uncertainty_score":0.6758818},"labels":[],"label_agreement":null},{"id":"W2053208180","doi":"10.1007/s00220-011-1396-5","title":"Nonexistence of Marginally Trapped Surfaces and Geons in 2 + 1 Gravity","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute; University of British Columbia","funders":"","keywords":"Convexity; Cutoff; Quantum gravity; Energy condition; Null (SQL); Physics; Boundary value problem; Quantization (signal processing); Mathematical physics; Boundary (topology); Cosmological constant; Mathematical analysis; Quantum; Classical mechanics; Mathematics; Quantum mechanics; General relativity; Statistics","score_opus":0.03442268339742634,"score_gpt":0.30575864994049473,"score_spread":0.2713359665430684,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2053208180","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.92014086,0.00019032141,0.015176731,0.00027181258,0.000016889197,0.0002772904,0.00002057587,0.000012896368,0.06389263],"genre_scores_gemma":[0.99227977,0.000018156328,0.00760173,0.000010523318,0.000020613383,0.000025398047,0.000011673087,0.0000112386815,0.000020908617],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99914855,0.00010326243,0.00031591166,0.000101420446,0.00010114142,0.00022972122],"domain_scores_gemma":[0.9986235,0.00044828327,0.000084137544,0.00074939616,0.000029786246,0.00006491518],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00032260627,0.00011572041,0.00027530745,0.000028016273,0.000046165973,0.0000128689835,0.00038606173,0.00003159774,0.000037534715],"category_scores_gemma":[0.000015763939,0.000108743996,0.000051446426,0.00026956457,0.00046926903,0.00014223479,0.00025600826,0.00025506326,0.000021537464],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000003358899,0.0009210287,0.031128043,0.000039135746,0.000008667502,3.6073487e-8,0.0008565413,0.000009267705,0.00009573434,0.9645927,0.000004467098,0.002341032],"study_design_scores_gemma":[0.00022561548,0.000010216716,0.015425785,0.000082273684,0.000013893691,1.53682e-7,0.00049359427,0.0023864927,0.000284703,0.98093045,0.000032676056,0.00011413567],"about_ca_topic_score_codex":0.000036308596,"about_ca_topic_score_gemma":0.0000028874017,"teacher_disagreement_score":0.07213891,"about_ca_system_score_codex":0.000012367191,"about_ca_system_score_gemma":0.000016634094,"threshold_uncertainty_score":0.44344515},"labels":[],"label_agreement":null},{"id":"W2053943971","doi":"10.1007/s00220-012-1612-y","title":"Multi-Vortex Non-radial Solutions to the Magnetic Ginzburg-Landau Equations","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Lakehead University","funders":"","keywords":"Vortex; Invariant (physics); Mathematical physics; Mathematics; Physics; Landau–Lifshitz–Gilbert equation; Landau quantization; Mathematical analysis; Magnetic field; Quantum mechanics; Magnetization; Mechanics","score_opus":0.19134689045879433,"score_gpt":0.3966309293187377,"score_spread":0.2052840388599434,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2053943971","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0017132823,0.00024491653,0.9813662,0.0046919137,0.00013437452,0.0017978871,0.000034748115,0.00018661446,0.009830045],"genre_scores_gemma":[0.5921955,0.000023165747,0.4059178,0.00035678933,0.00017765387,0.0008860157,0.000014559651,0.00007692279,0.00035161013],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99704057,0.00027477654,0.00095960347,0.0003024257,0.00048045054,0.0009421921],"domain_scores_gemma":[0.99013793,0.0052307337,0.0002135917,0.00393518,0.00016992306,0.00031265992],"candidate_categories":["metaepi_narrow","insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0013636516,0.000379351,0.00055287895,0.000112705005,0.0006378585,0.00008244334,0.0020001645,0.00012465274,0.00012655741],"category_scores_gemma":[0.0024845102,0.0003005686,0.00020444617,0.0011013707,0.00043690603,0.00044012917,0.001210356,0.0007609583,0.0015384639],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000035981252,0.002373454,0.000035984467,0.000098653574,0.000034619174,2.5931644e-7,0.0043228115,0.00019420178,0.00054151186,0.9881931,0.0015046952,0.002697127],"study_design_scores_gemma":[0.00043317446,0.0000347583,0.0001552701,0.00014498027,0.00009874096,0.000004219167,0.00042095434,0.05150676,0.00009126157,0.94512933,0.0016014411,0.00037907893],"about_ca_topic_score_codex":0.000008571907,"about_ca_topic_score_gemma":0.00003653786,"teacher_disagreement_score":0.59048223,"about_ca_system_score_codex":0.00021659488,"about_ca_system_score_gemma":0.00007745056,"threshold_uncertainty_score":0.9999446},"labels":[],"label_agreement":null},{"id":"W2055532102","doi":"10.1007/s00220-011-1363-1","title":"Computability of Brolin-Lyubich Measure","year":2011,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":22,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Measure (data warehouse); Julia set; Computability; Mathematics; Topological entropy; Endomorphism; Harmonic measure; Computable analysis; Invariant measure; Infinity; Discrete mathematics; Combinatorics; Polynomial; Null set; Domain (mathematical analysis); Pure mathematics; Harmonic function; Mathematical analysis; Set (abstract data type); Computer science","score_opus":0.2718158735655498,"score_gpt":0.37938244460361176,"score_spread":0.10756657103806194,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2055532102","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.10328689,0.00014832977,0.5919768,0.00027753873,0.00006123708,0.0012132346,0.0000367426,0.00019084469,0.30280837],"genre_scores_gemma":[0.7249572,0.000013871979,0.2748878,0.000019529523,0.000011064909,0.00004210526,0.000004404402,0.000026612463,0.000037374786],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99797213,0.00022767019,0.0009996269,0.00021414844,0.00032209957,0.00026432791],"domain_scores_gemma":[0.9946826,0.0018753373,0.0002888921,0.0028396286,0.00022135541,0.00009219459],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0010804585,0.00020906572,0.0006296737,0.00006590144,0.000074220756,0.000013574094,0.001312733,0.00012673184,0.00020368298],"category_scores_gemma":[0.0011789495,0.00018571677,0.00017673819,0.0004458112,0.0005363371,0.00012438845,0.0005152624,0.00038970736,0.00006207457],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000087040025,0.002605643,0.00038705964,0.00036640788,0.000028601684,5.658315e-7,0.0016985115,0.000001677416,0.00009299809,0.9923579,0.000051175008,0.0024007268],"study_design_scores_gemma":[0.00025675338,0.000029794264,0.0004819088,0.00020932728,0.00004057942,0.0000029525331,0.00015869929,0.028577238,0.0002663423,0.969776,0.00002509096,0.00017532338],"about_ca_topic_score_codex":0.000010035913,"about_ca_topic_score_gemma":0.000010609594,"teacher_disagreement_score":0.62167037,"about_ca_system_score_codex":0.000049249422,"about_ca_system_score_gemma":0.000046892575,"threshold_uncertainty_score":0.75733095},"labels":[],"label_agreement":null},{"id":"W2055688255","doi":"10.1007/s00220-003-1020-4","title":"Superdiffusivity of Asymmetric Exclusion Process in Dimensions One and Two","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":54,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"k-nearest neighbors algorithm; Dimension (graph theory); Mathematics; Statistical physics; Asymmetric simple exclusion process; Process (computing); Mutual exclusion; Diffusion; Pure mathematics; Physics; Computer science; Quantum mechanics; Theoretical computer science; Artificial intelligence","score_opus":0.09833125332452604,"score_gpt":0.3922268078153685,"score_spread":0.2938955544908425,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2055688255","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.28461462,0.00024228085,0.7104043,0.00064498617,0.000019429881,0.00063036516,0.000020426824,0.000045605226,0.003377994],"genre_scores_gemma":[0.8321476,0.00008806692,0.16765024,0.000026425714,0.0000072498847,0.000055455497,0.00000398564,0.000017587749,0.0000033916674],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99869037,0.00006957913,0.00057399616,0.00019205527,0.00025960006,0.00021438573],"domain_scores_gemma":[0.99650455,0.0022415246,0.00012448021,0.00093783205,0.0001205023,0.00007108928],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00044721484,0.00014793029,0.0004477076,0.00013507887,0.00008335873,0.000013718985,0.00047542446,0.0000705965,0.000007608081],"category_scores_gemma":[0.0027240652,0.00013993094,0.00003764732,0.0009469174,0.00022574929,0.000106864565,0.00047981687,0.0003318517,0.000007598907],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000072126186,0.0018538625,0.00005563845,0.00037927824,0.000006403227,9.679179e-7,0.0012782204,0.00005224722,0.00023498545,0.9929389,0.0000017994089,0.003190511],"study_design_scores_gemma":[0.00091569027,0.000047643684,0.00018641951,0.0005334032,0.000028531513,0.0000035709775,0.00029581058,0.018216847,0.00048432083,0.97914934,0.0000015667082,0.00013684119],"about_ca_topic_score_codex":0.000016686174,"about_ca_topic_score_gemma":0.00004115092,"teacher_disagreement_score":0.547533,"about_ca_system_score_codex":0.00007185437,"about_ca_system_score_gemma":0.000068438545,"threshold_uncertainty_score":0.5706218},"labels":[],"label_agreement":null},{"id":"W2061517624","doi":"10.1007/s00220-010-1012-0","title":"Random Quantum Channels I: Graphical Calculus and the Bell State Phenomenon","year":2010,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":80,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Ottawa","funders":"","keywords":"Eigenvalues and eigenvectors; Random matrix; Mathematics; Quantum; Statistical physics; Entropy (arrow of time); Applied mathematics; Calculus (dental); Quantum mechanics; Physics","score_opus":0.04492869528735014,"score_gpt":0.33676475201575545,"score_spread":0.2918360567284053,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2061517624","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5770415,0.0009992515,0.34901592,0.024882216,0.00029701268,0.005863294,0.000059791608,0.00044844416,0.041392542],"genre_scores_gemma":[0.97729564,0.00036867126,0.021392515,0.00011142526,0.0000734204,0.0005502192,0.000008360667,0.000036595036,0.00016316274],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984451,0.00023365128,0.0006004309,0.00021922968,0.00022470394,0.00027689495],"domain_scores_gemma":[0.99240786,0.0050769965,0.00018504131,0.0021523323,0.00008490022,0.00009289936],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0013602823,0.00020201868,0.00047445737,0.00005629496,0.00039626,0.00011441987,0.0010590595,0.00008451514,0.00002935566],"category_scores_gemma":[0.0005582476,0.00013454208,0.00012642673,0.0004787243,0.0011674761,0.00011380818,0.00047327767,0.00079801615,0.00004695759],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00004243807,0.00039450524,0.000017157408,0.000057019308,0.000023254528,2.5791564e-7,0.0016587138,0.0000070657034,0.00013795581,0.9960254,0.00016546962,0.0014707508],"study_design_scores_gemma":[0.0033429249,0.000009276581,0.000027039745,0.000029784644,0.00005401174,0.000006133918,0.00017010118,0.05937149,0.0000467488,0.9358143,0.0009722102,0.00015597267],"about_ca_topic_score_codex":0.000018847251,"about_ca_topic_score_gemma":0.000033885393,"teacher_disagreement_score":0.4002541,"about_ca_system_score_codex":0.00001438435,"about_ca_system_score_gemma":0.000026499258,"threshold_uncertainty_score":0.5486466},"labels":[],"label_agreement":null},{"id":"W2062394371","doi":"10.1007/s00220-013-1841-8","title":"Approximation and Equidistribution of Phase Shifts: Spherical Symmetry","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Semiclassical physics; Eigenvalues and eigenvectors; Unit sphere; Hamiltonian (control theory); Remainder; Unit circle; Unit disk; Operator (biology); Complex plane; Hypersurface; Spectrum (functional analysis)","score_opus":0.0900946717670585,"score_gpt":0.3848239906473635,"score_spread":0.294729318880305,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2062394371","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.50726205,0.00013313527,0.46920684,0.00071316294,0.000028206778,0.0014067234,0.000022126256,0.00015971571,0.021068066],"genre_scores_gemma":[0.77609277,0.000030237547,0.22356813,0.000028517257,0.000026806869,0.0001808489,0.000019737608,0.000032042924,0.000020896678],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9979102,0.00025563705,0.00094960426,0.00024397776,0.0003349389,0.0003056119],"domain_scores_gemma":[0.9947858,0.0028588483,0.0003127556,0.0017657343,0.00016802976,0.000108855136],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00064857065,0.0002472801,0.00059214636,0.000059372993,0.000095127914,0.000052160645,0.00077077956,0.00012733969,0.000164557],"category_scores_gemma":[0.0015024194,0.00022578961,0.00011028656,0.0006126342,0.0006972346,0.00040411047,0.0004526741,0.0003932925,0.00009299462],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006983951,0.0021686645,0.00003635202,0.00037729664,0.00002587133,2.1368224e-7,0.0006070839,0.0000013834054,0.0035043058,0.9852013,0.000119938566,0.007950623],"study_design_scores_gemma":[0.0006698276,0.00007274438,0.00007582384,0.00020451337,0.00004547706,0.0000028985637,0.00049552234,0.029347582,0.0022066769,0.96665317,0.000016663815,0.00020913004],"about_ca_topic_score_codex":0.0000064771625,"about_ca_topic_score_gemma":0.0000010131859,"teacher_disagreement_score":0.26883075,"about_ca_system_score_codex":0.00009937259,"about_ca_system_score_gemma":0.000024459976,"threshold_uncertainty_score":0.9207433},"labels":[],"label_agreement":null},{"id":"W2062731856","doi":"10.1007/s002200100546","title":"Calogero-Moser Systems and Hitchin Systems","year":2001,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":19,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; McGill University","funders":"","keywords":"Equivariant map; Complex system; Higgs boson; Group (periodic table); Lie group","score_opus":0.1033517073125358,"score_gpt":0.3539101189407584,"score_spread":0.2505584116282226,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2062731856","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.82996017,0.0048700958,0.1050653,0.0012024605,0.00097484,0.0026049702,0.000018985736,0.0005020637,0.054801147],"genre_scores_gemma":[0.99366766,0.00020483843,0.0055080233,0.00002637917,0.00010283764,0.00015235273,0.000005796397,0.000037956623,0.00029417203],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984962,0.00021488275,0.0005603622,0.0002156911,0.00024677647,0.0002660929],"domain_scores_gemma":[0.99652773,0.0012566667,0.00015044582,0.001891324,0.00008150581,0.00009234268],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00041098185,0.0002064348,0.00045497846,0.000049583236,0.0001730495,0.00011712744,0.0007550244,0.00013028417,0.000010075037],"category_scores_gemma":[0.0002674029,0.00017906289,0.0000582699,0.00028796372,0.00019928555,0.00013808826,0.0004113953,0.00035364024,0.000029181207],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004011936,0.00019788429,0.00024350575,0.00014305637,0.000021869446,0.000001685542,0.000551955,0.00004421474,0.000015975635,0.9981135,0.0002080624,0.00045426053],"study_design_scores_gemma":[0.00032730185,0.000017090746,0.000063843196,0.00019338245,0.000030248237,0.000026940203,0.00044643166,0.034206506,0.000003914936,0.9638604,0.00063057797,0.00019339452],"about_ca_topic_score_codex":0.000044083266,"about_ca_topic_score_gemma":0.0000047095496,"teacher_disagreement_score":0.16370751,"about_ca_system_score_codex":0.00007648495,"about_ca_system_score_gemma":0.00002737952,"threshold_uncertainty_score":0.73019725},"labels":[],"label_agreement":null},{"id":"W2063961079","doi":"10.1007/s002200050790","title":"Separating Coordinates for the Generalized Hitchin Systems and the Classical r-Matrices","year":2000,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":13,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University; Université de Montréal","funders":"","keywords":"Mathematics; Pure mathematics; Vector bundle; Genus; Meromorphic function; Trigonometry; Mathematical analysis; Algebra over a field","score_opus":0.037875860058945866,"score_gpt":0.33699951545863766,"score_spread":0.29912365539969177,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2063961079","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.34876573,0.015123805,0.37302488,0.06212133,0.00037673005,0.011014225,0.00046590294,0.00027501205,0.18883236],"genre_scores_gemma":[0.989843,0.00009917966,0.008245691,0.0000610889,0.00022302494,0.00038411465,0.000023000484,0.000016444299,0.0011044552],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99919254,0.00016876895,0.00029413807,0.00010601403,0.00008069161,0.00015787334],"domain_scores_gemma":[0.99596155,0.0030488104,0.00007040532,0.00085815694,0.000032881384,0.0000281734],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00042632033,0.00010836544,0.00022506711,0.000009009318,0.00046212986,0.00014246328,0.0005718046,0.000024017661,0.000036206016],"category_scores_gemma":[0.000024614901,0.0000583358,0.00009127827,0.00013618205,0.00039844622,0.00006560341,0.00012756306,0.00020945209,0.000018473762],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009672737,0.00012623677,0.000073331605,0.000017142875,0.00003499329,1.8779302e-8,0.00066693244,0.0005010377,0.0000061368182,0.98664796,0.00033041893,0.011586094],"study_design_scores_gemma":[0.00066635344,0.00000632114,0.000026261612,0.000033138553,0.00004377442,5.063026e-7,0.0005749517,0.5873029,0.0000073840824,0.4031709,0.008090638,0.00007684982],"about_ca_topic_score_codex":0.0000523582,"about_ca_topic_score_gemma":0.0000026136283,"teacher_disagreement_score":0.6410773,"about_ca_system_score_codex":0.0000091931815,"about_ca_system_score_gemma":0.000018289475,"threshold_uncertainty_score":0.35543758},"labels":[],"label_agreement":null},{"id":"W2064877258","doi":"10.1007/s002200000289","title":"More Operator Versions of the Schwarz Inequality","year":2000,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Inequalities and Applications","field":"Mathematics","cited_by":40,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Complex system; Mathematics; Inequality; Operator (biology); Algebra over a field; Pure mathematics; Cauchy–Schwarz inequality; Calculus (dental); Mathematical analysis; Computer science; Artificial intelligence; Medicine","score_opus":0.1701489723658526,"score_gpt":0.4103244956938752,"score_spread":0.24017552332802258,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2064877258","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8026327,0.00017947097,0.023247354,0.012369513,0.00006002383,0.0023867344,0.00020152978,0.00024680496,0.1586759],"genre_scores_gemma":[0.93859875,0.000056203342,0.059783828,0.00020628318,0.00003072771,0.00021592749,0.000009456912,0.000032765893,0.001066036],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9981319,0.00025235437,0.00085884915,0.00018393865,0.00033281307,0.00024014448],"domain_scores_gemma":[0.99407065,0.0019467885,0.00016469322,0.003635926,0.00011033106,0.000071631956],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.00057624775,0.00018133291,0.00041207715,0.000028243085,0.0002431259,0.000026193304,0.0017932394,0.000093624694,0.0009250355],"category_scores_gemma":[0.0006870302,0.00012818263,0.00018996275,0.000688349,0.00062026654,0.00011509181,0.0004661624,0.00038910558,0.000119665674],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000028963846,0.0010050863,0.00009032585,0.00017401169,0.000015914757,8.848175e-8,0.0014650916,0.000017080616,0.00010892233,0.9947539,0.00073168345,0.0016349914],"study_design_scores_gemma":[0.00024547952,0.00001003413,0.00018103236,0.00024144485,0.000038410584,0.0000017996906,0.0006816125,0.0069681923,0.0005390982,0.98919815,0.0017376441,0.00015708747],"about_ca_topic_score_codex":0.00001458455,"about_ca_topic_score_gemma":0.0000073345986,"teacher_disagreement_score":0.15760985,"about_ca_system_score_codex":0.000054661603,"about_ca_system_score_gemma":0.000059960952,"threshold_uncertainty_score":0.99998826},"labels":[],"label_agreement":null},{"id":"W2064906820","doi":"10.1007/s00220-006-0150-x","title":"Efficient Quantum Algorithms for Simulating Sparse Hamiltonians","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":689,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo; University of Calgary","funders":"","keywords":"Sublinear function; Scaling; Bounded function; Hamiltonian (control theory); Quantum computer; Quantum algorithm; Quantum; Integer (computer science)","score_opus":0.04549101561219962,"score_gpt":0.3138557577566935,"score_spread":0.2683647421444939,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2064906820","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.014162202,0.00011675687,0.98246086,0.0011131717,0.000072777606,0.00039284912,0.0000064097894,0.00019674875,0.0014782258],"genre_scores_gemma":[0.50079274,0.000001518507,0.49899438,0.000053055137,0.00006366068,0.000047745652,0.000006873079,0.000013936913,0.000026124859],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99856794,0.00009520838,0.00046754806,0.00030307067,0.000207192,0.00035903708],"domain_scores_gemma":[0.9963426,0.0013573458,0.00012966969,0.00202955,0.000092059025,0.000048755803],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00046243184,0.00017743369,0.00026118345,0.00007163546,0.00032497532,0.00012921295,0.0019123175,0.000058705078,0.0000013429509],"category_scores_gemma":[0.00011126591,0.00016478739,0.000120135766,0.000540097,0.00014879019,0.0000621346,0.0006991625,0.00027373817,0.00002807625],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[7.584301e-7,0.00046445697,0.00001674076,0.000031629697,0.0000043718915,7.45433e-7,0.00043257995,0.24432862,0.00007191172,0.73534244,0.00005396731,0.01925176],"study_design_scores_gemma":[0.00018693146,0.000016533286,0.00007678152,0.000056343575,0.0000034213253,0.0000023100902,0.0000144760625,0.6145571,0.000042070467,0.38465607,0.00026518604,0.0001228016],"about_ca_topic_score_codex":0.000015178111,"about_ca_topic_score_gemma":0.000003407514,"teacher_disagreement_score":0.48663053,"about_ca_system_score_codex":0.000053658394,"about_ca_system_score_gemma":0.000044759778,"threshold_uncertainty_score":0.6719835},"labels":[],"label_agreement":null},{"id":"W2067305690","doi":"10.1007/s00220-009-0833-1","title":"Continuity of Quantum Channel Capacities","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":86,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"","keywords":"Classical capacity; Quantum; Quantum channel; Bounded function; Upper and lower bounds; Quantum capacity; Amplitude damping channel; Channel (broadcasting); Channel capacity","score_opus":0.047081938687385645,"score_gpt":0.30105222214667715,"score_spread":0.2539702834592915,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2067305690","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.006349073,0.000088134715,0.9512605,0.0011885813,0.000026121754,0.00014722715,0.0000028842344,0.00008950208,0.040847942],"genre_scores_gemma":[0.95615524,0.000046559464,0.04354093,0.0002229512,0.000006339649,0.000012030018,0.00000334693,0.0000026200692,0.000009980272],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991322,0.000067481444,0.0004016657,0.000085014704,0.00017240261,0.0001412109],"domain_scores_gemma":[0.9978501,0.00021180336,0.00013534028,0.0016648977,0.0000999508,0.000037884194],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00029292388,0.0000879967,0.00020002353,0.00008657034,0.0000714512,0.00003836981,0.0016777836,0.00003871602,0.0000046459954],"category_scores_gemma":[0.00006690709,0.000082341765,0.00007896849,0.00056659913,0.00025569432,0.00044102376,0.000195727,0.00016368015,0.000035678993],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[7.2131274e-7,0.00023625973,0.000012412874,0.000016825503,0.000002929317,7.522441e-8,0.0035301754,0.000019942467,0.000047344776,0.9916232,0.000092178736,0.0044179317],"study_design_scores_gemma":[0.00011987744,0.000025801473,0.00054355734,0.000044754004,0.0000019674758,0.0000010534203,0.00030286366,0.20884636,0.0003630814,0.78954804,0.00012764592,0.0000749835],"about_ca_topic_score_codex":0.0000022543934,"about_ca_topic_score_gemma":8.1473434e-7,"teacher_disagreement_score":0.94980615,"about_ca_system_score_codex":0.000014453307,"about_ca_system_score_gemma":0.00002381661,"threshold_uncertainty_score":0.33578},"labels":[],"label_agreement":null},{"id":"W2068649488","doi":"10.1007/s00220-003-0912-7","title":"On the Geometry and Mass of Static, Asymptotically AdS Spacetimes, and the Uniqueness of the AdS Soliton","year":2003,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometric Analysis and Curvature Flows","field":"Mathematics","cited_by":35,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"","keywords":"Uniqueness; Hypersurface; Convexity; Geodesic; Minkowski space; Conjecture; Conformal map; Soliton; Pullback","score_opus":0.04028749343610213,"score_gpt":0.30388388845648134,"score_spread":0.26359639502037924,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2068649488","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.75634027,0.0025682107,0.14920147,0.017261555,0.00008736075,0.0030074422,0.000049251074,0.000052641215,0.0714318],"genre_scores_gemma":[0.9819657,0.00022273957,0.017493723,0.00012624898,0.0000057662905,0.000044716333,0.0000013469042,0.000017124532,0.00012262417],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9979382,0.0008410232,0.00056511845,0.0001363808,0.0003538679,0.00016537774],"domain_scores_gemma":[0.986537,0.010745132,0.0003076252,0.002221062,0.00015382632,0.000035358276],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0021051546,0.00016253853,0.0004796413,0.00006277859,0.00016789742,0.00003429064,0.000869279,0.0000814933,0.00003476174],"category_scores_gemma":[0.004286972,0.000076113734,0.0001234515,0.0010392827,0.0013419827,0.000049491922,0.0003062385,0.00043574732,0.0000022820432],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000007692064,0.00028177205,0.0002495003,0.00011721385,0.00006582939,4.776041e-8,0.00075334567,0.000024309564,0.000047063662,0.99798775,0.00014532212,0.00032015302],"study_design_scores_gemma":[0.00041241173,0.000022125447,0.00033043235,0.00016237203,0.0001438308,0.0000015230635,0.00088055234,0.008061079,0.00045995755,0.9893123,0.00012749039,0.00008591343],"about_ca_topic_score_codex":0.000005355223,"about_ca_topic_score_gemma":0.000004811439,"teacher_disagreement_score":0.22562543,"about_ca_system_score_codex":0.000020392607,"about_ca_system_score_gemma":0.00004740536,"threshold_uncertainty_score":0.51322156},"labels":[],"label_agreement":null},{"id":"W2070565621","doi":"10.1007/s00220-004-1039-1","title":"Convergence of Perturbation Expansions in Fermionic Models. Part 1: Nonperturbative Bounds","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":17,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Quartic function; Fermion; Renormalization; Mathematical physics; Renormalization group; Mathematics; Physics; Operator (biology); Convergence (economics); Perturbation theory (quantum mechanics); Complex system; Perturbation (astronomy); Quantum mechanics; Pure mathematics","score_opus":0.15694306040757344,"score_gpt":0.37601160807048006,"score_spread":0.21906854766290662,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2070565621","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.57772934,0.0005210814,0.32532638,0.002602295,0.00020323519,0.002856484,0.00004747269,0.00035390462,0.09035976],"genre_scores_gemma":[0.9221709,0.00016032236,0.077156745,0.00006900722,0.000033031618,0.00023157532,0.000016848067,0.000055976958,0.00010559058],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.997148,0.00028536122,0.0013075807,0.00035147273,0.00047736056,0.0004302514],"domain_scores_gemma":[0.9938347,0.0029610847,0.0003511847,0.0025529806,0.0001987746,0.00010132253],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00085715705,0.00033563806,0.00077055115,0.00015705604,0.00012588198,0.000029462042,0.0013994713,0.00016737502,0.000082578554],"category_scores_gemma":[0.001387569,0.00031770443,0.00019462196,0.0011546235,0.00076183263,0.00051777787,0.00042938042,0.0006540405,0.000072541225],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001335328,0.0022528884,0.00002816808,0.00021187772,0.00002237321,0.0000014440611,0.0061928104,0.0014870405,0.00031667342,0.9892385,0.000020294783,0.00021456736],"study_design_scores_gemma":[0.0007455529,0.00005221307,0.00005200625,0.0008124344,0.00003440615,0.0000034534057,0.00090438215,0.02503122,0.0012200709,0.9708322,0.000009899957,0.00030215766],"about_ca_topic_score_codex":0.0000185342,"about_ca_topic_score_gemma":0.000049048962,"teacher_disagreement_score":0.34444153,"about_ca_system_score_codex":0.00039681664,"about_ca_system_score_gemma":0.00016776171,"threshold_uncertainty_score":0.9999275},"labels":[],"label_agreement":null},{"id":"W2071160621","doi":"10.1007/s00220-008-0624-0","title":"Counterexamples to the Maximal p-Norm Multiplicativity Conjecture for all p &gt; 1","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Wireless Communication Security Techniques","field":"Engineering","cited_by":113,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Engineering and Physical Sciences Research Council","keywords":"Counterexample; Conjecture; Von Neumann entropy; Quantum; Classical capacity; Entropy (arrow of time); Quantum channel; Quantum mutual information; Joint quantum entropy","score_opus":0.09462451070217012,"score_gpt":0.32552309451919936,"score_spread":0.23089858381702924,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2071160621","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.045282964,0.00077872525,0.93068945,0.0073503456,0.00004873755,0.0028440235,0.00015409614,0.0011302547,0.011721379],"genre_scores_gemma":[0.8411782,0.00033269078,0.15689363,0.00025605317,0.000029538776,0.0011935838,0.000051410505,0.000043663644,0.000021247914],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9989716,0.00008766364,0.00039016388,0.00014978532,0.00015341595,0.00024741457],"domain_scores_gemma":[0.99503094,0.0013634685,0.00005334398,0.0033983593,0.00009199566,0.000061906314],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00030810354,0.00018710441,0.00027206086,0.000050011186,0.00022723954,0.000034302262,0.0021755565,0.00008871119,0.00001005303],"category_scores_gemma":[0.00018743362,0.00015863664,0.0000906178,0.00031375777,0.00026409086,0.00012224271,0.00047058647,0.00039164527,0.000076625416],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000015460473,0.00091436773,0.00027609427,0.00025140255,0.00010545388,6.976716e-7,0.013419791,0.0034387093,0.0027910005,0.94161546,0.019499352,0.017672192],"study_design_scores_gemma":[0.00061237393,0.000052889605,0.0014060047,0.00018483504,0.000037078644,0.000025145573,0.00025484353,0.38490483,0.0051924502,0.32835314,0.27826774,0.00070863834],"about_ca_topic_score_codex":0.0000069868106,"about_ca_topic_score_gemma":0.000056205172,"teacher_disagreement_score":0.7958952,"about_ca_system_score_codex":0.00011524031,"about_ca_system_score_gemma":0.000017182054,"threshold_uncertainty_score":0.6469015},"labels":[],"label_agreement":null},{"id":"W2071355376","doi":"10.1007/s00220-010-1035-6","title":"Unitary Representations of Nilpotent Super Lie Groups","year":2010,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Topics in Algebra","field":"Mathematics","cited_by":26,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Ottawa","funders":"","keywords":"Mathematics; Simple Lie group; Pure mathematics; Representation of a Lie group; Lie group; Fundamental representation; Nilpotent; Representation theory of SU; (g,K)-module; Lie algebra; Unitary representation; Unitary state; Heisenberg group; Lie theory; Adjoint representation; Adjoint representation of a Lie algebra; Lie conformal algebra; Weight","score_opus":0.09810433728639466,"score_gpt":0.39585543610163265,"score_spread":0.297751098815238,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2071355376","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.74885976,0.00013196813,0.15752703,0.0021648738,0.0002339436,0.0011327959,0.00003247866,0.00023945417,0.08967769],"genre_scores_gemma":[0.62093735,0.000042394866,0.37869632,0.000033715136,0.000041882606,0.000079035155,0.000016472875,0.000029539326,0.00012328064],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985198,0.000120391975,0.0006883628,0.00019128999,0.00026598308,0.00021422109],"domain_scores_gemma":[0.9933813,0.002599238,0.00017733034,0.0036026656,0.00017202213,0.00006743251],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00041255113,0.00016254873,0.0003429532,0.00008393952,0.00011997024,0.000016143487,0.0012912849,0.00010857526,0.00013661015],"category_scores_gemma":[0.0016475444,0.00015936552,0.00011000898,0.0004709546,0.0005889522,0.00020478043,0.0006216279,0.00077354244,0.000059222606],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000022550732,0.0009030574,0.0003074172,0.0000894108,0.000018599216,6.961632e-7,0.0012470776,0.0000056830722,0.0020077403,0.99393886,0.00023789663,0.0012413077],"study_design_scores_gemma":[0.00024411308,0.000012960388,0.00030709954,0.000070126815,0.000029405279,0.0000049593446,0.0005016528,0.0014853367,0.0016636492,0.99527985,0.00025097287,0.0001498881],"about_ca_topic_score_codex":0.0000058022933,"about_ca_topic_score_gemma":0.00003963711,"teacher_disagreement_score":0.2211693,"about_ca_system_score_codex":0.00003464441,"about_ca_system_score_gemma":0.000045541194,"threshold_uncertainty_score":0.64987373},"labels":[],"label_agreement":null},{"id":"W2071389404","doi":"10.1007/s00220-013-1718-x","title":"Matrix Product States, Random Matrix Theory and the Principle of Maximum Entropy","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum many-body systems","field":"Physics and Astronomy","cited_by":29,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Ottawa; Statistics Canada","funders":"","keywords":"Quantum relative entropy; Random matrix; Principle of maximum entropy; Mathematics; Joint quantum entropy; Matrix multiplication; Matrix (chemical analysis); Single-entry matrix; Statistical physics; Nonnegative matrix; Quantum mechanics; Physics; Symmetric matrix; Quantum; Quantum discord; Quantum entanglement; Statistics; Materials science","score_opus":0.015549003537837528,"score_gpt":0.30824161764052893,"score_spread":0.29269261410269143,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2071389404","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.79440564,0.0022170448,0.17966829,0.0029572323,0.00011376774,0.0057339678,0.00007120809,0.000106328174,0.014726522],"genre_scores_gemma":[0.9931066,0.00003710379,0.0059595266,0.000013204223,0.000062725136,0.00040264527,0.000026670605,0.000024958297,0.00036653675],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99815935,0.0006692794,0.00060406356,0.00017203434,0.00017952846,0.00021573572],"domain_scores_gemma":[0.9955809,0.0019519413,0.00026023787,0.0020476168,0.00011283742,0.000046442005],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0012378565,0.00016855786,0.00044200558,0.000036320154,0.0001372932,0.000071713315,0.0008825894,0.00002504525,0.00015149264],"category_scores_gemma":[0.00010447252,0.000112602625,0.00010090047,0.00023034804,0.0007696831,0.00016662385,0.0005098237,0.00027442363,0.00015165638],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000030063617,0.0002832541,0.0007388623,0.00008766347,0.00005334115,3.9726032e-8,0.0010452317,0.000046037116,0.00018581499,0.9963319,0.00010056476,0.0010972782],"study_design_scores_gemma":[0.0016512171,0.000009275046,0.00019013237,0.00007924687,0.000039453687,7.5489396e-7,0.0006103304,0.043940246,0.00024117895,0.9525023,0.0006162213,0.00011963124],"about_ca_topic_score_codex":0.00006406383,"about_ca_topic_score_gemma":6.204854e-7,"teacher_disagreement_score":0.198701,"about_ca_system_score_codex":0.000018788822,"about_ca_system_score_gemma":0.000034849414,"threshold_uncertainty_score":0.45918018},"labels":[],"label_agreement":null},{"id":"W2072381205","doi":"10.1007/s00220-008-0710-3","title":"The Power of Quantum Systems on a Line","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":219,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Quantum computer; Adiabatic quantum computation; Quantum; Quantum algorithm; Computer science; Quantum entanglement; Turing machine; Quantum state; Quantum system; Qubit; Quantum process; Physics; Quantum mechanics; Statistical physics; Theoretical physics; Computation; Algorithm; Quantum dynamics","score_opus":0.03895156383951269,"score_gpt":0.31363103184592306,"score_spread":0.27467946800641035,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2072381205","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.008145484,0.00045654198,0.97872496,0.0060629006,0.000093929186,0.0002459075,0.000001574531,0.000089734065,0.006178951],"genre_scores_gemma":[0.9710494,0.00003205479,0.028771207,0.00009474713,0.000017829645,0.000008041879,7.0199224e-7,0.0000044027083,0.00002158697],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99907404,0.00013656926,0.0003221745,0.00012071894,0.00019167142,0.0001548206],"domain_scores_gemma":[0.99620324,0.0011189135,0.00011129542,0.0024762843,0.00006009557,0.000030182431],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00043066847,0.0000905195,0.00016570311,0.00003078169,0.0001720769,0.00007361278,0.002302567,0.000029772309,3.558925e-7],"category_scores_gemma":[0.00012759221,0.000058784248,0.000056018507,0.00039579632,0.00012317214,0.000053266464,0.00029043463,0.00027122075,0.00001966821],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000010645367,0.00026493365,0.0000013385313,0.000006190287,0.0000033106633,2.8368532e-7,0.00056457333,0.00460457,0.000024986715,0.97737765,0.00006271096,0.017088393],"study_design_scores_gemma":[0.00005484269,0.00007332085,0.000058495672,0.00008017624,9.916838e-7,0.0000014991487,0.0000247748,0.60433346,0.000031709427,0.39506683,0.0002311629,0.00004271279],"about_ca_topic_score_codex":0.0000014746166,"about_ca_topic_score_gemma":1.9238708e-7,"teacher_disagreement_score":0.9629039,"about_ca_system_score_codex":0.000016511582,"about_ca_system_score_gemma":0.000024504125,"threshold_uncertainty_score":0.42787808},"labels":[],"label_agreement":null},{"id":"W2075566220","doi":"10.1007/s00220-014-1915-2","title":"The Dunkl Oscillator in the Plane II: Representations of the Symmetry Algebra","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Non-Hermitian Physics","field":"Physics and Astronomy","cited_by":103,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal","funders":"","keywords":"Algebra over a field; Mathematics; Symmetry (geometry); Complex system; Complex plane; Pure mathematics; Plane (geometry); Quantum algebra; Algebra representation; Geometry; Mathematical analysis; Computer science","score_opus":0.025998107645518482,"score_gpt":0.30007564042516804,"score_spread":0.2740775327796496,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2075566220","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6677845,0.00037321408,0.041702524,0.019219724,0.00040917238,0.0027418218,0.00013867347,0.000061797145,0.2675686],"genre_scores_gemma":[0.9987876,0.000014936656,0.0007976278,0.00009817944,0.00007531067,0.00010408547,0.0000141813025,0.000015329137,0.00009277536],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99854577,0.00041682247,0.00044639292,0.00013699786,0.00024949777,0.00020453171],"domain_scores_gemma":[0.99485564,0.0021351117,0.00019349989,0.0027336618,0.000057101155,0.000025006022],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00078180444,0.00013059587,0.00020272128,0.000020706082,0.00050884334,0.00005077516,0.001975077,0.000032212673,0.000015079652],"category_scores_gemma":[0.00010237357,0.000072240335,0.00013108534,0.000591382,0.00031882813,0.00007617951,0.0005561421,0.00043473646,0.000026355528],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000015257663,0.00035027481,0.00090489374,0.0000101262685,0.000014040365,2.5750369e-8,0.00093825813,0.000024339663,0.000093530965,0.994118,0.0004020326,0.0031430002],"study_design_scores_gemma":[0.00019550374,0.000014148117,0.0014575665,0.000065699656,0.000018921435,3.9953196e-7,0.000919615,0.017192377,0.0003773695,0.9779579,0.0017092668,0.00009120766],"about_ca_topic_score_codex":0.00003069179,"about_ca_topic_score_gemma":0.000017595381,"teacher_disagreement_score":0.33100307,"about_ca_system_score_codex":0.000017047541,"about_ca_system_score_gemma":0.0000453734,"threshold_uncertainty_score":0.39136633},"labels":[],"label_agreement":null},{"id":"W2076031642","doi":"10.1007/s00220-004-1040-8","title":"Convergence of Perturbation Expansions in Fermionic Models. Part 2: Overlapping Loops","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Chromodynamics and Particle Interactions","field":"Physics and Astronomy","cited_by":13,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Fermion; Convergence (economics); Perturbation (astronomy); Perturbation theory (quantum mechanics); Physics; Regular polygon; Mathematics; Fermi Gamma-ray Space Telescope; Complex system; Mathematical physics; Statistical physics; Quantum mechanics; Geometry; Computer science","score_opus":0.06088511233431772,"score_gpt":0.32225734744210927,"score_spread":0.26137223510779156,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2076031642","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8776163,0.000061694285,0.10830838,0.0005405832,0.000052453033,0.00026896363,0.000018683992,0.000019484258,0.013113452],"genre_scores_gemma":[0.9961562,0.000033457196,0.0036235522,0.000015838375,0.000019690946,0.00007838322,0.000032546443,0.000012152264,0.000028185286],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990592,0.00005794513,0.00047325838,0.00013353804,0.00011205273,0.00016398363],"domain_scores_gemma":[0.9986352,0.00027402892,0.00011818321,0.0008665995,0.00006748176,0.00003852037],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0001490357,0.000104829065,0.00020884257,0.000056924197,0.00007695315,0.000016568309,0.0003823442,0.000031179487,0.00008008181],"category_scores_gemma":[0.000024109924,0.0001085904,0.00007569756,0.0003876299,0.00013338949,0.0002728641,0.00013956582,0.0002509584,0.000035513425],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000021881349,0.00088454096,0.00060635456,0.00001674413,0.000010002717,1.6947986e-7,0.001398018,0.028304698,0.0005182442,0.96769303,0.0000039779707,0.0005620397],"study_design_scores_gemma":[0.00025687655,0.000008502653,0.00029273127,0.00020427062,0.0000071509303,3.3764974e-7,0.0006284516,0.28164926,0.00026837032,0.71659154,0.000010466268,0.00008203796],"about_ca_topic_score_codex":0.00015440104,"about_ca_topic_score_gemma":0.000047566347,"teacher_disagreement_score":0.25334457,"about_ca_system_score_codex":0.00007565613,"about_ca_system_score_gemma":0.00007873767,"threshold_uncertainty_score":0.44281882},"labels":[],"label_agreement":null},{"id":"W2077720616","doi":"10.1007/s00220-014-1928-x","title":"Renormalization of a SU(2) Tensorial Group Field Theory in Three Dimensions","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":110,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Gauge theory; Quantum field theory; Asymptotic safety in quantum gravity; Renormalization group; Quantum gravity; Point (geometry); Field (mathematics); Renormalization","score_opus":0.01942786137077412,"score_gpt":0.27902691801899865,"score_spread":0.2595990566482245,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2077720616","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.10475388,0.000027343525,0.821921,0.00027540707,0.000054236825,0.00034318236,0.000010788033,0.000026399524,0.072587766],"genre_scores_gemma":[0.992416,0.0000049296436,0.0073485905,0.00004204854,0.00008490345,0.000041676598,0.00003133273,0.000018139703,0.000012327152],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99887174,0.00021774096,0.00044666787,0.00014490027,0.00013137731,0.00018756714],"domain_scores_gemma":[0.9971354,0.0014400646,0.00011594733,0.0012098817,0.000056932928,0.000041750114],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00047752992,0.00012944941,0.00029802148,0.000045464967,0.00006444995,0.000018454559,0.0005518997,0.000052874486,0.00007687212],"category_scores_gemma":[0.00010589887,0.00011895503,0.00008874758,0.0003647024,0.00024338948,0.0001060393,0.00030149386,0.0002965052,0.000030258585],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000012470988,0.00070076983,0.0030914338,0.000022648985,0.000010877857,4.1964416e-8,0.0003014563,0.000094948686,0.000081884595,0.989496,0.000013672913,0.0061737983],"study_design_scores_gemma":[0.00040537078,0.000037339512,0.0005004867,0.00012327184,0.000018105953,7.933993e-8,0.00011551984,0.019927558,0.00029774845,0.978393,0.000061231745,0.000120286786],"about_ca_topic_score_codex":0.000031865686,"about_ca_topic_score_gemma":0.000009775005,"teacher_disagreement_score":0.8876622,"about_ca_system_score_codex":0.00001676769,"about_ca_system_score_gemma":0.000015613377,"threshold_uncertainty_score":0.48508453},"labels":[],"label_agreement":null},{"id":"W2079257758","doi":"10.1007/s00220-012-1583-z","title":"Endpoint Distribution of Directed Polymers in 1 + 1 Dimensions","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":43,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Distribution (mathematics); Polymer; Joint probability distribution; Point process; Complex system; Point (geometry); Joint (building)","score_opus":0.08067560907542828,"score_gpt":0.3658486626079209,"score_spread":0.28517305353249267,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2079257758","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.84177923,0.0016838001,0.098489426,0.0018575278,0.00009833522,0.002204168,0.00019562527,0.00033278883,0.053359073],"genre_scores_gemma":[0.9666618,0.00011850879,0.03287818,0.000011952137,0.000020241923,0.00017055638,0.00006454649,0.000018027007,0.000056203742],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99868286,0.00015402857,0.0006277678,0.00010797249,0.00016530097,0.00026209882],"domain_scores_gemma":[0.9965637,0.0017407216,0.00018469554,0.0013888812,0.000054181117,0.00006784809],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005295517,0.00012782589,0.0003371038,0.000063409316,0.0000715566,0.0000088582565,0.00049323717,0.00006944502,0.00007251775],"category_scores_gemma":[0.00047343952,0.0001182541,0.00008710273,0.0007764637,0.00018316791,0.00015353318,0.0002460153,0.00024381105,0.000031804],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000064704595,0.0018211387,0.0013752598,0.00007398174,0.000009476601,7.5183834e-8,0.000923017,0.000007501665,0.0002102137,0.99398106,0.00017106738,0.0014207113],"study_design_scores_gemma":[0.0006828543,0.000010793765,0.006642742,0.00015945703,0.000047891368,0.0000018357538,0.00050109415,0.0075587914,0.000449802,0.98261887,0.001120817,0.00020506144],"about_ca_topic_score_codex":0.000019743116,"about_ca_topic_score_gemma":0.000011593947,"teacher_disagreement_score":0.12488253,"about_ca_system_score_codex":0.00008188014,"about_ca_system_score_gemma":0.000023156745,"threshold_uncertainty_score":0.48222622},"labels":[],"label_agreement":null},{"id":"W2080868109","doi":"10.1007/s00220-009-0802-8","title":"A Noncommutative de Finetti Theorem: Invariance under Quantum Permutations is Equivalent to Freeness with Amalgamation","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":82,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Queen's University","funders":"","keywords":"Noncommutative geometry; Mathematics; Quantum; Pure mathematics; Mathematical physics; Physics; Quantum mechanics","score_opus":0.10380323070295977,"score_gpt":0.40170406817032167,"score_spread":0.2979008374673619,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2080868109","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.050339185,0.00006405779,0.91823804,0.013531227,0.000009264195,0.0011776155,0.00003350233,0.00014160118,0.016465502],"genre_scores_gemma":[0.7932365,0.000033468994,0.20520128,0.00088836945,0.000031778556,0.0004058143,0.000024590841,0.000032161337,0.00014606117],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998228,0.00022303064,0.0005972871,0.00028098773,0.00031411526,0.00035657364],"domain_scores_gemma":[0.99576825,0.0015465498,0.00022788566,0.0021074847,0.00021421602,0.00013558495],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00057114894,0.00025801067,0.00041240716,0.00011287474,0.00031970136,0.00011013918,0.0011538424,0.000086938846,0.00007018479],"category_scores_gemma":[0.00026705157,0.00022184568,0.00009319719,0.0010648138,0.00018634612,0.00023757824,0.0001799165,0.000365823,0.00013450268],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000019392883,0.00094231823,0.000033760367,0.000053997956,0.000025254763,6.6340294e-7,0.005282649,0.00083899393,0.00027901254,0.99047315,0.0006261144,0.001424677],"study_design_scores_gemma":[0.0007059881,0.00008776053,0.0011355131,0.00024266863,0.000070658505,0.000007634917,0.0010840672,0.044256862,0.00027589677,0.95171684,0.00014224797,0.00027387866],"about_ca_topic_score_codex":0.000014134289,"about_ca_topic_score_gemma":0.000024529112,"teacher_disagreement_score":0.7428973,"about_ca_system_score_codex":0.00018833403,"about_ca_system_score_gemma":0.000114485854,"threshold_uncertainty_score":0.90466046},"labels":[],"label_agreement":null},{"id":"W2081805123","doi":"10.1007/s00220-008-0610-6","title":"Central Limit Theorem for Locally Interacting Fermi Gas","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Cold Atom Physics and Bose-Einstein Condensates","field":"Physics and Astronomy","cited_by":20,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Observable; Fermi Gamma-ray Space Telescope; Fermi gas; Physics; Central limit theorem; Quantum no-deleting theorem; Limit (mathematics); Quantum; Quantum mechanics; Dissipation; Nonlinear system; Quantum limit; Reciprocity (cultural anthropology); Mathematics; Quantum dynamics; Mathematical analysis; Quantum process","score_opus":0.06741771680458566,"score_gpt":0.3179506570800781,"score_spread":0.25053294027549244,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2081805123","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5413873,0.00015601948,0.34715196,0.0021491605,0.00021412417,0.001769356,0.00008655568,0.00017508894,0.10691039],"genre_scores_gemma":[0.9847236,0.00001341488,0.0145755485,0.00005925252,0.00019020801,0.00016829207,0.00006203611,0.000032363114,0.00017523812],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99884176,0.0000626269,0.00040947832,0.00020634844,0.00013141487,0.00034834107],"domain_scores_gemma":[0.99728787,0.001234251,0.00013566938,0.0011613216,0.00010427603,0.000076631986],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00014782767,0.00019001299,0.00029781315,0.000031328527,0.0003118142,0.000054459386,0.0007989037,0.000035299137,0.00007903877],"category_scores_gemma":[0.00004765832,0.0001797067,0.00018613675,0.00021957478,0.00022411546,0.00018929638,0.0003331522,0.00030382242,0.000051028874],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000090731455,0.0007968754,0.0023892336,0.00002908004,0.000044460197,4.870408e-7,0.0013779474,0.00011570498,0.00040463242,0.9713385,0.00024985135,0.023244148],"study_design_scores_gemma":[0.0005847606,0.00003141175,0.00028779192,0.00017177135,0.000028774772,0.0000017849641,0.00061670895,0.083082125,0.0022114678,0.9108689,0.001813046,0.00030144482],"about_ca_topic_score_codex":0.000015721142,"about_ca_topic_score_gemma":0.0000039364727,"teacher_disagreement_score":0.4433363,"about_ca_system_score_codex":0.000047516103,"about_ca_system_score_gemma":0.000075226395,"threshold_uncertainty_score":0.7328226},"labels":[],"label_agreement":null},{"id":"W2082353165","doi":"10.1007/s00220-007-0370-8","title":"Tensor Invariants of the Poisson Brackets of Hydrodynamic Type","year":2007,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Computational Fluid Dynamics and Aerodynamics","field":"Engineering","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Queen's University","funders":"","keywords":"Tensor field; Lie derivative; Poisson bracket; Poisson manifold; Lie algebra; Mathematics; Symmetric tensor; Invariant (physics); Mathematical physics; Tensor (intrinsic definition); Lie group; Manifold (fluid mechanics); Pure mathematics; Vector field; Scalar (mathematics); Poisson algebra; Poisson distribution; Rank (graph theory); Combinatorics; Mathematical analysis; Geometry; Exact solutions in general relativity; Lie conformal algebra; Symplectic geometry","score_opus":0.02170125328884976,"score_gpt":0.2736132483028036,"score_spread":0.25191199501395384,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2082353165","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9083262,0.00012068025,0.081637345,0.00011472264,0.00008423726,0.00020800329,0.000015388727,0.000035202986,0.009458214],"genre_scores_gemma":[0.9862665,0.000041140185,0.013625065,0.00001016966,0.0000075380726,0.0000022335464,0.000010206674,0.000016274085,0.00002089277],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9992808,0.000025802106,0.000390183,0.000057912795,0.00013719728,0.0001081139],"domain_scores_gemma":[0.998444,0.00048294396,0.00006345694,0.00090300763,0.00008668286,0.000019882487],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002677011,0.000079259065,0.00016648683,0.000039229268,0.000029771641,0.000004652841,0.0006427386,0.00004287292,0.000004977988],"category_scores_gemma":[0.00011627696,0.0000666727,0.000053853408,0.000489883,0.00013565365,0.000044629403,0.00018685365,0.00017368209,0.0000073347533],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000058296046,0.00042262877,0.0011025579,0.00022493885,0.00004184084,3.1356075e-7,0.00065113825,0.09013752,0.009102624,0.89323354,0.000032287757,0.005044804],"study_design_scores_gemma":[0.00008934045,0.000005983691,0.010613902,0.00008513293,0.000008414721,0.0000010019559,0.000029376406,0.7959129,0.00024049249,0.1929415,0.00001305794,0.000058879086],"about_ca_topic_score_codex":0.000003955148,"about_ca_topic_score_gemma":0.000028465049,"teacher_disagreement_score":0.7057754,"about_ca_system_score_codex":0.000045349334,"about_ca_system_score_gemma":0.000018600344,"threshold_uncertainty_score":0.27188337},"labels":[],"label_agreement":null},{"id":"W2083067403","doi":"10.1007/s00220-014-1926-z","title":"Generalized Kähler Geometry","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Homotopy and Cohomology in Algebraic Topology","field":"Mathematics","cited_by":100,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Symplectic geometry; Holomorphic function; Complex geometry; Geometry; Mathematics; Context (archaeology); Pure mathematics; Metric (unit); Hermitian manifold; Riemannian geometry; Scalar curvature","score_opus":0.0824091993370168,"score_gpt":0.3700309750110815,"score_spread":0.2876217756740647,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2083067403","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.3613487,0.00025813925,0.40664557,0.0055993097,0.00027019164,0.0009233603,0.000009634164,0.00052510377,0.22442003],"genre_scores_gemma":[0.78846645,0.0000392444,0.21010204,0.00045342118,0.00009314058,0.00014233589,0.000013038786,0.000036803136,0.000653557],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99820644,0.00050970924,0.0005564719,0.00022588976,0.00016968092,0.00033183306],"domain_scores_gemma":[0.99469846,0.002287452,0.00013928195,0.0027340252,0.00006531246,0.00007547792],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0008588547,0.00019127683,0.0004610068,0.00008816775,0.00016345475,0.000023162056,0.0013190886,0.00018285085,0.00029414598],"category_scores_gemma":[0.0013131591,0.00017823657,0.00011370682,0.0004018863,0.0005635557,0.00008989223,0.00051944767,0.00049261545,0.00042704152],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000034121322,0.00052192743,0.0001989749,0.000049736904,0.000022324672,6.8655015e-7,0.00042469948,0.0000039650063,0.00007078581,0.99409926,0.00070285646,0.003901364],"study_design_scores_gemma":[0.00043351503,0.000027532178,0.00012439424,0.00004233268,0.00002918579,0.000010759995,0.00006366357,0.00795767,0.00021309756,0.98833627,0.0025722797,0.00018932438],"about_ca_topic_score_codex":0.0000040930536,"about_ca_topic_score_gemma":0.0000108791755,"teacher_disagreement_score":0.42711776,"about_ca_system_score_codex":0.000050968723,"about_ca_system_score_gemma":0.000028648807,"threshold_uncertainty_score":0.7268277},"labels":[],"label_agreement":null},{"id":"W2084331331","doi":"10.1007/s00220-014-2279-3","title":"Large Deviations and Gallavotti–Cohen Principle for Dissipative PDEs with Rough Noise","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Thermodynamics and Statistical Mechanics","field":"Physics and Astronomy","cited_by":31,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Agence Nationale de la Recherche","keywords":"Dissipative system; Rate function; Entropy production; Degenerate energy levels; Mathematics; Large deviations theory; Nonlinear system; Fluctuation theorem; Entropy (arrow of time); Dissipation; Topological entropy; Statistical physics; Mathematical analysis; Physics; Pure mathematics; Non-equilibrium thermodynamics; Quantum mechanics","score_opus":0.05475228442243264,"score_gpt":0.36012287164641693,"score_spread":0.3053705872239843,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2084331331","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.008727591,0.00004659187,0.98365843,0.00029852998,0.000009480624,0.00047281108,0.00019382563,0.000020918666,0.006571837],"genre_scores_gemma":[0.85822797,0.00000723747,0.14121377,0.00002660627,0.000025113162,0.00029170516,0.000103879865,0.00002181019,0.00008189046],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9992621,0.000048846094,0.0002278084,0.00015794419,0.00010288914,0.00020042378],"domain_scores_gemma":[0.99848235,0.00052078895,0.00008985,0.0006656575,0.00013879586,0.0001025537],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00017023031,0.00013257687,0.00021804309,0.000019856845,0.0001498962,0.00003765218,0.00029065282,0.000025539359,0.000010270055],"category_scores_gemma":[0.00008043809,0.00011094119,0.00003069465,0.0001510181,0.00011187757,0.00013264864,0.00020203616,0.00015249714,0.000008684479],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010094457,0.00039909626,0.00046452926,0.000018183084,0.000021953912,8.399778e-8,0.0009888065,0.000103733044,0.000013352427,0.9962647,0.000015022204,0.0017004559],"study_design_scores_gemma":[0.000539531,0.000042795527,0.00012515302,0.000043889704,0.000023642737,2.0562692e-7,0.00053246587,0.19012865,0.000021887601,0.8076208,0.0007952858,0.00012567063],"about_ca_topic_score_codex":0.0000032016494,"about_ca_topic_score_gemma":0.000009111972,"teacher_disagreement_score":0.8495004,"about_ca_system_score_codex":0.000037849724,"about_ca_system_score_gemma":0.000050890354,"threshold_uncertainty_score":0.45240504},"labels":[],"label_agreement":null},{"id":"W2084494412","doi":"10.1007/s00220-014-2242-3","title":"Ergodicity of the Spin-Boson Model for Arbitrary Coupling Strength","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":19,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Memorial University of Newfoundland","funders":"","keywords":"Ergodicity; Boson; Coupling (piping); Ergodic theory; Spin (aerodynamics); Physics; Quantum tunnelling; Matrix (chemical analysis); Interacting boson model; Quantum mechanics; Mathematics; Engineering; Materials science; Pure mathematics","score_opus":0.11941539738404766,"score_gpt":0.3850580510214371,"score_spread":0.2656426536373894,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2084494412","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.15028872,0.00003856551,0.83105755,0.0007361785,0.00005651024,0.0013526578,0.000035824934,0.00013115886,0.016302843],"genre_scores_gemma":[0.7464862,0.000010011954,0.25308695,0.00007009379,0.000052971693,0.00016231881,0.0000056391673,0.000056327768,0.00006945702],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99778736,0.00016442359,0.0009987945,0.00027269474,0.00040108003,0.00037566017],"domain_scores_gemma":[0.989353,0.0063546267,0.00042644364,0.0036216718,0.00016777823,0.000076507684],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0012941179,0.00029395244,0.00067784794,0.000048056263,0.00022819125,0.000031221924,0.0022749035,0.00013732594,0.0000147753435],"category_scores_gemma":[0.002877691,0.00022531774,0.00034370224,0.0004577927,0.00069271406,0.00014705221,0.0005910251,0.00056422496,0.000015455087],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010450156,0.0011314062,0.00004157326,0.0005220428,0.000028381266,2.6680574e-8,0.00072588626,0.0013014372,0.0006449084,0.9950236,0.0001049391,0.00046532994],"study_design_scores_gemma":[0.00023167873,0.000016437856,0.000012575934,0.00022689317,0.00004670696,4.297574e-7,0.00005137469,0.47181106,0.0020491094,0.52541673,0.000011626216,0.00012537306],"about_ca_topic_score_codex":0.000001828648,"about_ca_topic_score_gemma":0.000006690088,"teacher_disagreement_score":0.5961975,"about_ca_system_score_codex":0.00009679192,"about_ca_system_score_gemma":0.00007240006,"threshold_uncertainty_score":0.91881907},"labels":[],"label_agreement":null},{"id":"W2085310017","doi":"10.1007/s00220-008-0468-7","title":"Calorons, Nahm’s Equations on S 1 and Bundles over $${\\mathbb{P}^{1} \\times \\mathbb{P}^{1}}$$","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic Geometry and Number Theory","field":"Mathematics","cited_by":14,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Moduli space; Holomorphic function; Rank (graph theory); Combinatorics; Flag (linear algebra); Space (punctuation); Physics; Vector bundle; Moduli; Mathematics; Mathematical physics; Pure mathematics; Algebra over a field; Quantum mechanics","score_opus":0.11146389553740901,"score_gpt":0.3525662283138444,"score_spread":0.24110233277643536,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2085310017","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.71807283,0.0013226521,0.13278915,0.0031966793,0.00018068857,0.0018797003,0.000085913125,0.00073966733,0.14173271],"genre_scores_gemma":[0.9635666,0.00027799472,0.03462756,0.00024569107,0.000068076704,0.00016250266,0.000025821555,0.00006202832,0.0009637239],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9978238,0.0003281431,0.0007102235,0.00034842634,0.00039381554,0.00039564035],"domain_scores_gemma":[0.99084324,0.006232756,0.00020370586,0.0024858057,0.00008886772,0.00014564068],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00068653084,0.00033818535,0.00054911827,0.00015239244,0.00057063,0.000047028538,0.00094726495,0.00016896543,0.00022757614],"category_scores_gemma":[0.0016365733,0.0003151575,0.00013476855,0.0005590555,0.0008897195,0.0002859169,0.00056206563,0.00061241654,0.0003328625],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000012139394,0.00123879,0.00028449687,0.00010464127,0.00004300796,0.0000037065897,0.0022114431,0.000013613032,0.000045835513,0.9938808,0.0010511993,0.0011102966],"study_design_scores_gemma":[0.00052110775,0.000053708212,0.0006806633,0.00017870274,0.00004756526,0.000024054452,0.0004721969,0.006079016,0.0001818074,0.990864,0.0005528429,0.00034438027],"about_ca_topic_score_codex":0.000009816903,"about_ca_topic_score_gemma":0.000007725359,"teacher_disagreement_score":0.24549375,"about_ca_system_score_codex":0.000103927596,"about_ca_system_score_gemma":0.000070352435,"threshold_uncertainty_score":0.99993},"labels":[],"label_agreement":null},{"id":"W2087207070","doi":"10.1007/s00220-014-2200-0","title":"String Theory on Elliptic Curve Orientifolds and KR-Theory","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"","keywords":"String theory; Mathematics; String (physics); Theoretical physics; Physics; Mathematical physics","score_opus":0.020305264295656534,"score_gpt":0.2834888810547468,"score_spread":0.26318361675909024,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2087207070","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.16336188,0.000084925945,0.6243908,0.0003190392,0.00007013551,0.00042625362,0.00002245718,0.00008501729,0.2112395],"genre_scores_gemma":[0.9959647,0.0000088768165,0.003527063,0.00008492296,0.00011453801,0.000046846028,0.000024862346,0.000033566877,0.00019462388],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9986182,0.0004045584,0.00032042654,0.00024050653,0.00015051081,0.00026578517],"domain_scores_gemma":[0.9961544,0.0020553654,0.00008963265,0.0015594081,0.00004641605,0.0000947223],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0007989372,0.00020009512,0.00029277196,0.000036632016,0.00018896,0.00007055401,0.0006034399,0.0000477672,0.00010305278],"category_scores_gemma":[0.00007464986,0.00018000942,0.00008775824,0.00022569142,0.00051328173,0.00010890712,0.0003913723,0.0004278191,0.00021478448],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009195166,0.0004971591,0.00030497232,0.00002654428,0.000024980558,6.908278e-8,0.00038418654,0.000028743361,0.000015658938,0.9714593,0.000018787654,0.027230352],"study_design_scores_gemma":[0.00030634247,0.000033657536,0.00016552016,0.00012256803,0.00003395228,1.918483e-7,0.00028568873,0.0053078225,0.00027831882,0.99293023,0.00033863826,0.00019708335],"about_ca_topic_score_codex":0.0000018686474,"about_ca_topic_score_gemma":2.1063099e-7,"teacher_disagreement_score":0.8326028,"about_ca_system_score_codex":0.000021312306,"about_ca_system_score_gemma":0.000014748234,"threshold_uncertainty_score":0.7340571},"labels":[],"label_agreement":null},{"id":"W2087209764","doi":"10.1007/s00220-008-0619-x","title":"Massless Sine-Gordon and Massive Thirring Models: Proof of Coleman’s Equivalence","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":42,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Thirring model; Massless particle; Equivalence (formal languages); Sine; Conjecture; Mathematical physics; Mathematics; sine-Gordon equation; Physics; Pure mathematics; Quantum mechanics; Geometry; Fermion","score_opus":0.06359074438755846,"score_gpt":0.29939318031893736,"score_spread":0.2358024359313789,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2087209764","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.290256,0.00024430474,0.5733166,0.00054087816,0.00002600932,0.00070189644,0.000052085656,0.000043372576,0.1348189],"genre_scores_gemma":[0.9868599,0.00003488306,0.012909239,0.000017132246,0.000034787896,0.00006081268,0.000014648572,0.000022436021,0.000046163565],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99893284,0.00008414296,0.00040427496,0.00018691656,0.00017639507,0.00021543482],"domain_scores_gemma":[0.99817574,0.00039896072,0.00014782,0.0011052227,0.00010450948,0.000067765184],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00015349343,0.00016416034,0.00035003226,0.00003076978,0.00014015578,0.000016203605,0.00059398223,0.0000418164,0.000025108098],"category_scores_gemma":[0.000015478918,0.00015455067,0.000079034544,0.00024984975,0.00081730937,0.00021134193,0.0005634497,0.00030268828,0.000009174368],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000047086264,0.0005573007,0.00071858073,0.000079762816,0.000021216849,3.5138677e-7,0.0009295836,0.0006344257,0.000058077934,0.99482024,0.000016344939,0.0021594344],"study_design_scores_gemma":[0.00025619927,0.000020389316,0.000108012064,0.0001646762,0.000020911399,7.237337e-7,0.00038060776,0.07668775,0.0011739815,0.9210263,0.000013289452,0.00014717641],"about_ca_topic_score_codex":0.000013979676,"about_ca_topic_score_gemma":5.084574e-7,"teacher_disagreement_score":0.6966039,"about_ca_system_score_codex":0.000020131936,"about_ca_system_score_gemma":0.00004054037,"threshold_uncertainty_score":0.6302393},"labels":[],"label_agreement":null},{"id":"W2088380268","doi":"10.1007/s00220-003-0934-1","title":"Differential Systems for Biorthogonal Polynomials Appearing in 2-Matrix Models and the Associated Riemann?Hilbert Problem","year":2003,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical functions and polynomials","field":"Mathematics","cited_by":87,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Concordia University","funders":"","keywords":"Biorthogonal system; Mathematics; Polynomial; Polynomial matrix; Riemann–Hilbert problem; Mathematical analysis; Matrix (chemical analysis); Hermitian matrix; Recursion (computer science); Differential equation; Matrix polynomial; Pure mathematics; Boundary value problem","score_opus":0.10258725008692185,"score_gpt":0.3509539420059499,"score_spread":0.24836669191902808,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2088380268","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.12862594,0.0023080222,0.8014955,0.0026099507,0.00030061827,0.011246113,0.00014730493,0.0002960971,0.052970458],"genre_scores_gemma":[0.96079326,0.00017554617,0.036810543,0.000033750366,0.00004559859,0.001408806,0.000019221288,0.00006207775,0.0006511985],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99713266,0.0007001424,0.0011983518,0.00028669956,0.00025228818,0.0004298739],"domain_scores_gemma":[0.9897873,0.008311582,0.00031042314,0.0014021101,0.00010476859,0.00008384413],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.002260976,0.00029221099,0.0008607815,0.00010623003,0.00030194919,0.00016176768,0.00065300544,0.00017736171,0.00003449785],"category_scores_gemma":[0.0020330155,0.00021182833,0.0001771806,0.0003973274,0.0004403364,0.000186038,0.00027078672,0.00042244076,0.000015256211],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000027285152,0.000703505,0.0000435364,0.00034611725,0.000054507116,1.9553069e-7,0.0009800995,0.00020726913,0.000037764734,0.99723655,0.00022901772,0.00013416838],"study_design_scores_gemma":[0.0018509291,0.000017654529,0.0000096470785,0.00034391804,0.000076931705,0.0000045721927,0.0002835066,0.1573652,0.000026533891,0.8396289,0.00018413384,0.00020812168],"about_ca_topic_score_codex":0.0000313127,"about_ca_topic_score_gemma":0.000038330647,"teacher_disagreement_score":0.8321673,"about_ca_system_score_codex":0.00010632323,"about_ca_system_score_gemma":0.00006626619,"threshold_uncertainty_score":0.8638109},"labels":[],"label_agreement":null},{"id":"W2088626733","doi":"10.1007/s00220-004-1198-0","title":"Profiles and Quantization of the Blow Up Mass for Critical Nonlinear Schr�dinger Equation","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":212,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Canadian Nautical Research Society","funders":"","keywords":"Mathematics; Nonlinear system; Quantization (signal processing); Nonlinear Schrödinger equation; Limit (mathematics); Schrödinger equation; Mathematical analysis; Critical point (mathematics); Critical mass (sociodynamics); Space (punctuation); Mathematical physics; Physics; Quantum mechanics","score_opus":0.1586484783295992,"score_gpt":0.4104510424692961,"score_spread":0.2518025641396969,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2088626733","genre_codex":"methods","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":"methods","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.015802797,0.00008208671,0.97911507,0.0021968472,0.00006041556,0.0014233396,0.00003130205,0.00006825654,0.001219865],"genre_scores_gemma":[0.46152622,0.000019996703,0.5381025,0.000035691723,0.000028733648,0.00021418302,0.000009610951,0.00003809466,0.00002500314],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9983071,0.00010897807,0.00077254535,0.00023740972,0.00031176428,0.00026220529],"domain_scores_gemma":[0.99412304,0.0036836108,0.00026763842,0.0015808615,0.0002879456,0.000056873563],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006014928,0.00021032999,0.00042806487,0.000050212664,0.00021617165,0.000037410005,0.0007489504,0.00011115475,0.000009674631],"category_scores_gemma":[0.0043672477,0.00016539538,0.00012606548,0.00042944384,0.00074935006,0.0002748751,0.00034691184,0.00030574526,0.000008576647],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000072790517,0.0005937068,0.00002253253,0.00080913043,0.0000152843,4.698576e-8,0.00076969626,0.00014971662,0.0031163797,0.9937821,0.000017664619,0.00071643485],"study_design_scores_gemma":[0.0005748818,0.00003388426,0.000013361442,0.0005369793,0.00006492739,0.0000013994559,0.00020353317,0.04793964,0.010380137,0.9400629,0.00002166549,0.00016671387],"about_ca_topic_score_codex":0.000001628519,"about_ca_topic_score_gemma":0.000002413797,"teacher_disagreement_score":0.4457234,"about_ca_system_score_codex":0.00008481641,"about_ca_system_score_gemma":0.000078120225,"threshold_uncertainty_score":0.6744628},"labels":[],"label_agreement":null},{"id":"W2089165964","doi":"10.1007/s00220-006-0120-3","title":"Absolutely Continuous Spectrum for the Anderson Model on a Tree: A Geometric Proof of Klein’s Theorem","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":91,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Mathematics; Absolute continuity; Spectrum (functional analysis); Analytic proof; Elementary proof; Bethe lattice; Continuous spectrum; Lattice (music); Pure mathematics; Mathematical physics; Mathematical proof; Quantum mechanics; Physics; Geometry","score_opus":0.10157035531159427,"score_gpt":0.35452240424668796,"score_spread":0.2529520489350937,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2089165964","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.014093991,0.00021598795,0.9267929,0.0019379717,0.000042026466,0.0028298774,0.00005659225,0.00014468862,0.05388594],"genre_scores_gemma":[0.8943256,0.000020847781,0.10447065,0.000070248214,0.000092758964,0.00055391376,0.000012399838,0.00009047548,0.0003631011],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99740285,0.0001821189,0.0010693556,0.00032958743,0.00050708296,0.00050898624],"domain_scores_gemma":[0.98339194,0.012733819,0.00047436796,0.0031884213,0.00015349442,0.00005792789],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0013551839,0.00037506278,0.0008095256,0.0001622111,0.00023814017,0.0000568765,0.0019674965,0.00013937807,0.000025807725],"category_scores_gemma":[0.0013659514,0.00026954716,0.00037351451,0.0010434794,0.0007683524,0.00013445779,0.00030417746,0.00052206725,0.000023585535],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000051174757,0.0026479722,0.000008757466,0.00029895283,0.000056393776,3.4383305e-7,0.00046180215,0.0012443722,0.00016565433,0.99227124,0.00072482025,0.0020684928],"study_design_scores_gemma":[0.00060708856,0.00010587894,0.00002242009,0.00017864462,0.00010555671,0.0000020131884,0.00017782123,0.21887645,0.0027936338,0.77687263,0.000033615714,0.00022421981],"about_ca_topic_score_codex":0.000008073189,"about_ca_topic_score_gemma":0.000026493342,"teacher_disagreement_score":0.8802316,"about_ca_system_score_codex":0.00015619025,"about_ca_system_score_gemma":0.00006637122,"threshold_uncertainty_score":0.9999757},"labels":[],"label_agreement":null},{"id":"W2089342991","doi":"10.1007/s00220-014-2059-0","title":"A Generalization of Schur–Weyl Duality with Applications in Quantum Estimation","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":20,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute; University of Waterloo","funders":"","keywords":"Generalization; Duality (order theory); Observable; Quantum entanglement; Quantum; Representation (politics); Set (abstract data type); Commutative property; Quantum state","score_opus":0.030455523783098962,"score_gpt":0.30303713483921,"score_spread":0.27258161105611106,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2089342991","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.014828321,0.00002277608,0.97940814,0.00041086334,0.000007794968,0.0003369249,0.0000018304955,0.000065694876,0.004917634],"genre_scores_gemma":[0.74146056,0.000015533147,0.25828767,0.000059172893,0.000004039094,0.00013798293,0.000026671662,0.0000056793538,0.0000027237031],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9987666,0.00016817797,0.0005495735,0.00014624222,0.00022785673,0.00014153612],"domain_scores_gemma":[0.9974337,0.00035038014,0.00022126928,0.0018301448,0.00012423843,0.0000402159],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005449997,0.000112460795,0.00021612657,0.0001673153,0.00008551034,0.000052536503,0.0011653852,0.000049580438,0.0000037319378],"category_scores_gemma":[0.00008294349,0.000099187026,0.00004137107,0.0014480851,0.00018367823,0.0005561699,0.00021189335,0.00015759926,0.000020835738],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000001286738,0.00032640714,0.0008061145,0.0000639478,0.0000032616013,1.9913607e-8,0.00095495826,0.0032716047,0.000035964742,0.98934126,0.000009564506,0.0051856255],"study_design_scores_gemma":[0.00017706616,0.000016152975,0.0016503754,0.00005030257,0.0000027740027,5.2901646e-7,0.00005830469,0.5886429,0.00014559427,0.40906388,0.00011707979,0.00007504357],"about_ca_topic_score_codex":0.000011182772,"about_ca_topic_score_gemma":0.000015098927,"teacher_disagreement_score":0.72663224,"about_ca_system_score_codex":0.000032831158,"about_ca_system_score_gemma":0.000040850813,"threshold_uncertainty_score":0.40447295},"labels":[],"label_agreement":null},{"id":"W2090255035","doi":"10.1007/s00220-009-0961-7","title":"The Dependence on the Monodromy Data of the Isomonodromic Tau Function","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":48,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Concordia University","funders":"","keywords":"Monodromy; Ramanujan tau function; Generalization; Vector bundle; Space (punctuation); Logarithm; Function (biology); Divisor (algebraic geometry); Meromorphic function","score_opus":0.0861447236881507,"score_gpt":0.34161465362260396,"score_spread":0.2554699299344533,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2090255035","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.4311969,0.00085762766,0.12535346,0.086579315,0.0005763333,0.0045143934,0.00051839516,0.00013506587,0.3502685],"genre_scores_gemma":[0.9984583,0.000021803276,0.001124383,0.000117009644,0.000065823166,0.00001618345,0.000020160336,0.000007701737,0.00016860539],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991455,0.000167315,0.00027514843,0.00012022387,0.00015125304,0.00014055335],"domain_scores_gemma":[0.9940897,0.0012320902,0.00012985768,0.004494508,0.000034797213,0.000019015955],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00038960172,0.00009607757,0.00012056689,0.000007810779,0.00042598078,0.0000479153,0.0027157913,0.00002164133,0.00002023051],"category_scores_gemma":[0.00006716834,0.0000471057,0.00007311822,0.0002163208,0.00026021423,0.000084417574,0.00053753506,0.0003599271,0.00004121368],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000031235438,0.00029963546,0.0001563004,0.000002472406,0.000015009037,1.21295e-8,0.00015249714,0.0000560598,0.00009504248,0.9883803,0.00050996523,0.010329573],"study_design_scores_gemma":[0.00010179774,0.000018740522,0.001976504,0.00006546528,0.000024610863,1.9095066e-7,0.00046024972,0.03540783,0.00023631017,0.9601472,0.0014915216,0.00006956623],"about_ca_topic_score_codex":0.000014650014,"about_ca_topic_score_gemma":0.0000065306053,"teacher_disagreement_score":0.56726146,"about_ca_system_score_codex":0.000014365371,"about_ca_system_score_gemma":0.000050603747,"threshold_uncertainty_score":0.50466615},"labels":[],"label_agreement":null},{"id":"W2090365946","doi":"10.1007/s00220-015-2327-7","title":"Universality Conjecture and Results for a Model of Several Coupled Positive-Definite Matrices","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":34,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Concordia University","funders":"Natural Sciences and Engineering Research Council of Canada; Concordia University","keywords":"Determinantal point process; Mathematics; Biorthogonal system; Universality (dynamical systems); Cauchy distribution; Pure mathematics; Laguerre polynomials; Parametrix; Conjecture; Random matrix; Orthogonal polynomials; Method of steepest descent; Positive-definite matrix; Eigenvalues and eigenvectors; Mathematical analysis; Operator theory","score_opus":0.16687169452111755,"score_gpt":0.37803667199198543,"score_spread":0.21116497747086788,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2090365946","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.1086163,0.0003284209,0.8685916,0.002904812,0.0000175074,0.0019663183,0.0006814333,0.00011292926,0.016780691],"genre_scores_gemma":[0.67706674,0.00007719224,0.32257602,0.000025072644,0.000013024755,0.00008646423,0.000044079796,0.00001706653,0.000094328585],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99886906,0.00008059148,0.0005766875,0.00016780749,0.00015523742,0.00015059907],"domain_scores_gemma":[0.99584323,0.0025045811,0.00029268366,0.0010720268,0.00020969282,0.00007777613],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0007344193,0.0001366654,0.00037225607,0.000052295556,0.000090205365,0.000025129071,0.000488827,0.00008038212,9.252453e-7],"category_scores_gemma":[0.00062642293,0.00012331003,0.00007357557,0.00028495674,0.00023881483,0.00012038702,0.00022774182,0.00015652637,0.000002965171],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000081630504,0.00042457608,0.000012952484,0.00016005457,0.000023522463,8.1875775e-8,0.0020731168,0.0006734552,0.00005800748,0.9958275,0.000492864,0.00017222283],"study_design_scores_gemma":[0.0013794174,0.000022703789,0.000008597857,0.0000513301,0.00004860205,9.987018e-7,0.00026658704,0.38272095,0.00003247367,0.6153228,0.00006214917,0.000083400875],"about_ca_topic_score_codex":0.000017311064,"about_ca_topic_score_gemma":0.000011490477,"teacher_disagreement_score":0.56845045,"about_ca_system_score_codex":0.000046827932,"about_ca_system_score_gemma":0.000077492135,"threshold_uncertainty_score":0.50284374},"labels":[],"label_agreement":null},{"id":"W2091303721","doi":"10.1007/s00220-009-0888-z","title":"Extended Scaling Relations for Planar Lattice Models","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":30,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Scaling; Planar; Lattice (music); Complex system; Vertex (graph theory); Scaling law","score_opus":0.04848637323469948,"score_gpt":0.3242309038469616,"score_spread":0.2757445306122621,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2091303721","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0029288714,0.000034348388,0.90557593,0.0011581456,0.000015990083,0.00034573674,0.000036065598,0.000051156218,0.089853756],"genre_scores_gemma":[0.87477046,0.0000015565646,0.12468392,0.00012275692,0.000092758804,0.00007985419,0.000111429996,0.000013560109,0.00012371126],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990806,0.00005660472,0.00034997574,0.00017261796,0.00012973235,0.00021047442],"domain_scores_gemma":[0.9980498,0.00091508374,0.00008155128,0.00079044164,0.00010003225,0.000063099644],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00017038753,0.00013785747,0.00021255323,0.00003112709,0.00020921913,0.000045162302,0.0005609753,0.000035178673,0.00003067825],"category_scores_gemma":[0.000023852199,0.00013527382,0.00012121185,0.00025145087,0.00012889535,0.00021832898,0.00006420935,0.00022702829,0.00006894095],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000062270956,0.00064788887,0.000014459424,0.0000068727263,0.000014077318,4.5369546e-8,0.0003116528,0.0029906302,0.00003472392,0.981296,0.00009800998,0.0145794],"study_design_scores_gemma":[0.00023688203,0.000015030109,0.00011383709,0.00003720371,0.00002027954,1.4074844e-7,0.000105796804,0.2818335,0.000044250635,0.7173966,0.000083245046,0.00011322624],"about_ca_topic_score_codex":0.0000020093112,"about_ca_topic_score_gemma":1.2071284e-7,"teacher_disagreement_score":0.8718416,"about_ca_system_score_codex":0.000026970734,"about_ca_system_score_gemma":0.00003666383,"threshold_uncertainty_score":0.5516306},"labels":[],"label_agreement":null},{"id":"W2091543813","doi":"10.1007/s00220-007-0214-6","title":"Interior Regularity Criteria for Suitable Weak Solutions of the Navier-Stokes Equations","year":2007,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Navier-Stokes equation solutions","field":"Mathematics","cited_by":88,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Vorticity; Weak solution; Complex system; Point (geometry); Interior point method","score_opus":0.2575185345887354,"score_gpt":0.4421069627363529,"score_spread":0.1845884281476175,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2091543813","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0063669328,0.00018640104,0.9768157,0.0021972565,0.00016328448,0.0016010276,0.00014158792,0.000099364916,0.012428442],"genre_scores_gemma":[0.75925577,0.0000139348485,0.23952474,0.00005748943,0.000059624457,0.0003402363,0.000036258356,0.000045398665,0.00066658214],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.997262,0.00032336105,0.001294937,0.00024269991,0.00037649248,0.0005004876],"domain_scores_gemma":[0.988976,0.0066330708,0.00047027823,0.0033292775,0.00050551834,0.00008586397],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0031110498,0.0002306925,0.00047550595,0.00012692211,0.00066979567,0.000046608297,0.0017813067,0.00016753782,0.00006634407],"category_scores_gemma":[0.0051774518,0.0002015187,0.00032134258,0.001033515,0.00079365936,0.00029429927,0.00082580454,0.00047992595,0.00002896475],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008328917,0.00078106095,0.000067582965,0.00017327948,0.000033755055,5.421083e-8,0.0014210854,0.000011914814,0.002625094,0.99244493,0.0011256905,0.0013072292],"study_design_scores_gemma":[0.0004922605,0.000026359414,0.0003555113,0.00032380538,0.00011719062,0.0000025093264,0.0009915266,0.017964851,0.0013403246,0.9763071,0.0018609207,0.0002176634],"about_ca_topic_score_codex":0.000014854127,"about_ca_topic_score_gemma":0.00019557873,"teacher_disagreement_score":0.7528888,"about_ca_system_score_codex":0.00025815752,"about_ca_system_score_gemma":0.0001551296,"threshold_uncertainty_score":0.8217694},"labels":[],"label_agreement":null},{"id":"W2092841291","doi":"10.1007/s00220-008-0442-4","title":"Gaussian Quantum Marginal Problem","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":45,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Calgary","funders":"","keywords":"Quantum entanglement; Gaussian; Quantum state; Symplectic geometry; Eigenvalues and eigenvectors; Quantum; Diagonal; Entropy (arrow of time)","score_opus":0.05869886265893376,"score_gpt":0.29584172383194857,"score_spread":0.2371428611730148,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2092841291","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0030975337,0.0000783352,0.8979235,0.0026299146,0.000029399975,0.00022267304,0.000001439522,0.00020096064,0.09581623],"genre_scores_gemma":[0.72040564,0.00011373618,0.27900824,0.0003215154,0.000012684841,0.000071834016,0.000006794073,0.000007873539,0.000051668605],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99890786,0.000088242334,0.00040150434,0.00014041153,0.00023772552,0.0002242685],"domain_scores_gemma":[0.9974274,0.00019039889,0.00010100749,0.0021379297,0.00006696696,0.00007629796],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00024306614,0.00012144154,0.00017519017,0.00010305543,0.00025665516,0.00006375133,0.0022761002,0.000067095876,0.000020756072],"category_scores_gemma":[0.000031519005,0.00011180417,0.00008230323,0.0008790195,0.0002734694,0.00065473776,0.00052427215,0.00039075027,0.0003896801],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[7.033869e-7,0.00026304423,0.00015790646,0.000020128955,0.000004236765,0.0000011019287,0.0015250912,0.000017147466,0.000009958678,0.9945377,0.0005679455,0.0028950109],"study_design_scores_gemma":[0.0001951962,0.000019149076,0.0008172884,0.000041836924,0.0000020447926,0.000023548264,0.00007056291,0.22103731,0.00004696308,0.77405757,0.0035387601,0.00014976945],"about_ca_topic_score_codex":0.0000027315073,"about_ca_topic_score_gemma":9.348707e-7,"teacher_disagreement_score":0.7173081,"about_ca_system_score_codex":0.00003058558,"about_ca_system_score_gemma":0.00005956551,"threshold_uncertainty_score":0.5008679},"labels":[],"label_agreement":null},{"id":"W2093497785","doi":"10.1007/s00220-008-0509-2","title":"Forced Vibrations via Nash-Moser Iteration","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McMaster University","funders":"","keywords":"Forcing (mathematics); Construct (python library); Nonlinear system; Mathematics; Term (time); Mathematical analysis; Complex system; Vibration; Applied mathematics; Physics; Computer science; Quantum mechanics","score_opus":0.04602249686990776,"score_gpt":0.2995508977576351,"score_spread":0.2535284008877273,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2093497785","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.08031937,0.0000381154,0.85867876,0.00056714786,0.00005061735,0.00044395128,0.000018856585,0.00007183541,0.05981133],"genre_scores_gemma":[0.98553956,0.0000056776066,0.013662023,0.000048528327,0.00010641266,0.00015303775,0.000130078,0.00001954341,0.00033512153],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99897134,0.00010172836,0.00042894587,0.00015555709,0.00015152087,0.00019091014],"domain_scores_gemma":[0.99831957,0.0002943576,0.00009900432,0.0011518965,0.00007032123,0.000064831474],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00012497207,0.00013797899,0.00022710954,0.000034790486,0.0003132358,0.00003744313,0.00047606777,0.0000438443,0.00015563605],"category_scores_gemma":[0.000016360582,0.00012786305,0.00009916017,0.0003084357,0.00017345074,0.0002464082,0.00016421541,0.00023991271,0.00030565241],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000019017297,0.0005179355,0.002232605,0.000014491465,0.000016631016,2.907832e-7,0.00091209594,0.0002468444,0.0007066051,0.9934831,0.00018572199,0.0016817572],"study_design_scores_gemma":[0.00030991618,0.000015829462,0.00067208847,0.000050296356,0.000010432118,0.00000203084,0.00012563195,0.35653397,0.00022542232,0.64132476,0.0005384395,0.00019118565],"about_ca_topic_score_codex":0.000035240995,"about_ca_topic_score_gemma":0.000005046663,"teacher_disagreement_score":0.9052202,"about_ca_system_score_codex":0.000033399745,"about_ca_system_score_gemma":0.000032488984,"threshold_uncertainty_score":0.5214104},"labels":[],"label_agreement":null},{"id":"W2094868561","doi":"10.1007/s00220-015-2321-0","title":"Landauer–Büttiker and Thouless Conductance","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Thermal properties of materials","field":"Materials Science","cited_by":9,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Natural Sciences and Engineering Research Council of Canada; Israel Science Foundation; Hebrew University of Jerusalem; United States-Israel Binational Science Foundation; Agence Nationale de la Recherche; McGill University","keywords":"Scaling; Bounded function; Conductance; Quantum; Coupling (piping); Scattering; Basis (linear algebra); Upper and lower bounds; Unit (ring theory)","score_opus":0.17713376546909232,"score_gpt":0.34786976795100466,"score_spread":0.17073600248191234,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2094868561","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.98034364,0.0005528607,0.0015601646,0.0011237977,0.000083811865,0.00024120518,0.000013867658,0.00009364115,0.015986985],"genre_scores_gemma":[0.9675464,0.000033629258,0.032058127,0.0001287315,0.00003588234,0.000034583678,0.000004183997,0.000017281043,0.0001412022],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990631,0.00019211539,0.0002759863,0.0001466128,0.00015139216,0.00017080482],"domain_scores_gemma":[0.9983738,0.00021128847,0.000072282186,0.0011887451,0.00007334984,0.00008055476],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006939873,0.00010679808,0.00022771479,0.000015696927,0.000069965456,0.00008525407,0.0007389589,0.000046589223,0.000109318855],"category_scores_gemma":[0.00027083055,0.000087246575,0.000016811991,0.00007004186,0.00041136425,0.00025200535,0.00059296,0.00011197982,0.0007505542],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000049028866,0.00062486157,0.00039952618,0.00017381807,0.000009910585,0.000002730762,0.0050583817,0.000069159556,0.40336967,0.5863041,0.0011853027,0.0027534869],"study_design_scores_gemma":[0.0011840942,0.00005881534,0.00037466103,0.00028556085,0.00002612181,0.00001927886,0.0012658666,0.002515357,0.08837467,0.90078294,0.004591945,0.0005206971],"about_ca_topic_score_codex":0.000010853017,"about_ca_topic_score_gemma":0.0000027431959,"teacher_disagreement_score":0.314995,"about_ca_system_score_codex":0.000037866466,"about_ca_system_score_gemma":0.00003387941,"threshold_uncertainty_score":0.9647106},"labels":[],"label_agreement":null},{"id":"W2094981671","doi":"10.1007/s00220-004-1051-5","title":"On the Boltzmann Equation for Diffusively Excited Granular Media","year":2004,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Particle Dynamics in Fluid Flows","field":"Engineering","cited_by":129,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Victoria","funders":"","keywords":"Pointwise; Boltzmann equation; Bounded function; Uniqueness; Moment (physics); Distribution function; Physics; Hard spheres; Mathematical analysis; Distribution (mathematics); Mathematics; Statistical physics; Classical mechanics; Thermodynamics","score_opus":0.07185065301416287,"score_gpt":0.29263980359661534,"score_spread":0.22078915058245246,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2094981671","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.21241465,0.000097428965,0.7803392,0.0013683331,0.00007664018,0.00073276623,0.000025510315,0.00021034492,0.004735125],"genre_scores_gemma":[0.97636235,0.0000441021,0.022992464,0.00010042522,0.000027977158,0.00039558194,0.000037841917,0.00003437271,0.000004884323],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9992552,0.00004024139,0.0002780023,0.00009551302,0.00014491093,0.00018616766],"domain_scores_gemma":[0.99669355,0.0018516735,0.000028651904,0.0013449548,0.00004707076,0.000034096],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002781059,0.0001214776,0.00014626863,0.000037880673,0.00011785239,0.000031261894,0.0007543552,0.000054523232,0.0000064578426],"category_scores_gemma":[0.00057788065,0.00010068389,0.00006202328,0.0002837687,0.00015091914,0.00008051127,0.00008888802,0.00024423125,0.00010940785],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000002084986,0.00017219762,0.0000039171396,0.000025206824,0.000009006838,1.2880552e-7,0.00094782177,0.05136792,0.0006468329,0.94605833,0.00006699664,0.0006995293],"study_design_scores_gemma":[0.00020459789,0.0000057481266,0.00007786476,0.000042028078,0.0000068739264,2.1769577e-7,0.000042173735,0.47117522,0.00019474464,0.5281516,0.000034399774,0.000064587155],"about_ca_topic_score_codex":0.0000011083341,"about_ca_topic_score_gemma":0.0000052196915,"teacher_disagreement_score":0.7639477,"about_ca_system_score_codex":0.00013747087,"about_ca_system_score_gemma":0.000012444784,"threshold_uncertainty_score":0.41057697},"labels":[],"label_agreement":null},{"id":"W2095500546","doi":"10.1007/s00220-012-1627-4","title":"A Planar Calculus for Infinite Index Subfactors","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":16,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Index (typography); Calculus (dental); Planar; Mathematics; Pure mathematics; Computer science; Medicine","score_opus":0.20861049619640523,"score_gpt":0.4510773762268477,"score_spread":0.24246688003044245,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2095500546","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0626761,0.00032482078,0.91912585,0.00089322455,0.000089189285,0.0020775192,0.00006442086,0.00022904103,0.014519838],"genre_scores_gemma":[0.8341864,0.000023615763,0.1648885,0.000066155306,0.000083412466,0.0005052987,0.000024129447,0.000058854923,0.00016366287],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9983212,0.000162798,0.0005068458,0.00016099603,0.00028892775,0.00055925234],"domain_scores_gemma":[0.9934625,0.004037668,0.00010704648,0.002097907,0.00013076114,0.00016412046],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00079036306,0.00019936697,0.0003682995,0.00009222527,0.00019114057,0.000036939833,0.0010609016,0.000115341885,0.000043455664],"category_scores_gemma":[0.0018832446,0.00018333558,0.000110998575,0.0004678742,0.00027014612,0.000360728,0.00034725337,0.00046582133,0.00011896924],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010819275,0.00087198976,0.001635455,0.0001569497,0.000023782894,1.8485902e-7,0.0015364395,0.0000064452897,0.0001358549,0.99336475,0.0004269162,0.0018304151],"study_design_scores_gemma":[0.00048191674,0.000024710635,0.00027876557,0.000080578524,0.000019786483,0.000002564258,0.0004087455,0.009489127,0.00035871522,0.9869613,0.0016616064,0.00023215126],"about_ca_topic_score_codex":0.0000033727085,"about_ca_topic_score_gemma":0.000010947189,"teacher_disagreement_score":0.77151024,"about_ca_system_score_codex":0.00016146387,"about_ca_system_score_gemma":0.000055281816,"threshold_uncertainty_score":0.7476208},"labels":[],"label_agreement":null},{"id":"W2097304125","doi":"10.1007/s00220-013-1836-5","title":"On Optimal Separation of Eigenvalues for a Quasiperiodic Jacobi Matrix","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Quasiperiodic function; Eigenvalues and eigenvectors; Mathematics; Lyapunov exponent; Matrix (chemical analysis); Spectrum (functional analysis); Mathematical analysis; Jacobi method; Pure mathematics; Exponent; Mathematical physics; Jacobian matrix and determinant; Physics; Applied mathematics; Quantum mechanics; Chemistry","score_opus":0.10290470355440898,"score_gpt":0.43823250019364524,"score_spread":0.3353277966392363,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2097304125","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.41450417,0.00010173046,0.5542078,0.00092663936,0.00007432419,0.0043759723,0.000050188708,0.0002587367,0.025500476],"genre_scores_gemma":[0.68241316,0.000014011108,0.31636027,0.0000475872,0.000044371736,0.00087346626,0.000018145282,0.000060204486,0.00016880527],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9976885,0.00022484633,0.0010499916,0.0002862236,0.0003714777,0.0003789789],"domain_scores_gemma":[0.9898876,0.006940042,0.00036042585,0.0024676595,0.00025290682,0.00009134824],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00070917903,0.0003112509,0.0007040201,0.00010754673,0.00015284693,0.000062267914,0.0012520497,0.00014087866,0.0002039598],"category_scores_gemma":[0.0017827557,0.0002802476,0.00027112363,0.00045278427,0.0004945012,0.00028022574,0.00023643767,0.00034764392,0.00033393776],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000019777664,0.0017187286,0.000007988432,0.00040548254,0.000040113384,1.4660165e-7,0.0012876897,0.00015804349,0.0014858353,0.99335796,0.00064426305,0.0008739711],"study_design_scores_gemma":[0.0004905935,0.00016388086,0.000023257135,0.0002675018,0.000050986542,0.0000017141309,0.00033526923,0.055849016,0.002733804,0.93979704,0.000031169246,0.0002557572],"about_ca_topic_score_codex":0.0000047770122,"about_ca_topic_score_gemma":0.000001966922,"teacher_disagreement_score":0.267909,"about_ca_system_score_codex":0.00012002539,"about_ca_system_score_gemma":0.000053314365,"threshold_uncertainty_score":0.99996495},"labels":[],"label_agreement":null},{"id":"W2098572895","doi":"10.1007/s00220-006-1535-6","title":"Aspects of Generic Entanglement","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":364,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Quantum entanglement; Multipartite entanglement; Squashed entanglement; Superdense coding; Bipartite graph; Qubit; Entropy (arrow of time); Quantum; Kullback–Leibler divergence","score_opus":0.037365698815018965,"score_gpt":0.28744388219003575,"score_spread":0.2500781833750168,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2098572895","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.004373345,0.00012194237,0.8340668,0.0004927237,0.000021148493,0.00013449756,0.0000015447752,0.0000589017,0.16072908],"genre_scores_gemma":[0.84074533,0.000021636899,0.15911597,0.00006752003,0.0000078435005,0.000023936887,0.0000060232605,0.0000031632985,0.000008562322],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99924576,0.000044576085,0.0003601555,0.00007347003,0.00016685676,0.00010917019],"domain_scores_gemma":[0.99824125,0.00012621,0.000109564055,0.0014492735,0.00005351885,0.000020184412],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00016362552,0.000066550296,0.000121720666,0.00006938577,0.000049438713,0.000029930794,0.0012977269,0.000021091786,0.000012872527],"category_scores_gemma":[0.000012629201,0.000062616644,0.00005742658,0.00063478417,0.00010424967,0.0002321286,0.00034310698,0.00008287287,0.00005453492],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[2.0789963e-7,0.00029608194,0.00007835144,0.000017835819,0.0000025802767,1.0495337e-7,0.00022145946,0.00007643244,0.00014989478,0.99557745,0.00018056735,0.0033990112],"study_design_scores_gemma":[0.00012729902,0.000011132977,0.00055124547,0.000022080094,0.0000022918389,9.0679407e-7,0.000038958107,0.10032626,0.0013481547,0.8966436,0.00086026115,0.00006781502],"about_ca_topic_score_codex":0.0000058579,"about_ca_topic_score_gemma":0.00000387474,"teacher_disagreement_score":0.836372,"about_ca_system_score_codex":0.00002210116,"about_ca_system_score_gemma":0.000023027997,"threshold_uncertainty_score":0.25534326},"labels":[],"label_agreement":null},{"id":"W2101693935","doi":"10.1007/s00220-014-2043-8","title":"Rate of Convergence for Cardy’s Formula","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Mathematics; Piecewise; Combinatorics; Rate of convergence; Percolation (cognitive psychology); Lattice (music); Hexagonal lattice; Upper and lower bounds; Limit (mathematics); Mathematical analysis; Physics; Quantum mechanics","score_opus":0.1365251829308095,"score_gpt":0.4022259298629634,"score_spread":0.2657007469321539,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2101693935","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0010412986,0.000025706628,0.9935694,0.00027655208,0.000036584304,0.00041357212,0.00002948347,0.000032281703,0.0045751766],"genre_scores_gemma":[0.61308986,0.000015445801,0.38659284,0.00005535648,0.000019414132,0.00014910253,0.000007788082,0.000019626084,0.0000505841],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989414,0.00007897267,0.0005279153,0.00014059005,0.00011362408,0.00019748493],"domain_scores_gemma":[0.9918775,0.0064535504,0.00016772769,0.0012504424,0.00019843398,0.0000523252],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0007288601,0.00012535986,0.000387851,0.00003116593,0.000072509814,0.000011359563,0.00073786033,0.000062519015,0.00001826011],"category_scores_gemma":[0.0048495457,0.000113915245,0.00008704424,0.00020660798,0.00015685584,0.00006118865,0.0002021937,0.00013866513,0.000016287664],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000007906672,0.00025366893,0.0000040451127,0.00045683046,0.000011582253,3.7889095e-8,0.00026778653,0.000009354784,0.00016712402,0.99524957,0.00021093611,0.0033611779],"study_design_scores_gemma":[0.00027590382,0.000048671467,0.000005558469,0.000114311224,0.000032947963,5.1952605e-7,0.000059732047,0.20528078,0.0006412748,0.7931472,0.0002961289,0.00009698468],"about_ca_topic_score_codex":0.0000018743373,"about_ca_topic_score_gemma":0.000003724862,"teacher_disagreement_score":0.61204857,"about_ca_system_score_codex":0.000025248171,"about_ca_system_score_gemma":0.000032773205,"threshold_uncertainty_score":0.580571},"labels":[],"label_agreement":null},{"id":"W2102008899","doi":"10.1007/s00220-017-2933-7","title":"Critical Exponents on Fortuin–Kasteleyn Weighted Planar Maps","year":2017,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":10,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Victoria","funders":"Engineering and Physical Sciences Research Council; Isaac Newton Institute for Mathematical Sciences","keywords":"Exponent; Dimension (graph theory); Connection (principal bundle); Combinatorics; Mathematics; Planar; Brownian motion; Duality (order theory); Bijection; Physics; Mathematical analysis; Mathematical physics; Geometry; Statistics","score_opus":0.1948354526094714,"score_gpt":0.42899993299573014,"score_spread":0.23416448038625873,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2102008899","genre_codex":"methods","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":"methods","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0007333083,0.00026442218,0.94002813,0.003949468,0.0005241286,0.0014904117,0.0007174455,0.0002900278,0.052002635],"genre_scores_gemma":[0.48458925,0.00027423428,0.51262546,0.00028656016,0.00030775578,0.0009910522,0.00034334592,0.00021543031,0.00036691973],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9963649,0.00025864987,0.0012211531,0.0007152289,0.00078259787,0.0006574628],"domain_scores_gemma":[0.98512363,0.0066113453,0.00050677906,0.0071697542,0.00033177264,0.00025670137],"candidate_categories":["metaresearch","metaepi_narrow","research_integrity"],"consensus_categories":[],"category_scores_codex":[0.0007461531,0.00065826357,0.0012756599,0.0001421978,0.00047459014,0.00029692895,0.0040865997,0.0005880814,0.00008080587],"category_scores_gemma":[0.009647861,0.00062115054,0.0002789683,0.00015339302,0.00061757874,0.00013789698,0.0025073406,0.0023525038,0.0003651093],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000028888615,0.001743619,0.0000023059733,0.0013739598,0.00006387533,0.000015114418,0.00040715304,0.000004601861,0.000007097981,0.9886481,0.0018915316,0.005813755],"study_design_scores_gemma":[0.0003960607,0.00008221499,0.000013821102,0.0026064976,0.00015382147,0.000006934859,0.00009514656,0.05040673,0.00004567822,0.9453392,0.000282367,0.00057149655],"about_ca_topic_score_codex":0.000009901279,"about_ca_topic_score_gemma":0.00001012371,"teacher_disagreement_score":0.48385596,"about_ca_system_score_codex":0.00022903657,"about_ca_system_score_gemma":0.00019752886,"threshold_uncertainty_score":0.9999491},"labels":[],"label_agreement":null},{"id":"W2103284231","doi":"10.1007/s00220-014-2083-0","title":"Effective Light Dynamics in Perturbed Photonic Crystals","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Photonic Crystals and Applications","field":"Physics and Astronomy","cited_by":14,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Semiclassical physics; Invariant subspace; Physics; Adiabatic process; Invariant (physics); Photonic crystal; Operator (biology); Perturbation (astronomy); Quantum mechanics; Classical mechanics; Mathematics; Linear subspace; Quantum; Pure mathematics","score_opus":0.012930570295253798,"score_gpt":0.28867576246217946,"score_spread":0.27574519216692567,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2103284231","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.24892193,0.0001376579,0.21833012,0.0029314063,0.00006311895,0.0025257699,0.000081240556,0.0001397704,0.526869],"genre_scores_gemma":[0.9936604,0.0000086169375,0.005273658,0.00004969984,0.000039331968,0.0007624651,0.00007474957,0.000026267044,0.00010480149],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987923,0.00016092489,0.0004153436,0.00023487867,0.00012345685,0.00027308136],"domain_scores_gemma":[0.9971722,0.0009129077,0.00011124829,0.0016935572,0.000046852692,0.00006325014],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00037063795,0.00018028221,0.00033563172,0.00006166491,0.000122001584,0.00004765003,0.0008124118,0.00005108757,0.00009044867],"category_scores_gemma":[0.00005047167,0.00017550364,0.00010241879,0.0004810333,0.00014455893,0.00011850307,0.00032085186,0.00040448367,0.000097240765],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000024535557,0.0008608513,0.0012526148,0.000023478122,0.000013085335,8.7040554e-8,0.00046224202,0.0000822154,0.000858284,0.9875204,0.000052843774,0.008871425],"study_design_scores_gemma":[0.0004414369,0.000014482006,0.00053581974,0.00010866879,0.000012961507,3.769199e-7,0.0004487841,0.25118664,0.0006010631,0.744552,0.0018961957,0.00020158246],"about_ca_topic_score_codex":0.00005025756,"about_ca_topic_score_gemma":0.000057466958,"teacher_disagreement_score":0.74473846,"about_ca_system_score_codex":0.00017853761,"about_ca_system_score_gemma":0.00003498319,"threshold_uncertainty_score":0.71568304},"labels":[],"label_agreement":null},{"id":"W2106272832","doi":"10.1007/s00220-012-1605-x","title":"Unifying Typical Entanglement and Coin Tossing: on Randomization in Probabilistic Theories","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Applications","field":"Physics and Astronomy","cited_by":28,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Quantum entanglement; Probabilistic logic; Generalization; Entropy (arrow of time); Quantum; Simple (philosophy); Probability theory; Kullback–Leibler divergence; Quantum probability","score_opus":0.04432782261259599,"score_gpt":0.3249363239602123,"score_spread":0.28060850134761633,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2106272832","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.4918649,0.00027363488,0.46375647,0.0019984206,0.000077222125,0.0019239757,0.000039896615,0.0000691217,0.039996345],"genre_scores_gemma":[0.99514776,0.000011572526,0.004457905,0.000034590066,0.00004423401,0.00023874368,0.000038821938,0.000012176533,0.0000141965365],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99921805,0.00011227725,0.00029053973,0.000109241744,0.00008846388,0.00018141151],"domain_scores_gemma":[0.9987229,0.0005336746,0.000069641224,0.0006012678,0.000022430931,0.000050080722],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00039180252,0.000104744984,0.00017779545,0.000037188114,0.00011773872,0.000037359227,0.0002199049,0.000026047228,0.00003965589],"category_scores_gemma":[0.000046600748,0.00009487559,0.000029474246,0.0002207555,0.0001095174,0.0001053822,0.00014309285,0.00019192741,0.000027794842],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000011216778,0.0007576043,0.0017699936,0.000014701053,0.000005241141,2.0860918e-8,0.0007440648,0.000027215121,0.00004641773,0.992856,0.0000098110695,0.0037576954],"study_design_scores_gemma":[0.00067720277,0.000010120223,0.0006810853,0.00008096789,0.00001143488,2.0081781e-7,0.00047552702,0.021955507,0.000100246485,0.97566754,0.00023639308,0.0001037708],"about_ca_topic_score_codex":0.000006295339,"about_ca_topic_score_gemma":0.0000026196487,"teacher_disagreement_score":0.50328285,"about_ca_system_score_codex":0.00004018548,"about_ca_system_score_gemma":0.000017945395,"threshold_uncertainty_score":0.38689145},"labels":[],"label_agreement":null},{"id":"W2107162203","doi":"10.1007/s00220-012-1476-1","title":"Quantum Communication in Rindler Spacetime","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Electrodynamics and Casimir Effect","field":"Physics and Astronomy","cited_by":44,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute; McGill University","funders":"Engineering and Physical Sciences Research Council","keywords":"Unruh effect; Minkowski space; Communication source; Inertial frame of reference; Observer (physics); Quantum; Physics; Quantum information science; Channel (broadcasting); Computer science; Theoretical physics; Quantum entanglement; Quantum mechanics; Telecommunications","score_opus":0.02738368302119681,"score_gpt":0.31743454899575224,"score_spread":0.2900508659745554,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2107162203","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8179654,0.00094201416,0.03716203,0.0014982047,0.000066181405,0.00090692,0.000017223785,0.000082057035,0.14135996],"genre_scores_gemma":[0.99425614,0.00003392093,0.0052978112,0.000033623885,0.000048015725,0.00017142599,0.00006614053,0.000026828839,0.0000660775],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99870265,0.00027575207,0.0003732916,0.00012472883,0.00013127529,0.00039228378],"domain_scores_gemma":[0.9973589,0.00055638456,0.00010384327,0.0018765219,0.000033058874,0.000071245886],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00064867194,0.00016327828,0.00026087151,0.00007104338,0.00010450215,0.000034132605,0.0008020156,0.000049429884,0.00013222103],"category_scores_gemma":[0.000026425383,0.00016355471,0.00008253042,0.00043792813,0.00015395902,0.00027237547,0.00034670637,0.0005097999,0.00027412857],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000030443173,0.001139123,0.025695775,0.000014964788,0.000011519709,8.671883e-8,0.0007375471,0.0000463523,0.00013535883,0.9689864,0.000081261955,0.0031485504],"study_design_scores_gemma":[0.0005061074,0.000017981754,0.011290706,0.00013531459,0.000018416707,0.000001212978,0.0004200788,0.100527756,0.00015419825,0.8859712,0.00066266727,0.00029436973],"about_ca_topic_score_codex":0.00005625075,"about_ca_topic_score_gemma":0.000012011051,"teacher_disagreement_score":0.17629075,"about_ca_system_score_codex":0.00007541212,"about_ca_system_score_gemma":0.000027165897,"threshold_uncertainty_score":0.6669567},"labels":[],"label_agreement":null},{"id":"W2107820983","doi":"10.1007/s00220-008-0641-z","title":"Classification of Superpotentials","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":4,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McMaster University","funders":"","keywords":"Superpotential; Curvature; Scalar (mathematics); Vector bundle; Type (biology); Isotropy; Representation (politics)","score_opus":0.2857581075328155,"score_gpt":0.38518455700673615,"score_spread":0.09942644947392065,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2107820983","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7021378,0.00016828378,0.20102705,0.00083972554,0.00006330778,0.0007164347,0.00001507385,0.00016698435,0.09486531],"genre_scores_gemma":[0.8974255,0.00006141944,0.10220387,0.0000151061295,0.000017890043,0.000047773072,0.000009189304,0.000015950693,0.00020331734],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987539,0.00014990463,0.00058475666,0.00013182344,0.00022418774,0.00015541638],"domain_scores_gemma":[0.9966297,0.0010558048,0.00016379108,0.0019908925,0.000121387835,0.000038420043],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00036600485,0.00011550051,0.00032211642,0.000079542944,0.00011916122,0.000007037258,0.0009007773,0.000066874905,0.000116725976],"category_scores_gemma":[0.00048652326,0.00011154433,0.00009953153,0.0005353053,0.00034511625,0.000117867225,0.0002581241,0.00019012866,0.00009259312],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000030110564,0.0009649795,0.00083945284,0.000091845686,0.000013674594,5.532678e-7,0.00073021936,0.0000044503404,0.001587431,0.99488825,0.00032840154,0.00054775766],"study_design_scores_gemma":[0.00020616564,0.000019152501,0.0042811446,0.000064629334,0.000018774634,0.000009510607,0.00021712313,0.0051142415,0.00074380235,0.989016,0.00019317778,0.00011625411],"about_ca_topic_score_codex":0.0000036547303,"about_ca_topic_score_gemma":0.0000031432537,"teacher_disagreement_score":0.19528766,"about_ca_system_score_codex":0.000029790237,"about_ca_system_score_gemma":0.000035701003,"threshold_uncertainty_score":0.4548646},"labels":[],"label_agreement":null},{"id":"W2110483209","doi":"10.1007/s00220-005-1331-8","title":"Invariant Classification of Orthogonally Separable Hamiltonian Systems in Euclidean Space","year":2005,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":44,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Dalhousie University; University of Waterloo","funders":"","keywords":"Invariant (physics); Separable space; Euclidean space; Euclidean geometry; Hamiltonian system; Hamiltonian (control theory); Seven-dimensional space; Complex system","score_opus":0.05140166080361694,"score_gpt":0.3300537427841385,"score_spread":0.2786520819805216,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2110483209","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6088223,0.00052730803,0.0711042,0.0038102875,0.000084808344,0.0014984183,0.00014248113,0.0000717096,0.31393853],"genre_scores_gemma":[0.97568184,0.000016607859,0.023827119,0.00001266079,0.00007639489,0.00005477373,0.000054284264,0.00001748493,0.00025882045],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9988065,0.00014600356,0.0005661836,0.00014796201,0.00013869388,0.00019468169],"domain_scores_gemma":[0.99810296,0.00033476017,0.00017068384,0.0012750834,0.00006696364,0.00004955127],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00038736264,0.00012264836,0.00029487693,0.00006470407,0.00006158968,0.00003189716,0.000571571,0.00004418552,0.000041285708],"category_scores_gemma":[0.000024420657,0.00012118225,0.000070489994,0.00036968282,0.00013901695,0.00014921259,0.00016552115,0.00028091882,0.00007768241],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000026147645,0.0008580106,0.005997701,0.00003629516,0.000013775679,1.2436534e-7,0.00068000425,0.0014420461,0.00063171994,0.9881154,0.00004695242,0.0021753586],"study_design_scores_gemma":[0.0008167885,0.000026080123,0.018005062,0.00047552178,0.00003265729,0.0000010830662,0.0021493002,0.60188484,0.00032320534,0.37142974,0.00448364,0.0003720514],"about_ca_topic_score_codex":0.0001127826,"about_ca_topic_score_gemma":0.000053253054,"teacher_disagreement_score":0.6166856,"about_ca_system_score_codex":0.000052835265,"about_ca_system_score_gemma":0.00007975759,"threshold_uncertainty_score":0.49416688},"labels":[],"label_agreement":null},{"id":"W2115798635","doi":"10.1007/s00220-013-1706-1","title":"Renormalization Horseshoe and Rigidity for Circle Diffeomorphisms with Breaks","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":39,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Horseshoe (symbol); Mathematics; Rotation number; Renormalization; Pure mathematics; Periodic point; Diophantine equation; Rigidity (electromagnetism); Mathematical analysis; Rotation (mathematics); Mathematical physics; Geometry; Physics; Quantum mechanics","score_opus":0.06553305525332938,"score_gpt":0.32978635084576957,"score_spread":0.2642532955924402,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2115798635","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.09717219,0.000055200868,0.88868564,0.001249505,0.000018024002,0.001998552,0.000028467774,0.00012060067,0.010671834],"genre_scores_gemma":[0.77175736,0.000040253613,0.22721957,0.00007371934,0.000024488634,0.0006605826,0.000033932552,0.00004462457,0.00014550042],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987276,0.000079784106,0.0005036644,0.00022356537,0.00019302654,0.0002723668],"domain_scores_gemma":[0.9960553,0.0020737287,0.00017992152,0.0014124932,0.00017529019,0.00010323866],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003765046,0.00019531601,0.00041304494,0.000051492996,0.00018277217,0.00010527166,0.00050415134,0.000099314195,0.000054385437],"category_scores_gemma":[0.0004943459,0.00016334544,0.000060001148,0.00023742358,0.0003433497,0.000274086,0.00023921837,0.00021178993,0.00003418954],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000048935576,0.0006594793,0.00013469809,0.0003633423,0.00002261866,2.0966385e-7,0.00046244432,0.0000053574195,0.00013255773,0.9935431,0.0002792702,0.004392031],"study_design_scores_gemma":[0.0004071248,0.000049449827,0.00045738652,0.00015941185,0.0000384169,0.000006199985,0.00011686592,0.13638335,0.00005336255,0.86203754,0.00009804714,0.00019286053],"about_ca_topic_score_codex":0.000011699145,"about_ca_topic_score_gemma":0.000017354645,"teacher_disagreement_score":0.67458516,"about_ca_system_score_codex":0.000041797535,"about_ca_system_score_gemma":0.00002216435,"threshold_uncertainty_score":0.66610336},"labels":[],"label_agreement":null},{"id":"W2116380359","doi":"10.1007/s00220-016-2705-9","title":"A Second Order Expansion of the Separatrix Map for Trigonometric Perturbations of a Priori Unstable Systems","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":12,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"National Science Foundation","keywords":"Preprint; Nonlinear system; Trigonometry; Integrable system; A priori and a posteriori; Invariant (physics); Standard map; Mathematics; Physics; Mathematical analysis; Mathematical physics; Statistical physics; Separatrix; Applied mathematics; Quantum mechanics; Computer science","score_opus":0.03578539919455942,"score_gpt":0.3005886378670385,"score_spread":0.26480323867247907,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2116380359","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.2332786,0.00054471503,0.74974597,0.0007412835,0.00020622014,0.0025600856,0.00055496255,0.000026058895,0.012342101],"genre_scores_gemma":[0.9948583,0.0000045480133,0.004073954,0.000003274433,0.0000359381,0.00021475377,0.000011300139,0.000013763308,0.00078411953],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989199,0.00010619345,0.000578299,0.00011923561,0.00012909132,0.0001472898],"domain_scores_gemma":[0.9968326,0.001379031,0.0002979245,0.0012562455,0.00020175806,0.000032413252],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00027466397,0.000106197214,0.00033168634,0.000054439945,0.000088862675,0.0000132229015,0.00063487387,0.000040177343,0.000052432086],"category_scores_gemma":[0.000076454606,0.00006034189,0.0001421108,0.0006078515,0.00017267573,0.000095176154,0.00017559523,0.00008314425,0.000009560301],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000058824926,0.0004141897,0.0014899332,0.0002023426,0.00003407987,4.9583546e-9,0.00028039643,0.000077296085,0.002098152,0.99362653,0.00018115605,0.001590042],"study_design_scores_gemma":[0.0024268574,0.00011558379,0.0012563505,0.001361444,0.00011415294,5.494198e-7,0.0011688671,0.16898452,0.0023564745,0.81563175,0.006173933,0.0004095239],"about_ca_topic_score_codex":0.000022102682,"about_ca_topic_score_gemma":0.0000030028689,"teacher_disagreement_score":0.76157975,"about_ca_system_score_codex":0.000035786958,"about_ca_system_score_gemma":0.0000842079,"threshold_uncertainty_score":0.24606708},"labels":[],"label_agreement":null},{"id":"W2121458040","doi":"10.1007/s00220-007-0234-2","title":"Pseudodifferential Symbols on Riemann Surfaces and Krichever–Novikov Algebras","year":2007,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Meromorphic function; Novikov self-consistency principle; Riemann surface; Mathematics; Pure mathematics; Holomorphic function; Invariant (physics); Lie algebra; Diffeomorphism; Type (biology); Algebra over a field; Mathematical physics","score_opus":0.07521477870125609,"score_gpt":0.36271521914738736,"score_spread":0.28750044044613127,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2121458040","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.95855635,0.00015114323,0.020900816,0.00038843488,0.0001459453,0.0005456236,0.000005188752,0.00013204383,0.019174462],"genre_scores_gemma":[0.97998345,0.000057754165,0.019602863,0.000084092615,0.00008272814,0.00002475288,0.0000070309393,0.000039310566,0.00011802562],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9983684,0.00011729528,0.0005689945,0.00026717247,0.00033149865,0.000346658],"domain_scores_gemma":[0.9954307,0.0025167307,0.00015733317,0.0017102172,0.000073857074,0.000111167836],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006155567,0.00025617768,0.00042910565,0.0000733143,0.00023563026,0.000067260844,0.00082159654,0.0001503118,0.000039776485],"category_scores_gemma":[0.00034795052,0.00022533913,0.00008707829,0.00030782085,0.00031899792,0.000119947144,0.00036507501,0.00048263057,0.00003745997],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000016638493,0.0004494526,0.00016125271,0.000074517535,0.000027668917,0.0000011617476,0.00103793,0.0000036025367,0.00006404202,0.9963648,0.00011887904,0.0016800754],"study_design_scores_gemma":[0.00047586657,0.000047304882,0.00084616913,0.00012379563,0.000036531146,0.0000036937638,0.00025257035,0.0015326715,0.0004339629,0.9959034,0.00010389189,0.00024017981],"about_ca_topic_score_codex":0.000008355596,"about_ca_topic_score_gemma":0.000018053823,"teacher_disagreement_score":0.0214271,"about_ca_system_score_codex":0.00007165476,"about_ca_system_score_gemma":0.00003260592,"threshold_uncertainty_score":0.91890633},"labels":[],"label_agreement":null},{"id":"W2122214841","doi":"10.1007/s00220-015-2330-z","title":"Twisted Heisenberg Doubles","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Ottawa","funders":"","keywords":"Fock space; Hopf algebra; Algebra over a field; Quantum; Heisenberg picture; Tensor product; Heisenberg group; Lattice (music); Quantum group; Operator algebra","score_opus":0.281395426329024,"score_gpt":0.4089601074148152,"score_spread":0.12756468108579122,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2122214841","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.46027496,0.0013395321,0.11868287,0.005640171,0.000992714,0.002467889,0.000018627494,0.0011176454,0.40946558],"genre_scores_gemma":[0.94189006,0.000016563969,0.057585254,0.000069800764,0.00008183421,0.0000799793,0.000008639726,0.00003416685,0.00023367633],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99870527,0.00014291384,0.0004529712,0.0001721045,0.00029306192,0.00023367429],"domain_scores_gemma":[0.9966456,0.0007854733,0.00011837334,0.0021829621,0.00014080762,0.00012674663],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003959682,0.0001724088,0.0003359877,0.000043061842,0.00008349828,0.000048237693,0.0010997216,0.00009687477,0.000026477483],"category_scores_gemma":[0.00062661606,0.000153817,0.00008346036,0.00036993946,0.00021316195,0.00013979715,0.0005177412,0.00030836862,0.000091115864],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000067803953,0.00032562588,0.00005705925,0.000032369036,0.000014734797,6.7167224e-7,0.0010750038,0.000015362457,0.000007738605,0.9967609,0.00091994146,0.00078383554],"study_design_scores_gemma":[0.0005891713,0.00001978684,0.000018037701,0.00006501179,0.00002115833,0.0000036621036,0.00036258032,0.004189285,0.00007640614,0.99358565,0.00089563703,0.00017362999],"about_ca_topic_score_codex":0.000008987123,"about_ca_topic_score_gemma":0.000007946275,"teacher_disagreement_score":0.48161513,"about_ca_system_score_codex":0.00011085485,"about_ca_system_score_gemma":0.00007948757,"threshold_uncertainty_score":0.6272475},"labels":[],"label_agreement":null},{"id":"W2124901640","doi":"10.1007/s00220-007-0372-6","title":"KdV Preserves White Noise","year":2007,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":34,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"White noise; Complex system; Korteweg–de Vries equation; Noise (video); Mathematics; Nonlinear system; White (mutation); Statistical physics; Physics; Computer science; Artificial intelligence; Statistics; Quantum mechanics; Biology","score_opus":0.13658366129795396,"score_gpt":0.4131261696771481,"score_spread":0.27654250837919414,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2124901640","genre_codex":"methods","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":"methods","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.010854466,0.00010615671,0.7973004,0.0010532326,0.00005214385,0.0009947561,0.000009756448,0.00037172998,0.18925734],"genre_scores_gemma":[0.48570472,0.00002678621,0.51306134,0.00013970799,0.00007901119,0.00012684464,0.000013404546,0.0000942669,0.0007539044],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99716777,0.00014134147,0.0011622664,0.0003669182,0.00050157687,0.000660134],"domain_scores_gemma":[0.99116933,0.004192121,0.00029774464,0.0039669396,0.00018437779,0.00018947439],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0016467965,0.00035469918,0.00062320125,0.000117468655,0.00019887724,0.000059431706,0.0019740646,0.00014988413,0.00011220128],"category_scores_gemma":[0.0015618758,0.00033471073,0.00018859442,0.0008655228,0.00053403544,0.00045535102,0.001041642,0.0007506849,0.00032832765],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010523776,0.0015662748,0.00018158622,0.00029999344,0.000024885121,0.0000026892785,0.0011514802,0.000032217024,0.0005258779,0.9930219,0.00054046104,0.0026421063],"study_design_scores_gemma":[0.00042857754,0.000026869817,0.00014169098,0.0002328694,0.000034907167,0.000004999445,0.00025693505,0.0047187707,0.0008912477,0.99234486,0.0005585965,0.0003596511],"about_ca_topic_score_codex":0.0000017638804,"about_ca_topic_score_gemma":0.000019286903,"teacher_disagreement_score":0.47485027,"about_ca_system_score_codex":0.0001628198,"about_ca_system_score_gemma":0.000044237,"threshold_uncertainty_score":0.9999105},"labels":[],"label_agreement":null},{"id":"W2125457426","doi":"10.1007/s00220-015-2470-1","title":"Decoupling with Random Quantum Circuits","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":98,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Sherbrooke","funders":"","keywords":"Decoupling (probability); Electronic circuit; Randomness; Unitary state; Qubit; Mathematics; Quantum; Quantum circuit; Topology (electrical circuits); Discrete mathematics; Computer science; Quantum mechanics; Quantum error correction; Physics; Combinatorics; Law","score_opus":0.06120226985530414,"score_gpt":0.30450905195292244,"score_spread":0.2433067820976183,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2125457426","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.012847078,0.00017380388,0.98150986,0.00088211097,0.000054941564,0.00017404054,6.221687e-7,0.00016301718,0.0041945283],"genre_scores_gemma":[0.7277481,0.000008179232,0.27205217,0.00009386195,0.00004285099,0.000025691857,0.0000025037482,0.000012240859,0.000014377753],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9989493,0.00010300846,0.00026270456,0.00020971334,0.0002465729,0.00022870836],"domain_scores_gemma":[0.9969283,0.000604353,0.00008283129,0.002104912,0.00017006151,0.00010955858],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005327623,0.00013247806,0.00022986556,0.00005276384,0.00012520689,0.00011715762,0.0020705115,0.000037277216,0.000001039419],"category_scores_gemma":[0.00023638294,0.000103745384,0.000040741623,0.0005950471,0.00014295954,0.0001940367,0.0006530772,0.00032795017,0.0000627718],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000037730022,0.0004336894,0.00014945923,0.000026653262,0.0000150668775,0.000003911833,0.0027891942,0.014434147,0.00001432125,0.9466095,0.00016157822,0.035358716],"study_design_scores_gemma":[0.0004591408,0.000025631938,0.000037367096,0.000071301205,0.000002963683,0.0000065533322,0.00004328717,0.63024837,0.000024918105,0.3687493,0.00023079226,0.00010039788],"about_ca_topic_score_codex":0.000004303005,"about_ca_topic_score_gemma":0.0000026518915,"teacher_disagreement_score":0.71490103,"about_ca_system_score_codex":0.00004030554,"about_ca_system_score_gemma":0.00009984896,"threshold_uncertainty_score":0.4230614},"labels":[],"label_agreement":null},{"id":"W2126068340","doi":"10.1007/s00220-008-0679-y","title":"On the Localized Phase of a Copolymer in an Emulsion: Supercritical Percolation Regime","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Block Copolymer Self-Assembly","field":"Materials Science","cited_by":2,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Division of Mathematical Sciences; University of British Columbia; Pacific Institute for the Mathematical Sciences","keywords":"Copolymer; Supercritical fluid; Percolation (cognitive psychology); Critical exponent; Phase (matter); Directed percolation; Percolation threshold; Phase diagram; Relaxation (psychology)","score_opus":0.09515676907388013,"score_gpt":0.3640639354289641,"score_spread":0.26890716635508394,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2126068340","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.990436,0.00013273278,0.00467887,0.001488734,0.000029994795,0.00040601208,0.000009062785,0.000045723707,0.0027728656],"genre_scores_gemma":[0.99291337,0.00002721446,0.006666958,0.00020717281,0.000019710415,0.00011896866,0.0000105496665,0.000021818305,0.000014256686],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99798197,0.0006055886,0.0005964616,0.00022212997,0.00034972408,0.00024414322],"domain_scores_gemma":[0.9956402,0.0017989713,0.00005169718,0.0023449508,0.000096491916,0.00006768961],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005077364,0.00015701134,0.0003432791,0.00007299986,0.00019384843,0.00002576364,0.0012439467,0.00008921782,0.00021795243],"category_scores_gemma":[0.00038557005,0.00012159613,0.00006253844,0.0005150475,0.0007558601,0.00026882553,0.00027027715,0.000315992,0.00015054809],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00006671038,0.0048071495,0.00012587298,0.000037959915,0.0000041980493,0.0000037900481,0.0041089286,0.000032241787,0.18925449,0.80094665,0.00016350178,0.0004484752],"study_design_scores_gemma":[0.003819155,0.00053362735,0.00061477395,0.0006129752,0.00004976569,0.00003302259,0.0018809407,0.16022451,0.33189636,0.49962142,0.0000850476,0.0006283906],"about_ca_topic_score_codex":0.00003255609,"about_ca_topic_score_gemma":0.000024696039,"teacher_disagreement_score":0.30132523,"about_ca_system_score_codex":0.0000735063,"about_ca_system_score_gemma":0.00006636529,"threshold_uncertainty_score":0.49585465},"labels":[],"label_agreement":null},{"id":"W2130823140","doi":"10.1007/s00220-015-2473-y","title":"Thermalization and Canonical Typicality in Translation-Invariant Quantum Lattice Systems","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum many-body systems","field":"Physics and Astronomy","cited_by":100,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo; Perimeter Institute; Western University","funders":"","keywords":"Eigenvalues and eigenvectors; Thermalisation; Quantum; Ising model; Gibbs state; Quantum system; Lattice (music); Hamiltonian (control theory); Entropy (arrow of time)","score_opus":0.11493664014163502,"score_gpt":0.3388974799757163,"score_spread":0.22396083983408127,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2130823140","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.525635,0.0014129379,0.39069203,0.0025657143,0.0002609614,0.0023893414,0.0000745533,0.00016120911,0.07680824],"genre_scores_gemma":[0.99633366,0.000007077062,0.0033583876,0.000016939948,0.000067684196,0.00012287022,0.000044575525,0.000021207612,0.000027610351],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.998307,0.00047555918,0.0006020686,0.00020330577,0.00019952065,0.00021254383],"domain_scores_gemma":[0.99793833,0.00067637063,0.0001250101,0.0010727589,0.00008309277,0.00010445127],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0008641445,0.00015287193,0.00033336834,0.00005343183,0.0000696634,0.00008153042,0.00045644442,0.00006617013,0.000012817304],"category_scores_gemma":[0.00007050006,0.00014535236,0.000038470127,0.00037562393,0.00018906951,0.00021855498,0.0001479671,0.0002931987,0.000055837983],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000060875636,0.000391394,0.010709534,0.00005215294,0.000012816424,3.930814e-7,0.0015497381,0.00035763145,0.00002954176,0.98614687,0.00003231784,0.00071151706],"study_design_scores_gemma":[0.00061695423,0.000014431204,0.001715683,0.00015393649,0.000018015715,0.000001269076,0.0011385249,0.6464356,0.000009055065,0.34932828,0.00039369473,0.00017451629],"about_ca_topic_score_codex":0.00040644547,"about_ca_topic_score_gemma":0.000033554792,"teacher_disagreement_score":0.646078,"about_ca_system_score_codex":0.00006959194,"about_ca_system_score_gemma":0.000112106456,"threshold_uncertainty_score":0.5927297},"labels":[],"label_agreement":null},{"id":"W2131298355","doi":"10.1007/s00220-011-1383-x","title":"Fredholm Determinants and Pole-free Solutions to the Noncommutative Painlevé II Equation","year":2011,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Holomorphic and Operator Theory","field":"Mathematics","cited_by":16,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Concordia University","funders":"","keywords":"Noncommutative geometry; Fredholm determinant; Resolvent; Commutative property; Fredholm theory; Integrable system; Fredholm integral equation; Formalism (music); Operator theory","score_opus":0.25534781694070163,"score_gpt":0.3643102383860711,"score_spread":0.10896242144536944,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2131298355","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.27551034,0.0007009493,0.59511316,0.0063341316,0.00017699614,0.0035115445,0.0001433536,0.0003205581,0.118188985],"genre_scores_gemma":[0.8807556,0.000032487198,0.11841119,0.00030501606,0.000020725683,0.00025141024,0.000004085424,0.000031367417,0.0001881155],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99833727,0.00054662337,0.00046178044,0.00018504634,0.00018197601,0.00028731392],"domain_scores_gemma":[0.9952328,0.0016671638,0.000118135125,0.00278274,0.00010407897,0.0000950596],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0013212295,0.00018262831,0.00028425822,0.000055175315,0.0007413313,0.0000313911,0.0013724756,0.00008126462,0.00005745419],"category_scores_gemma":[0.0017664975,0.00013779278,0.00006000126,0.0003588641,0.0004793005,0.00015323574,0.0013420918,0.0003602542,0.000100146186],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006942209,0.0005328675,0.00011797307,0.00002802,0.000016709222,6.933315e-7,0.022277694,0.0000018805177,0.00003345645,0.9737748,0.00065237255,0.0025565752],"study_design_scores_gemma":[0.00027914127,0.00006188965,0.0003254817,0.00011615691,0.000042560572,0.0000064711107,0.0027985761,0.0054166126,0.00018929719,0.99031657,0.0002689373,0.00017828132],"about_ca_topic_score_codex":0.00001627611,"about_ca_topic_score_gemma":0.00009337042,"teacher_disagreement_score":0.60524523,"about_ca_system_score_codex":0.000059299862,"about_ca_system_score_gemma":0.000048142352,"threshold_uncertainty_score":0.5701796},"labels":[],"label_agreement":null},{"id":"W2132042143","doi":"10.1007/s00220-015-2409-6","title":"Erratum to: Morrey Potentials and Harmonic Maps","year":2015,"lang":"en","type":"erratum","venue":"Communications in Mathematical Physics","topic":"Mathematical Analysis and Transform Methods","field":"Mathematics","cited_by":6,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Memorial University of Newfoundland","funders":"","keywords":"Complex system; Harmonic; Physics; Harmonic map; Theoretical physics; Mathematics; Pure mathematics; Classical mechanics; Computer science; Quantum mechanics; Artificial intelligence","score_opus":0.17975818578491767,"score_gpt":0.41911727395171217,"score_spread":0.2393590881667945,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2132042143","genre_codex":"other","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0001688145,0.0041392557,0.19188486,0.006409089,0.0018000995,0.0030938894,0.00029621006,0.00042706693,0.7917807],"genre_scores_gemma":[0.004854871,0.002571565,0.8778692,0.00056206866,0.0008044607,0.0010304947,0.0006247681,0.00044721528,0.11123537],"study_design_codex":"not_applicable","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9954604,0.00066442875,0.001676845,0.0006727677,0.0008604382,0.00066510594],"domain_scores_gemma":[0.9921399,0.0020041312,0.0004152906,0.004601386,0.0003711681,0.00046814597],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0027979575,0.0007323965,0.002016188,0.0002784978,0.00022515525,0.0002210077,0.0022988613,0.0006403484,0.00012252262],"category_scores_gemma":[0.0026059086,0.0006353899,0.00037152562,0.0010065419,0.00044580735,0.00018368576,0.00137565,0.0020770181,0.00029987594],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000060490815,0.00083080755,0.000001627747,0.0011828694,0.00014316398,0.000003900722,0.0010047862,0.0000015118244,0.000012085677,0.48038045,0.51218486,0.0042478703],"study_design_scores_gemma":[0.00031274895,0.000047388305,0.000005034494,0.0011879255,0.00045103207,0.000010861975,0.00023055836,0.0056882426,0.00002124647,0.9499168,0.041490775,0.0006374085],"about_ca_topic_score_codex":0.000013640804,"about_ca_topic_score_gemma":0.000053488428,"teacher_disagreement_score":0.6859843,"about_ca_system_score_codex":0.00018676648,"about_ca_system_score_gemma":0.00024497064,"threshold_uncertainty_score":0.99960977},"labels":[],"label_agreement":null},{"id":"W2135442011","doi":"10.1007/s00220-010-1164-y","title":"Asymptotic Infinitesimal Freeness with Amalgamation for Haar Quantum Unitary Random Matrices","year":2010,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":13,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Queen's University","funders":"","keywords":"Unitary matrix; Infinitesimal; Mathematics; Unitary state; Random matrix; Limiting; Haar measure; Free probability; Combinatorics; Circular ensemble; Haar; Matrix (chemical analysis); Discrete mathematics; Pure mathematics; Quantum mechanics; Physics; Mathematical analysis; Eigenvalues and eigenvectors","score_opus":0.0638787995881304,"score_gpt":0.35379041470092637,"score_spread":0.28991161511279595,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2135442011","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.38075963,0.00012298184,0.60347897,0.0018320358,0.00007297864,0.003237355,0.00007917847,0.00033093357,0.010085931],"genre_scores_gemma":[0.74764496,0.00004679035,0.2508571,0.000051534294,0.00009349635,0.0010859726,0.00007934564,0.000060522372,0.00008025662],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9982917,0.000121238445,0.00071494567,0.00026888202,0.00027473381,0.00032855576],"domain_scores_gemma":[0.99092156,0.006165915,0.0003204252,0.0022274232,0.0002697408,0.000094960895],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00086828356,0.00026940354,0.0005087887,0.00013263147,0.00036144897,0.00011402624,0.0012290512,0.00014028091,0.000032342523],"category_scores_gemma":[0.00068720506,0.00022066211,0.00013327385,0.00074506726,0.00032500754,0.00031140068,0.00020201744,0.0005170136,0.000045696037],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000074583855,0.0009579895,0.00029311425,0.0003295773,0.000040210125,3.5285672e-7,0.00064782746,0.00005374559,0.00057680375,0.9949813,0.00034446182,0.0017000319],"study_design_scores_gemma":[0.0029249622,0.00005305568,0.00018639369,0.00012911533,0.00014181415,0.0000074741533,0.00033492813,0.08185041,0.0002692502,0.9128852,0.0009110793,0.00030632314],"about_ca_topic_score_codex":0.000011759267,"about_ca_topic_score_gemma":0.000052112977,"teacher_disagreement_score":0.36688533,"about_ca_system_score_codex":0.000034036613,"about_ca_system_score_gemma":0.000082614024,"threshold_uncertainty_score":0.899834},"labels":[],"label_agreement":null},{"id":"W2135610845","doi":"10.1007/s00220-009-0841-1","title":"On the ‘Stationary Implies Axisymmetric’ Theorem for Extremal Black Holes in Higher Dimensions","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":49,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Event horizon; Killing vector field; Black hole (networking); Spacetime; Homogeneous space; Horizon; Degenerate energy levels; Metric (unit)","score_opus":0.05779529748348718,"score_gpt":0.3155689344610286,"score_spread":0.25777363697754146,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2135610845","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.16092546,0.00020066599,0.324871,0.03224439,0.00012888297,0.0033736571,0.00022480747,0.00014536592,0.47788575],"genre_scores_gemma":[0.99492335,0.000008429712,0.004263872,0.0003979829,0.00007788256,0.00012803858,0.00005666439,0.000022386539,0.0001214052],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988112,0.00013633142,0.0003904661,0.0002073963,0.00016250642,0.00029210487],"domain_scores_gemma":[0.9953516,0.003126506,0.00009535196,0.0013074819,0.000068967565,0.000050087943],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00031915325,0.00019753068,0.00027274195,0.00006147325,0.00019045877,0.000054034397,0.0007781513,0.000046480087,0.00009134997],"category_scores_gemma":[0.00006512531,0.00014195906,0.00014194941,0.0005509244,0.0006516121,0.00010320265,0.00015435326,0.00038448474,0.000095016425],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000012898516,0.0011242314,0.0000615659,0.000008028569,0.000013074819,1.2162522e-7,0.00038099452,0.00018338578,0.000029877472,0.992369,0.00035841,0.005458395],"study_design_scores_gemma":[0.00036575133,0.00004945922,0.00069687766,0.000088126115,0.00001600683,7.6916834e-8,0.0004020501,0.0070696482,0.0001153926,0.9908504,0.00017825178,0.00016799707],"about_ca_topic_score_codex":0.000001808146,"about_ca_topic_score_gemma":4.564376e-7,"teacher_disagreement_score":0.8339979,"about_ca_system_score_codex":0.000038020014,"about_ca_system_score_gemma":0.000027635946,"threshold_uncertainty_score":0.57889223},"labels":[],"label_agreement":null},{"id":"W2136851837","doi":"10.1007/s00220-015-2352-6","title":"Logarithmic Correction for the Susceptibility of the 4-Dimensional Weakly Self-Avoiding Walk: A Renormalisation Group Analysis","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":65,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Logarithm; Exponent; Dimension (graph theory); Group (periodic table); Mathematics; Field (mathematics); Critical dimension; Critical point (mathematics); Function (biology); Critical exponent; Taylor series; Rewriting; Point (geometry); Scaling; Combinatorics; Pure mathematics; Physics; Mathematical analysis; Quantum mechanics; Computer science; Geometry","score_opus":0.04069651327547506,"score_gpt":0.2992268212754883,"score_spread":0.2585303080000132,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2136851837","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.17865507,0.00005999174,0.81457525,0.0013721655,0.00021670238,0.0010723149,0.000057385485,0.00004991958,0.0039411625],"genre_scores_gemma":[0.9917893,8.2019614e-7,0.007875484,0.000031747917,0.00007924754,0.00011752208,0.000061160434,0.000009953636,0.000034788685],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99882096,0.00026651862,0.0003904543,0.00014754146,0.00023542577,0.00013910608],"domain_scores_gemma":[0.9962159,0.0022682855,0.0001930385,0.0010411602,0.00024218386,0.000039436185],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00078652235,0.000116709096,0.00022192615,0.000030451933,0.00027701838,0.000028621856,0.00068229064,0.00003103175,0.000015722513],"category_scores_gemma":[0.00010595554,0.00007480171,0.000245296,0.00076234806,0.00028434905,0.00011021395,0.00029649018,0.00026730637,0.000007638069],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000013151176,0.0006503182,0.0028364093,0.000012486641,0.00017062538,6.132811e-9,0.000981658,0.01085736,0.00007666953,0.98195356,0.00013955569,0.002308224],"study_design_scores_gemma":[0.000172975,0.000014037419,0.0018701849,0.000015814601,0.00019893526,1.0942786e-7,0.00044272488,0.3657893,0.0001622482,0.6312237,0.000047805515,0.000062179955],"about_ca_topic_score_codex":0.0000480734,"about_ca_topic_score_gemma":0.000016398808,"teacher_disagreement_score":0.8131342,"about_ca_system_score_codex":0.00007103641,"about_ca_system_score_gemma":0.000069418515,"threshold_uncertainty_score":0.30503252},"labels":[],"label_agreement":null},{"id":"W2137400193","doi":"10.1007/s00220-011-1192-2","title":"An Infinite Class of Extremal Horizons in Higher Dimensions","year":2011,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":20,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"Engineering and Physical Sciences Research Council","keywords":"Horizon; Base (topology); Topology (electrical circuits); Cosmological constant; Symmetry (geometry); Physics; Manifold (fluid mechanics); Dimension (graph theory); Einstein; Integer (computer science); Angular momentum; Mathematics; Mathematical physics; Mathematical analysis; Pure mathematics; Geometry; Classical mechanics; Combinatorics","score_opus":0.0815874097870347,"score_gpt":0.30892903874053246,"score_spread":0.22734162895349774,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2137400193","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.43406025,0.000059227536,0.041480087,0.00025234598,0.00007362604,0.00055709033,0.00006129355,0.00006064128,0.5233954],"genre_scores_gemma":[0.98543054,0.0000056648464,0.014368952,0.000022794835,0.00003740966,0.00004924428,0.0000291302,0.000025100577,0.000031159565],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998826,0.00015363922,0.00048204564,0.0001745559,0.00012621257,0.0002375098],"domain_scores_gemma":[0.99767935,0.00030450223,0.00011352946,0.0017572051,0.000064377346,0.00008102883],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00019860132,0.00015811514,0.0003289623,0.00005721321,0.000057300247,0.000012386043,0.0008029335,0.000054623863,0.00035265472],"category_scores_gemma":[0.000010257576,0.00014925194,0.00009310437,0.0004570018,0.00047347395,0.00018616192,0.00029095492,0.00038141137,0.00006620083],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00000680332,0.0023299349,0.003914926,0.000014962615,0.000013814772,2.736799e-7,0.001059105,0.00001806629,0.00016438104,0.99020004,0.000010055282,0.002267654],"study_design_scores_gemma":[0.00030301194,0.00004480554,0.0031910604,0.00008671655,0.000019656823,9.4248335e-8,0.00039533427,0.0036608106,0.0005084948,0.9915758,0.00005630353,0.00015792323],"about_ca_topic_score_codex":0.000045039185,"about_ca_topic_score_gemma":0.000005279604,"teacher_disagreement_score":0.5513703,"about_ca_system_score_codex":0.000018852526,"about_ca_system_score_gemma":0.000033076267,"threshold_uncertainty_score":0.60863173},"labels":[],"label_agreement":null},{"id":"W2138431798","doi":"10.1007/s00220-009-0822-4","title":"Spectral Measure of Heavy Tailed Band and Covariance Random Matrices","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":55,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Saskatchewan","funders":"","keywords":"Measure (data warehouse); Combinatorics; Mathematics; Diagonal; Sigma; Random matrix; Limiting; Matrix (chemical analysis); Random variable; Spectral gap; Spectral measure; Function (biology); Covariance; Physics; Statistics; Mathematical analysis; Quantum mechanics; Eigenvalues and eigenvectors; Geometry","score_opus":0.061274145038993595,"score_gpt":0.3461648485576299,"score_spread":0.2848907035186363,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2138431798","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.28922507,0.0062818513,0.5709965,0.01076762,0.00006524482,0.004535654,0.000081499355,0.00039626376,0.117650285],"genre_scores_gemma":[0.8881611,0.00046489714,0.11116513,0.000042561915,0.000030656734,0.000058659298,0.000005463611,0.000014467134,0.000057057645],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99867994,0.00012436364,0.0006095932,0.00017941148,0.0002137169,0.00019297263],"domain_scores_gemma":[0.996651,0.0015633642,0.00023806375,0.0013889065,0.00009587704,0.00006279962],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00058740017,0.00016383904,0.0004995908,0.00006234593,0.00012942404,0.00004056585,0.00065287354,0.000075495256,0.000022247157],"category_scores_gemma":[0.00033776098,0.0001433664,0.00009207541,0.00050813524,0.00021693858,0.0001423873,0.00008500477,0.00024774595,0.000012468476],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00005718027,0.0008795756,0.0001182567,0.00013850638,0.000021416634,3.7118548e-7,0.000682604,0.000020310232,0.0007075847,0.9936385,0.00031869824,0.0034169948],"study_design_scores_gemma":[0.0018169737,0.00003665369,0.00038069865,0.00017040964,0.000066696244,0.0000050849317,0.00012094121,0.005162768,0.0006698056,0.9912636,0.00015218233,0.00015412825],"about_ca_topic_score_codex":0.0000037323402,"about_ca_topic_score_gemma":0.000004599698,"teacher_disagreement_score":0.598936,"about_ca_system_score_codex":0.000027009393,"about_ca_system_score_gemma":0.00003233261,"threshold_uncertainty_score":0.5846312},"labels":[],"label_agreement":null},{"id":"W2140069270","doi":"10.1007/s00220-014-2085-y","title":"Electrical Resistance of the Low Dimensional Critical Branching Random Walk","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":6,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Random walk; Branching (polymer chemistry); Branching random walk; Constant (computer programming); Heterogeneous random walk in one dimension; Physical constant; Electrical resistance and conductance","score_opus":0.04242070298006569,"score_gpt":0.3457338510429823,"score_spread":0.30331314806291665,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2140069270","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0030533555,0.00009797778,0.9881892,0.0015539143,0.000065853004,0.0003167661,0.000012700766,0.00004205472,0.0066681355],"genre_scores_gemma":[0.8233388,0.0000054906864,0.17634103,0.00013399079,0.000035096957,0.00005211079,0.0000019043945,0.000023618859,0.00006792694],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99798787,0.00031625686,0.0007812951,0.00019885636,0.00043515337,0.00028056995],"domain_scores_gemma":[0.9836016,0.014286336,0.00016168653,0.0017041514,0.00017519447,0.000070978145],"candidate_categories":["metaresearch"],"consensus_categories":[],"category_scores_codex":[0.00084479357,0.0001700265,0.0004713847,0.000032304786,0.00020583588,0.000024320538,0.001173255,0.000091812144,0.000028348597],"category_scores_gemma":[0.018148918,0.00012216475,0.00013541298,0.00047511075,0.00044129102,0.000070609174,0.0004359379,0.00052857504,0.000018353408],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00002190108,0.00053535984,0.000013471216,0.00028447123,0.000008476553,1.9125024e-7,0.00016435108,0.000011294064,0.00023103679,0.9972692,0.00022797381,0.0012322615],"study_design_scores_gemma":[0.0004675354,0.000017475675,0.00003331968,0.00035939374,0.00003954303,0.000002327242,0.000015957168,0.10816794,0.00040803468,0.8902794,0.000082143226,0.0001269061],"about_ca_topic_score_codex":0.0000011737854,"about_ca_topic_score_gemma":0.0000074819636,"teacher_disagreement_score":0.8202855,"about_ca_system_score_codex":0.000047140926,"about_ca_system_score_gemma":0.00005185836,"threshold_uncertainty_score":0.9901216},"labels":[],"label_agreement":null},{"id":"W2140701543","doi":"10.1007/s00220-006-1525-8","title":"Decay of Solutions of the Wave Equation in the Kerr Geometry","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":134,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Angular momentum; Massless particle; Ode; Event horizon; Scalar (mathematics); Mathematical analysis; Mathematics; Wave equation; Representation (politics); Scalar field; Real line; Variable (mathematics); Physics; Classical mechanics; Mathematical physics; Geometry; Horizon","score_opus":0.18976697352646896,"score_gpt":0.36275843272163655,"score_spread":0.1729914591951676,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2140701543","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.12294988,0.00034637225,0.7704547,0.0025103888,0.000071312024,0.0028771667,0.00005002008,0.00007967636,0.10066048],"genre_scores_gemma":[0.9194638,0.000012446685,0.08026241,0.000027624172,0.00001995669,0.000135752,0.000008061038,0.000025430094,0.000044534852],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9975508,0.0003808457,0.0011409187,0.00015998053,0.00048679125,0.00028069192],"domain_scores_gemma":[0.991587,0.004666007,0.00064700167,0.002930272,0.00015062973,0.000019085674],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0013022302,0.00018232304,0.00044474486,0.000085839725,0.00012871057,0.000014409054,0.0015719059,0.00008886098,0.0000186513],"category_scores_gemma":[0.0010686952,0.00011950936,0.00018236677,0.0014033339,0.00072487927,0.0001629108,0.00056629936,0.00047690482,0.000010069062],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000022077397,0.0017147684,0.000096852535,0.00024081863,0.000009101333,1.2242499e-7,0.0009810622,0.00029442486,0.0010171541,0.99515355,0.00012144803,0.00036847737],"study_design_scores_gemma":[0.00027225568,0.000013887039,0.00048577474,0.00028494478,0.000038587605,0.0000018886669,0.00040563708,0.01600948,0.0019213855,0.9804342,0.00001759816,0.00011438139],"about_ca_topic_score_codex":0.000021564874,"about_ca_topic_score_gemma":0.000042877353,"teacher_disagreement_score":0.7965139,"about_ca_system_score_codex":0.00008816798,"about_ca_system_score_gemma":0.000059059777,"threshold_uncertainty_score":0.48734504},"labels":[],"label_agreement":null},{"id":"W2141448503","doi":"10.1007/s00220-014-2037-6","title":"Operator Systems from Discrete Groups","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":37,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Regina","funders":"Engineering and Physical Sciences Research Council; Natural Sciences and Engineering Research Council of Canada; Queen's University; Queen's University Belfast; National Science Foundation","keywords":"Tensor product; Operator (biology); Mathematics; Group (periodic table); Tensor (intrinsic definition); Quasinormal operator; Tensor operator; Shift operator; Pure mathematics; Product (mathematics); Algebra over a field; Tensor product of algebras; Tensor product of Hilbert spaces; Semi-elliptic operator; Discrete mathematics; Compact operator; Tensor contraction; Finite-rank operator; Mathematical analysis; Computer science; Quantum mechanics; Physics; Differential operator; Geometry","score_opus":0.1048844329764564,"score_gpt":0.40390541418744824,"score_spread":0.29902098121099185,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2141448503","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.10993878,0.00056511565,0.8430114,0.0010166557,0.00014654871,0.0015218945,0.0000682349,0.00038817554,0.043343198],"genre_scores_gemma":[0.8598182,0.000060678503,0.13934456,0.000055705506,0.00012544155,0.00030143413,0.000034885114,0.000068591515,0.00019048301],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9977477,0.00055317587,0.00062917906,0.00029681146,0.0004097089,0.00036338883],"domain_scores_gemma":[0.9920578,0.0038036704,0.00011126297,0.0037563513,0.0001375924,0.00013330784],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00075478817,0.00022864676,0.000495633,0.000058249952,0.00020707647,0.00013321183,0.0018106308,0.00010740828,0.000078538105],"category_scores_gemma":[0.001707166,0.00020113747,0.000084519415,0.00033842496,0.0003281692,0.0002843496,0.00084467593,0.0005932406,0.0006090008],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000040858426,0.00033707163,0.00014736538,0.00008796669,0.00002110063,5.963108e-7,0.00059128564,0.000062118845,0.0003400647,0.997055,0.00037526054,0.0009780729],"study_design_scores_gemma":[0.00035788186,0.000023348934,0.000048469123,0.0002070573,0.000017586945,0.0000012709761,0.00034015533,0.10127645,0.00020368498,0.89637107,0.0009231864,0.00022986675],"about_ca_topic_score_codex":0.000016700413,"about_ca_topic_score_gemma":0.000015628497,"teacher_disagreement_score":0.7498794,"about_ca_system_score_codex":0.00013214402,"about_ca_system_score_gemma":0.00003924873,"threshold_uncertainty_score":0.8202148},"labels":[],"label_agreement":null},{"id":"W2144784853","doi":"10.1007/s00220-015-2353-5","title":"Critical Two-Point Function of the 4-Dimensional Weakly Self-Avoiding Walk","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Particle physics theoretical and experimental studies","field":"Physics and Astronomy","cited_by":55,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Pointwise; Critical exponent; Critical point (mathematics); Dimension (graph theory); Observable; Critical dimension; Mathematics; Function (biology); Mathematical physics; Physics; Combinatorics; Mathematical analysis; Quantum mechanics; Phase transition","score_opus":0.05170304601760899,"score_gpt":0.33496203143919,"score_spread":0.283258985421581,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2144784853","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.82927984,0.00037699135,0.042294342,0.004123062,0.0002656952,0.0005987613,0.000027853323,0.0001020249,0.12293141],"genre_scores_gemma":[0.99107563,0.0000010811901,0.008736694,0.00003652907,0.000065883585,0.000057673722,0.0000042832985,0.000012108152,0.000010097333],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989194,0.00021244989,0.0003267843,0.0001275946,0.00022350418,0.00019024513],"domain_scores_gemma":[0.9982497,0.0006344147,0.00006932201,0.0008504609,0.00012071247,0.00007539054],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00033764183,0.00012262113,0.00021515986,0.000012885023,0.0001921497,0.000020439624,0.00048542852,0.000018964753,0.000034142267],"category_scores_gemma":[0.00009242497,0.00008871726,0.000107239866,0.00026747157,0.0005167369,0.00014132181,0.0007093027,0.00027122875,0.00008465544],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008198309,0.0009933136,0.0015403844,0.0000106697225,0.000029872574,3.7280536e-8,0.0007811566,0.000072251554,0.0022921201,0.99338084,0.00012497033,0.0007662045],"study_design_scores_gemma":[0.00027978295,0.000023771136,0.00013122203,0.000059290433,0.000035990994,2.484538e-7,0.001026654,0.012820943,0.01840155,0.9670549,0.000062782514,0.00010288104],"about_ca_topic_score_codex":0.000014714276,"about_ca_topic_score_gemma":3.5664075e-7,"teacher_disagreement_score":0.1617958,"about_ca_system_score_codex":0.00004605096,"about_ca_system_score_gemma":0.00003609416,"threshold_uncertainty_score":0.36177847},"labels":[],"label_agreement":null},{"id":"W2146201014","doi":"10.1007/s00220-014-1984-2","title":"Forward Discretely Self-Similar Solutions of the Navier–Stokes Equations","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Navier-Stokes equation solutions","field":"Mathematics","cited_by":48,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Navier–Stokes equations; Work (physics); Mathematics; Complex system; Mathematical analysis; Non-dimensionalization and scaling of the Navier–Stokes equations; Nonlinear system; Hagen–Poiseuille flow from the Navier–Stokes equations; Physics; Compressibility; Mechanics; Computer science; Thermodynamics; Quantum mechanics","score_opus":0.14405411510074154,"score_gpt":0.37113253711308325,"score_spread":0.2270784220123417,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2146201014","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0070084827,0.00017341174,0.9378619,0.006306839,0.00014364115,0.0014218835,0.000083568986,0.00027689777,0.04672336],"genre_scores_gemma":[0.8346179,0.000035011748,0.16466378,0.00009870637,0.000048833466,0.00027905745,0.000021762582,0.000045961802,0.00018899808],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9969571,0.00076068414,0.0010943173,0.0002462597,0.00053665583,0.0004049849],"domain_scores_gemma":[0.9896433,0.005259932,0.0004787736,0.004223324,0.00030228245,0.00009238554],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0014236217,0.00025679442,0.0004953557,0.00010728938,0.0006499164,0.000041434083,0.002098263,0.00013738479,0.0000607344],"category_scores_gemma":[0.0034109524,0.00020855783,0.00032149715,0.0010262907,0.0006809252,0.00027387246,0.0009604887,0.000574189,0.00013778216],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000014770866,0.0008473612,0.0001237498,0.000105236584,0.00003528708,3.7766718e-8,0.0016258765,0.00010111539,0.00020368514,0.9952896,0.0005968134,0.001069731],"study_design_scores_gemma":[0.0003508625,0.000020431313,0.00030966467,0.0001894068,0.00014613017,0.0000016514992,0.00027819324,0.08067291,0.00013906577,0.9157859,0.0018954959,0.00021028404],"about_ca_topic_score_codex":0.000007759283,"about_ca_topic_score_gemma":0.00004940776,"teacher_disagreement_score":0.8276094,"about_ca_system_score_codex":0.00018265788,"about_ca_system_score_gemma":0.0001367362,"threshold_uncertainty_score":0.8504741},"labels":[],"label_agreement":null},{"id":"W2146341326","doi":"10.1007/s00220-010-1036-5","title":"Holomorphic Factorization for a Quantum Tetrahedron","year":2010,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Noncommutative and Quantum Gravity Theories","field":"Physics and Astronomy","cited_by":67,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Science and Technology Facilities Council","keywords":"Holomorphic function; Tetrahedron; Symplectic geometry; Pure mathematics; Symplectic manifold; Mathematics; Factorization; Geometric quantization; Hilbert space; Invariant (physics); Boundary (topology); Mathematical physics; Physics; Quantum; Quantum mechanics; Mathematical analysis; Quantum gravity; Geometry; Canonical quantization","score_opus":0.04830619228530349,"score_gpt":0.3540372451518565,"score_spread":0.305731052866553,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2146341326","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.15694185,0.000018443641,0.82667154,0.00064819667,0.00013294368,0.0006541803,0.00010929653,0.000061868996,0.014761705],"genre_scores_gemma":[0.9763633,0.000002088963,0.023036111,0.00002344221,0.000102607286,0.00021363936,0.0001670438,0.000022501028,0.00006926816],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99923474,0.00006693461,0.000282428,0.00013716552,0.00009074105,0.00018801284],"domain_scores_gemma":[0.9977363,0.0009228129,0.00009977086,0.0010970475,0.00009823709,0.000045868554],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002826898,0.00013317724,0.00021352644,0.00003839667,0.00020267675,0.00004811189,0.0006153248,0.000045471585,0.00008623261],"category_scores_gemma":[0.00008313827,0.00012598473,0.000089786845,0.00022819269,0.00028962185,0.00016776889,0.00014168386,0.00038383523,0.00006077898],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000039992383,0.0004568612,0.002606035,0.000018959085,0.000012860699,3.4427448e-8,0.0006665614,0.0000041586663,0.0028364954,0.98945683,0.00005896934,0.003878259],"study_design_scores_gemma":[0.00031180086,0.0000244602,0.00039876773,0.000023962875,0.000015907144,2.312952e-7,0.0003895334,0.010668355,0.001451587,0.9851909,0.0013773853,0.00014706336],"about_ca_topic_score_codex":0.000011901886,"about_ca_topic_score_gemma":0.0000071673508,"teacher_disagreement_score":0.81942147,"about_ca_system_score_codex":0.000012254719,"about_ca_system_score_gemma":0.000038100185,"threshold_uncertainty_score":0.51375085},"labels":[],"label_agreement":null},{"id":"W2149027107","doi":"10.1007/s00220-011-1323-9","title":"Exactness of the Fock Space Representation of the q-Commutation Relations","year":2011,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":20,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"","keywords":"Fock space; Commutation; Representation (politics); Interval (graph theory); Mathematics; Algebra over a field; Space (punctuation); Gaussian; Von Neumann architecture; Pure mathematics; Quantum mechanics; Physics; Combinatorics; Computer science","score_opus":0.17811152592217255,"score_gpt":0.37459180998581426,"score_spread":0.1964802840636417,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2149027107","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6535746,0.00018754015,0.16008244,0.0040875715,0.00014799066,0.0036494841,0.000052204876,0.00010148971,0.17811671],"genre_scores_gemma":[0.95759314,0.000021841446,0.041982695,0.000010776862,0.000009770262,0.0001293326,0.0000031307025,0.000017384978,0.00023191952],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985534,0.00030050034,0.0006687773,0.000113830494,0.00025172532,0.00011174557],"domain_scores_gemma":[0.99456996,0.0016295243,0.00058217434,0.0030255602,0.00017250158,0.000020261563],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00036346517,0.000107687214,0.00025710237,0.00003714269,0.00019578756,0.000008783138,0.0014472624,0.00006414888,0.000037574337],"category_scores_gemma":[0.00071623834,0.00006912457,0.00018050453,0.0010897178,0.0004385067,0.00012689983,0.00046065482,0.0002547956,0.000009883784],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004734434,0.0006117602,0.002984221,0.000075977914,0.00001836578,1.3280725e-8,0.004090084,0.000053633856,0.00041736788,0.9911091,0.00017653995,0.00045825596],"study_design_scores_gemma":[0.00030794597,0.000006344848,0.011280732,0.00014416805,0.00008080134,0.0000011585975,0.0007515559,0.0043425094,0.005591802,0.97737336,0.000046125217,0.00007350559],"about_ca_topic_score_codex":0.000043499516,"about_ca_topic_score_gemma":0.000033836408,"teacher_disagreement_score":0.3040186,"about_ca_system_score_codex":0.000036047957,"about_ca_system_score_gemma":0.00004909747,"threshold_uncertainty_score":0.28188184},"labels":[],"label_agreement":null},{"id":"W2150964489","doi":"10.1007/s00220-010-1054-3","title":"Renormalized Area and Properly Embedded Minimal Surfaces in Hyperbolic 3-Manifolds","year":2010,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":66,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Moduli space; Boundary (topology); Mathematics; Minimal surface; Manifold (fluid mechanics); Pure mathematics; Hyperbolic space; Surface (topology); Space (punctuation); Regular polygon; Mathematical analysis; Geometry","score_opus":0.02470577056076387,"score_gpt":0.2868676861764795,"score_spread":0.2621619156157156,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2150964489","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9242784,0.000042582928,0.0020009133,0.0003955394,0.000027414979,0.0003509097,0.000015153054,0.000031787586,0.07285732],"genre_scores_gemma":[0.98875743,0.0000111136305,0.010957152,0.000029124916,0.000050207633,0.00007965088,0.000025607284,0.000026553684,0.00006315971],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988698,0.000094809264,0.00040261468,0.00021939409,0.00013110384,0.00028227933],"domain_scores_gemma":[0.99820167,0.00037636072,0.00008096355,0.0012023742,0.000052159852,0.00008644504],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00028574295,0.00019236615,0.00034608404,0.000041226496,0.00010133969,0.00007576233,0.00064011966,0.00006714163,0.0001200812],"category_scores_gemma":[0.000032925345,0.0001696787,0.00006351903,0.00030785002,0.00050572085,0.00018967497,0.00038896024,0.0006519496,0.00005543797],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000007351775,0.0006885042,0.0032189602,0.000023487253,0.000011240101,3.5922423e-7,0.0009578652,0.000009490892,0.0008670034,0.98980415,0.000018470259,0.0043931347],"study_design_scores_gemma":[0.0005544056,0.000020215279,0.0017971079,0.000063178144,0.000016252012,8.1334616e-7,0.00043734332,0.014580051,0.00045934645,0.9816695,0.00018695192,0.00021487498],"about_ca_topic_score_codex":0.000036730053,"about_ca_topic_score_gemma":0.000020809584,"teacher_disagreement_score":0.07279416,"about_ca_system_score_codex":0.0000112347825,"about_ca_system_score_gemma":0.00003706776,"threshold_uncertainty_score":0.6919296},"labels":[],"label_agreement":null},{"id":"W2154785815","doi":"10.1007/s00220-011-1329-3","title":"The Exoticness and Realisability of Twisted Haagerup–Izumi Modular Data","year":2011,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Topological Materials and Phenomena","field":"Physics and Astronomy","cited_by":49,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"","keywords":"Modular design; Uniqueness; Vertex operator algebra; Type (biology); Central charge; Conformal map; Conformal field theory; Realisation; Operator algebra","score_opus":0.2632544240816146,"score_gpt":0.3457086132556261,"score_spread":0.08245418917401148,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2154785815","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.85387397,0.00042532315,0.0541315,0.0009768023,0.00008755716,0.0008710026,0.00031307316,0.000053516967,0.089267254],"genre_scores_gemma":[0.9894135,0.000022629967,0.010446354,0.000008507,0.000021843656,0.000026485803,0.000034649205,0.0000075320604,0.00001848488],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99913275,0.00018384603,0.00034206515,0.00014242416,0.00007185634,0.00012706652],"domain_scores_gemma":[0.99645513,0.00057077274,0.000107953834,0.0027922299,0.000039415037,0.000034471956],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004956649,0.00008956667,0.00020216279,0.000007230968,0.00013052074,0.000024499868,0.0012270726,0.000023657522,0.00007513846],"category_scores_gemma":[0.000060255785,0.000060029368,0.000025715866,0.00010794017,0.0006893084,0.00009677981,0.0010289953,0.00012444485,0.000008082024],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000005723732,0.00039218098,0.001286429,0.000026338392,0.000015405141,4.2635172e-8,0.00076739554,0.000001285448,0.00015005478,0.9938257,0.000012623561,0.003516849],"study_design_scores_gemma":[0.00011760462,0.000011703995,0.0052997926,0.000023094797,0.00001599319,1.4989035e-7,0.00051428337,0.003189833,0.00022236629,0.9903898,0.00014412038,0.00007121578],"about_ca_topic_score_codex":0.00010489531,"about_ca_topic_score_gemma":0.000004915451,"teacher_disagreement_score":0.13553955,"about_ca_system_score_codex":0.000006169931,"about_ca_system_score_gemma":0.000013445234,"threshold_uncertainty_score":0.25397855},"labels":[],"label_agreement":null},{"id":"W2158989063","doi":"10.1007/s00220-007-0255-x","title":"Geometrical (2+1)-Gravity and the Chern-Simons Formulation: Grafting, Dehn Twists, Wilson Loop Observables and the Cosmological Constant","year":2007,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":32,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Physics; Cosmological constant; Mathematical physics; Chern–Simons theory; Observable; Infinitesimal; Geodesic; Noncommutative geometry; Gauge theory; Quantum mechanics; Geometry; Mathematics; Mathematical analysis","score_opus":0.035980196868937706,"score_gpt":0.2989925656828192,"score_spread":0.26301236881388146,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2158989063","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.41661814,0.0014877677,0.5090571,0.008255529,0.000060248327,0.0019416393,0.00004475445,0.00009355373,0.062441245],"genre_scores_gemma":[0.99477875,0.00007805729,0.0047405967,0.00018929417,0.00007732302,0.000058087582,0.0000207012,0.000017658664,0.000039514136],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9983784,0.00030391215,0.00052906986,0.00022591972,0.00022373565,0.0003389739],"domain_scores_gemma":[0.99249923,0.0060088974,0.0001668572,0.0011336631,0.000093146424,0.00009818416],"candidate_categories":["sts"],"consensus_categories":[],"category_scores_codex":[0.0018625977,0.00021867137,0.00045397447,0.000028769886,0.00042420134,0.00013320635,0.0006751067,0.00007272558,0.000021155784],"category_scores_gemma":[0.00021898121,0.00012238868,0.00012715506,0.000528786,0.0035389746,0.00011262753,0.00072772626,0.00064969936,0.0000132551795],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00007212235,0.0002882486,0.002614656,0.000015805448,0.00004017058,3.0283383e-7,0.0005963202,0.000008055675,0.0000031342659,0.9879764,0.000021616723,0.008363213],"study_design_scores_gemma":[0.0021574358,0.00001602893,0.0016151047,0.000042452888,0.00007488228,0.0000021116614,0.0006623497,0.015031554,0.000028997549,0.97990507,0.00030713732,0.00015688755],"about_ca_topic_score_codex":0.000050348885,"about_ca_topic_score_gemma":0.000006973472,"teacher_disagreement_score":0.57816064,"about_ca_system_score_codex":0.000026828813,"about_ca_system_score_gemma":0.000024318537,"threshold_uncertainty_score":0.9991728},"labels":[],"label_agreement":null},{"id":"W2162218830","doi":"10.1007/s00220-008-0501-x","title":"Equivariant Volumes of Non-Compact Quotients and Instanton Counting","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":10,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Equivariant map; Instanton; Symplectic geometry; Moduli space; Quotient; Geometric invariant theory; Iterated function","score_opus":0.13813039421385637,"score_gpt":0.35961696939179605,"score_spread":0.22148657517793968,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2162218830","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.92875516,0.00012777993,0.036769334,0.00018419731,0.0000264369,0.00035149662,0.000009915269,0.000052673397,0.033723027],"genre_scores_gemma":[0.9498191,0.00008115646,0.04993665,0.000019091283,0.000014734843,0.000011665857,0.0000049785176,0.000018843719,0.00009380522],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987945,0.00008776487,0.0005380983,0.00014492989,0.00023062833,0.00020406954],"domain_scores_gemma":[0.99726915,0.001005499,0.00020330452,0.0013739804,0.000096834745,0.000051238298],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003843546,0.00014783215,0.00040555632,0.000080888305,0.00017480104,0.000016458096,0.00066631875,0.000060946197,0.000030046473],"category_scores_gemma":[0.00032092628,0.00014059953,0.000064471744,0.00043515803,0.0003682504,0.00016079182,0.00038090342,0.0002340143,0.000018532091],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008961598,0.0014422929,0.0078188535,0.00037854514,0.00004194143,0.0000023556927,0.0036947438,0.000014065381,0.0007572425,0.98423547,0.0003332662,0.0012722758],"study_design_scores_gemma":[0.00047473708,0.000049755403,0.0069823177,0.00028582857,0.000031745585,0.000019299288,0.00047824447,0.03330976,0.00046901364,0.9575632,0.00013430542,0.00020175271],"about_ca_topic_score_codex":0.000017687144,"about_ca_topic_score_gemma":0.0000046904333,"teacher_disagreement_score":0.03362922,"about_ca_system_score_codex":0.000037500937,"about_ca_system_score_gemma":0.00003954469,"threshold_uncertainty_score":0.5733483},"labels":[],"label_agreement":null},{"id":"W2162867770","doi":"10.1007/s00220-005-1449-8","title":"The Independence on Boundary Conditions for the Thermodynamic Limit of Charged Systems","year":2005,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":2,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Boundary (topology); Neumann boundary condition; Bounded function; Mathematics; Limit (mathematics); Dirichlet boundary condition; Scaling; Limiting; Boundary value problem; Thermodynamic limit; Independence (probability theory); Mathematical analysis; Dirichlet distribution; Limit set; Mixed boundary condition; Scaling limit; Physics; Statistical physics; Geometry","score_opus":0.10021279246069952,"score_gpt":0.38724262621429956,"score_spread":0.2870298337536,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2162867770","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.11465412,0.0035409492,0.65667224,0.02897261,0.0008181012,0.018364573,0.00055920257,0.0008433789,0.17557484],"genre_scores_gemma":[0.9858729,0.00015221816,0.012351842,0.000097446,0.00013185287,0.0010612431,0.000010192951,0.00006281754,0.0002594739],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9976404,0.0003246011,0.00092881185,0.00021846824,0.00050347135,0.0003842805],"domain_scores_gemma":[0.96804446,0.027763274,0.0003984251,0.003517305,0.00022157005,0.000054966036],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0018430691,0.0002643157,0.00045796428,0.00004341574,0.0007819514,0.00010823233,0.0025731402,0.00011516939,0.000023776853],"category_scores_gemma":[0.0017463295,0.00015959282,0.0002382041,0.00034752933,0.0011785117,0.00015238645,0.00029046516,0.0006628336,0.00011807714],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001977546,0.0008142195,0.000003944143,0.00013769876,0.0000756077,8.741474e-8,0.00069455575,0.00022202249,0.00024587437,0.99496996,0.00031217374,0.0025040854],"study_design_scores_gemma":[0.0002882047,0.00004587424,0.00003074261,0.00020985128,0.00006810016,0.000002544423,0.00048780328,0.14469823,0.00022590744,0.85310817,0.0006805674,0.00015397578],"about_ca_topic_score_codex":0.0000025652114,"about_ca_topic_score_gemma":0.000016969578,"teacher_disagreement_score":0.8712188,"about_ca_system_score_codex":0.00016032578,"about_ca_system_score_gemma":0.000082235856,"threshold_uncertainty_score":0.65080065},"labels":[],"label_agreement":null},{"id":"W2167626966","doi":"10.1007/s00220-011-1399-2","title":"Minimizers of the Lawrence–Doniach Functional with Oblique Magnetic Fields","year":2012,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Physics of Superconductivity and Magnetism","field":"Physics and Astronomy","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McMaster University","funders":"","keywords":"Magnetic field; Vortex; Physics; Superconductivity; Anisotropy; Condensed matter physics; Lattice (music); Magnetic flux; Geometry; Mathematics; Quantum mechanics","score_opus":0.046134190947264384,"score_gpt":0.2700797563549344,"score_spread":0.22394556540767002,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2167626966","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6420137,0.0003800995,0.13827461,0.0032692146,0.00017643427,0.0008510228,0.000046406567,0.000045089113,0.21494342],"genre_scores_gemma":[0.99121,0.0000046520345,0.00837511,0.000046535086,0.000067505716,0.000076667915,0.000009765471,0.0000107401,0.00019901762],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9992958,0.00008797834,0.00019745072,0.00008629814,0.00014975212,0.00018275986],"domain_scores_gemma":[0.99843436,0.00032520047,0.000070095535,0.0010764328,0.000051264673,0.000042654214],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00013981717,0.000108469256,0.00017123397,0.000018440656,0.00010319426,0.000012825021,0.00054303266,0.0000325384,0.00017359163],"category_scores_gemma":[0.000011360161,0.000077818535,0.00007710417,0.00026264193,0.00039314927,0.00046856544,0.000250363,0.0002984675,0.000023964654],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004092683,0.0009330159,0.0055136867,0.000022337634,0.00001785962,1.496453e-8,0.0009921581,0.00006923806,0.00047357782,0.987995,0.00015672964,0.003822288],"study_design_scores_gemma":[0.00048104094,0.00004001349,0.006576166,0.00012011125,0.000055839275,0.0000011090359,0.00093145116,0.001081404,0.0018159981,0.9880321,0.00065808435,0.00020668046],"about_ca_topic_score_codex":0.000035017292,"about_ca_topic_score_gemma":0.000003899101,"teacher_disagreement_score":0.3491963,"about_ca_system_score_codex":0.000012722868,"about_ca_system_score_gemma":0.000050623326,"threshold_uncertainty_score":0.3173348},"labels":[],"label_agreement":null},{"id":"W2168267254","doi":"10.1007/s00220-002-0728-x","title":"Construction of the Incipient Infinite Cluster for Spread-out Oriented Percolation Above 4 + 1 Dimensions","year":2002,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":42,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"Natural Sciences and Engineering Research Council of Canada; Microsoft Research","keywords":"Percolation (cognitive psychology); Intersection (aeronautics); Mathematics; Measure (data warehouse); Cluster (spacecraft); Event (particle physics); Dimension (graph theory); Limiting; Probability measure; Continuum percolation theory; Brownian motion; Combinatorics; Percolation critical exponents; Statistical physics; Discrete mathematics; Critical exponent; Statistics; Physics; Computer science; Geometry; Quantum mechanics; Data mining","score_opus":0.10903077289829619,"score_gpt":0.3527048261011741,"score_spread":0.2436740532028779,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2168267254","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0074727884,0.000046626814,0.9867061,0.0010102561,0.00012686312,0.001030257,0.00007604662,0.000038367027,0.003492698],"genre_scores_gemma":[0.62749946,0.000029608458,0.37198225,0.00010018947,0.000028075474,0.0002176005,0.000010237923,0.000025772906,0.00010678473],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9986719,0.00009963941,0.0006376765,0.00015906572,0.00024245048,0.00018930342],"domain_scores_gemma":[0.99439645,0.0036795323,0.00026141282,0.0013421406,0.00027413483,0.000046322843],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002961004,0.00014622067,0.00029767095,0.000043399195,0.00019466391,0.000016634407,0.0005285615,0.00009034984,0.000044225566],"category_scores_gemma":[0.0032426193,0.00011095527,0.0001100649,0.0003549757,0.00029121598,0.00009226738,0.000328785,0.0002441247,0.000019207879],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000076279475,0.000493244,0.000024819428,0.0001638224,0.000016566453,3.5773397e-8,0.0016837538,0.000022730275,0.00012445463,0.99527717,0.00031427437,0.0018715273],"study_design_scores_gemma":[0.00036068165,0.000032561315,0.00001719429,0.00019625408,0.000059824408,0.0000020753914,0.0002417265,0.24738324,0.0001793352,0.7511568,0.0002768362,0.00009345271],"about_ca_topic_score_codex":0.0000013601474,"about_ca_topic_score_gemma":0.000011183223,"teacher_disagreement_score":0.6200267,"about_ca_system_score_codex":0.000069935784,"about_ca_system_score_gemma":0.000024335164,"threshold_uncertainty_score":0.45246243},"labels":[],"label_agreement":null},{"id":"W2171174914","doi":"10.1007/s00220-016-2647-2","title":"The Quantum Superalgebra $${\\mathfrak{osp}_{q}(1|2)}$$ osp q ( 1 | 2 ) and a q-Generalization of the Bannai–Ito Polynomials","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":8,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal","funders":"","keywords":"Superalgebra; Orthogonal polynomials; Quantum; Pure mathematics; Algebra over a field; Mathematics; Physics; Mathematical physics; Quantum mechanics","score_opus":0.025193838242605335,"score_gpt":0.29552007212483306,"score_spread":0.2703262338822277,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2171174914","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9288727,0.0006264984,0.03681709,0.018388875,0.00022913249,0.0011380462,0.00018655349,0.000049123126,0.013691992],"genre_scores_gemma":[0.9974195,0.0000852068,0.0019286899,0.00004186888,0.00010608584,0.00004475046,0.0000073569877,0.000017844837,0.00034873263],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989771,0.00019092567,0.00039477306,0.000121654855,0.0001320068,0.00018351237],"domain_scores_gemma":[0.997464,0.0007915178,0.00013082438,0.0015022098,0.00007140328,0.00004004155],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00028918686,0.00012253597,0.00019749248,0.000014727887,0.00031637834,0.000046423138,0.0007636958,0.000034492645,0.000032478107],"category_scores_gemma":[0.00006904518,0.000061143735,0.00009548973,0.00019979579,0.00050960074,0.00010479931,0.00044074332,0.00013410223,0.000015527588],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000022643972,0.00015835818,0.0028227798,0.000010450553,0.000020443425,1.5773836e-8,0.0004038405,0.0000044959693,0.0016834167,0.9894529,0.00027181912,0.005169225],"study_design_scores_gemma":[0.00033674724,0.000013176694,0.0028839211,0.00014639448,0.000025155603,4.441209e-7,0.0002985261,0.005944247,0.0019561036,0.98521966,0.0030434472,0.00013220268],"about_ca_topic_score_codex":0.000031381274,"about_ca_topic_score_gemma":0.000007722238,"teacher_disagreement_score":0.06854677,"about_ca_system_score_codex":0.000018251276,"about_ca_system_score_gemma":0.00004945186,"threshold_uncertainty_score":0.24933693},"labels":[],"label_agreement":null},{"id":"W2196563700","doi":"10.1007/s00220-017-2936-4","title":"Dirac Geometry of the Holonomy Fibration","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Homotopy and Cohomology in Algebraic Topology","field":"Mathematics","cited_by":9,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; University of Toronto; National Science Foundation","keywords":"Mathematics; Morphism; Poisson manifold; Fibration; Pure mathematics; Hamiltonian (control theory); Holonomy; Differential geometry; Poisson bracket; Lie group; Dirac (video compression format); Dirac operator; Algebra over a field; Mathematical physics; Lie algebra; Symplectic geometry; Physics; Homotopy; Quantum mechanics","score_opus":0.11113292457489408,"score_gpt":0.3911453629333129,"score_spread":0.2800124383584188,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2196563700","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8460726,0.00011869233,0.030812554,0.01021196,0.00023281736,0.0009188795,0.000017202627,0.00007470721,0.11154058],"genre_scores_gemma":[0.9751205,0.00001907839,0.024461033,0.000052319214,0.000028818986,0.000058262805,0.0000021475357,0.000012891566,0.00024497375],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990057,0.00019274368,0.0004072809,0.00012068896,0.0001223238,0.00015128967],"domain_scores_gemma":[0.99374425,0.0011563736,0.00038401884,0.004633627,0.00005811762,0.000023623868],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00045965085,0.000104616345,0.00027162986,0.000029689274,0.00041693437,0.000026913707,0.0024417145,0.000111331465,0.00005476114],"category_scores_gemma":[0.0017976352,0.00007879958,0.00010236804,0.00011686459,0.0012820225,0.0001424399,0.0009860458,0.0003360857,0.000032589942],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000022515815,0.00032183877,0.00351915,0.00005102079,0.000016016558,2.4536467e-7,0.00045808143,0.000001356636,0.00012158181,0.9931317,0.00013012678,0.0022466127],"study_design_scores_gemma":[0.0001829661,0.000012566106,0.006442807,0.00007437491,0.000023737588,0.0000035809564,0.000081480095,0.0008277291,0.0013203621,0.9907877,0.00016434149,0.000078345176],"about_ca_topic_score_codex":0.000006204418,"about_ca_topic_score_gemma":0.0000165076,"teacher_disagreement_score":0.12904787,"about_ca_system_score_codex":0.000028061488,"about_ca_system_score_gemma":0.000043110376,"threshold_uncertainty_score":0.47236654},"labels":[],"label_agreement":null},{"id":"W2215265677","doi":"10.1007/s00220-016-2675-y","title":"Deformations of Nearly Kähler Instantons","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":16,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute; University of Waterloo","funders":"Engineering and Physical Sciences Research Council; Institut Périmètre de physique théorique; Industry Canada; Natural Sciences and Engineering Research Council of Canada; Division of Mathematical Sciences; Government of Canada","keywords":"Instanton; Tangent bundle; Connection (principal bundle); Group (periodic table); Spinor; Abelian group; Homogeneous; Space (punctuation)","score_opus":0.17018989096850304,"score_gpt":0.3753833041817879,"score_spread":0.20519341321328485,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2215265677","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.12565772,0.00010101391,0.70174986,0.0028960782,0.000059250793,0.00071107567,0.00005809873,0.0002011319,0.16856577],"genre_scores_gemma":[0.9065524,0.0000347349,0.09297298,0.000026361637,0.000015100717,0.000059324193,0.000003340452,0.000018477662,0.0003173114],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987081,0.00012344892,0.00062466343,0.00011978627,0.00021629134,0.00020768918],"domain_scores_gemma":[0.9956391,0.001847624,0.00018754654,0.0021392647,0.0001332467,0.000053252523],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00040589276,0.0001341287,0.00030570154,0.00009825124,0.00010028677,0.000016042857,0.0010268759,0.00006758775,0.00017263646],"category_scores_gemma":[0.00064214517,0.00009497108,0.00010391263,0.00056223146,0.00031285404,0.00026529768,0.0004131449,0.00015000592,0.00016782613],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000028305976,0.00059700204,0.0002259744,0.00007372257,0.000017211816,1.8072944e-7,0.0006095839,0.0000020667137,0.00064803945,0.99275523,0.00023600846,0.00483215],"study_design_scores_gemma":[0.00032603747,0.000024668347,0.0003630659,0.00022514653,0.00002130665,0.000003048839,0.000197784,0.0008340024,0.00069790287,0.99647677,0.0007008912,0.00012940363],"about_ca_topic_score_codex":0.000003111323,"about_ca_topic_score_gemma":0.000011504153,"teacher_disagreement_score":0.78089464,"about_ca_system_score_codex":0.000053633823,"about_ca_system_score_gemma":0.00004329942,"threshold_uncertainty_score":0.38728082},"labels":[],"label_agreement":null},{"id":"W2240767633","doi":"10.1007/s00220-015-2520-8","title":"The Feynman Propagator on Perturbations of Minkowski Space","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":22,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"National Science Foundation","keywords":"Propagator; Minkowski space; Feynman diagram; Sobolev space; D'Alembert operator; Wave equation; Banach space; Nonlinear system; Regularization (linguistics)","score_opus":0.10011354878970444,"score_gpt":0.36978865545317857,"score_spread":0.26967510666347416,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2240767633","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.04656885,0.00036109646,0.6462217,0.037102234,0.0001995153,0.0047050593,0.00008883967,0.00055322476,0.26419947],"genre_scores_gemma":[0.877805,0.000116492105,0.12000312,0.000059558224,0.000047138237,0.0003990717,0.0000027458013,0.00007558766,0.0014913111],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9978945,0.00022059731,0.00083875406,0.0002480667,0.00043717306,0.00036089067],"domain_scores_gemma":[0.9828928,0.012856523,0.000366817,0.0035934164,0.00020330117,0.00008711487],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0007082137,0.00025182674,0.00043901725,0.000054321405,0.00028315326,0.000028874538,0.0016090153,0.00008333124,0.000028715984],"category_scores_gemma":[0.003467654,0.00013831793,0.000160123,0.00046136256,0.0009669981,0.00018730335,0.00047378775,0.00031663504,0.00017494764],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00000988713,0.0008818485,0.00001146187,0.000101224505,0.000024556584,2.3648877e-7,0.00040159075,0.000004256796,0.001502306,0.9898072,0.0007457856,0.0065096756],"study_design_scores_gemma":[0.00037549844,0.000058548816,0.000020769448,0.0005087279,0.000025634032,0.0000013769518,0.00013876575,0.0010275309,0.0035429425,0.9932778,0.0008350287,0.00018740295],"about_ca_topic_score_codex":8.906697e-7,"about_ca_topic_score_gemma":0.000005548677,"teacher_disagreement_score":0.8312361,"about_ca_system_score_codex":0.0001355836,"about_ca_system_score_gemma":0.00006503493,"threshold_uncertainty_score":0.5640442},"labels":[],"label_agreement":null},{"id":"W2241972777","doi":"10.1007/s00220-013-1715-0","title":"Ergodic Properties of Random Billiards Driven by Thermostats","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Thermodynamics and Statistical Mechanics","field":"Physics and Astronomy","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Thermostat; Ergodic theory; Statistical physics; Mathematics; Torus; Ergodicity; Classical mechanics; Mathematical analysis; Physics; Geometry","score_opus":0.028523607500589063,"score_gpt":0.2786236558603284,"score_spread":0.2501000483597393,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2241972777","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.096075684,0.00017828424,0.88658494,0.00036493345,0.000024512361,0.0007407908,0.00008517396,0.000030747655,0.015914936],"genre_scores_gemma":[0.97965413,0.0000241169,0.019954918,0.000020150228,0.000012324012,0.0001923406,0.000030970845,0.000022085209,0.00008896247],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990804,0.000088813315,0.00038950148,0.00012581558,0.0001334794,0.00018198678],"domain_scores_gemma":[0.9985127,0.00028218966,0.00011641018,0.000934065,0.00010168739,0.000052990294],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00009600863,0.00013352049,0.00029779715,0.000020500593,0.00007339193,0.000023302777,0.0005844134,0.000031185817,0.00018393209],"category_scores_gemma":[0.000036960184,0.00010579393,0.00006994646,0.00016875757,0.00023444141,0.000118464406,0.00021398714,0.00020678091,0.00007747343],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000005181397,0.0005991439,0.00012296381,0.000036463494,0.00003052832,3.7486945e-8,0.00038382382,0.000082653445,0.015159155,0.96260124,0.000082012746,0.020896774],"study_design_scores_gemma":[0.0004205046,0.000015686086,0.0000315294,0.0000923745,0.000012471589,8.5208114e-8,0.0002541982,0.16577801,0.0018858765,0.83132935,0.00005539687,0.00012451259],"about_ca_topic_score_codex":0.000033764685,"about_ca_topic_score_gemma":8.1749823e-7,"teacher_disagreement_score":0.8835784,"about_ca_system_score_codex":0.000020672895,"about_ca_system_score_gemma":0.000024015568,"threshold_uncertainty_score":0.4314151},"labels":[],"label_agreement":null},{"id":"W2260389433","doi":"10.1007/s00220-016-2781-x","title":"Standing Waves in Near-Parallel Vortex Filaments","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McMaster University","funders":"Natural Sciences and Engineering Research Council of Canada; National Center for Theoretical Sciences","keywords":"Vortex; Physics; Hamiltonian (control theory); Classical mechanics; Hamiltonian system; Standing wave; Dynamical systems theory; Mathematical analysis; Mathematics; Mathematical physics; Quantum mechanics; Mechanics","score_opus":0.044883060464573715,"score_gpt":0.31881543224047265,"score_spread":0.2739323717758989,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2260389433","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5786374,0.00011273875,0.33720687,0.0016826619,0.000085282794,0.00077581574,0.000064555374,0.000070862596,0.081363805],"genre_scores_gemma":[0.99112356,0.000010107109,0.008439311,0.000012598523,0.000035360805,0.000083996914,0.000011215737,0.000016332046,0.00026750547],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99893266,0.00010317953,0.0004236263,0.000159459,0.00013686711,0.00024418216],"domain_scores_gemma":[0.99832654,0.00049634237,0.00008943197,0.0010069031,0.000024509196,0.000056258355],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002288502,0.00012777913,0.00025541647,0.000029347653,0.00008690565,0.000046014768,0.0005657375,0.00003503046,0.00016088794],"category_scores_gemma":[0.000026073374,0.00009066587,0.00006872882,0.00021906261,0.00017840191,0.00015741674,0.00026526616,0.00016053717,0.00020607773],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000034231007,0.00046930017,0.016341422,0.000016869211,0.000012473923,3.1541305e-7,0.00037302644,0.000035813307,0.0003283664,0.9750211,0.00004490978,0.007352977],"study_design_scores_gemma":[0.000604646,0.000011891135,0.0024943296,0.00034777733,0.0000054109755,1.9000322e-7,0.00021247688,0.044029772,0.000033979763,0.95168453,0.00040746646,0.00016753428],"about_ca_topic_score_codex":0.00003922724,"about_ca_topic_score_gemma":0.000009052795,"teacher_disagreement_score":0.41248617,"about_ca_system_score_codex":0.00007420361,"about_ca_system_score_gemma":0.000026438245,"threshold_uncertainty_score":0.36972466},"labels":[],"label_agreement":null},{"id":"W2275067817","doi":"10.1007/s00220-015-2506-6","title":"Spectral Determinants on Mandelstam Diagrams","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":9,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Collège de Maisonneuve; Concordia University","funders":"Natural Sciences and Engineering Research Council of Canada; Agence Nationale de la Recherche","keywords":"Meromorphic function; Mathematics; Riemann surface; Compact Riemann surface; Laplace operator; Pure mathematics; Divisor (algebraic geometry); Conformal map; Gravitational singularity; Mathematical analysis; Omega; Surface (topology); Space (punctuation); Simple (philosophy); Physics; Geometry","score_opus":0.24448701994422434,"score_gpt":0.4232544806429351,"score_spread":0.17876746069871075,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2275067817","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.50885797,0.00012284378,0.07167105,0.0017635787,0.00029284952,0.0022989232,0.000030799067,0.00091178896,0.4140502],"genre_scores_gemma":[0.9037724,0.0000208699,0.095274456,0.00016779553,0.00014879793,0.00018099867,0.000008430771,0.00009591066,0.0003303265],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99719024,0.0003573496,0.00086663663,0.00037857532,0.0006285132,0.0005786661],"domain_scores_gemma":[0.992556,0.0031383927,0.00022484038,0.003672134,0.00013038122,0.00027827785],"candidate_categories":["metaepi_narrow","insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.00117586,0.00039797663,0.00069966423,0.00009953936,0.00013330167,0.0000867239,0.0019069355,0.00014638793,0.00006259917],"category_scores_gemma":[0.0020959673,0.0003513682,0.0001952227,0.00064201077,0.0005289799,0.00025343773,0.00051247905,0.0007413803,0.0010289935],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000022418975,0.0020730235,0.00016454243,0.000089485584,0.000020581887,0.0000073206616,0.0012011114,0.000028047187,0.000034964443,0.9932455,0.0006334599,0.00247954],"study_design_scores_gemma":[0.00068513,0.00012861019,0.0000667887,0.00026287357,0.000037675974,0.00001039941,0.0003091352,0.011900053,0.00084025174,0.98520905,0.00016058469,0.0003894653],"about_ca_topic_score_codex":0.0000029534576,"about_ca_topic_score_gemma":0.00001641253,"teacher_disagreement_score":0.41371986,"about_ca_system_score_codex":0.0003054489,"about_ca_system_score_gemma":0.00007625948,"threshold_uncertainty_score":0.99989384},"labels":[],"label_agreement":null},{"id":"W2280843209","doi":"10.1007/s00220-016-2748-y","title":"Modular Extensions of Unitary Braided Fusion Categories and 2+1D Topological/SPT Orders with Symmetries","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Topological Materials and Phenomena","field":"Physics and Astronomy","cited_by":117,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute; University of Waterloo","funders":"Center of Mathematical Sciences and Applications, Harvard University; National Natural Science Foundation of China; Industry Canada; Ontario Ministry of Research, Innovation and Science; Division of Physics; John Templeton Foundation","keywords":"Homogeneous space; Abelian group; Group (periodic table); Unitary state; Combinatorics; Symmetry group; Cohomology; Physics; Mathematics; Topology (electrical circuits); Pure mathematics; Quantum mechanics; Geometry","score_opus":0.03272904657849123,"score_gpt":0.2735790011985378,"score_spread":0.24084995462004655,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2280843209","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9378856,0.00013676388,0.050200675,0.0025848795,0.000020333811,0.0002964679,0.000047309524,0.000036147077,0.008791848],"genre_scores_gemma":[0.98719263,0.00005840177,0.012565393,0.00004306113,0.000022166714,0.000037918016,0.000011378062,0.000011473967,0.00005756884],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991418,0.00012764087,0.000305091,0.00015612804,0.00009945571,0.00016988571],"domain_scores_gemma":[0.9981165,0.00078289217,0.000108581226,0.00083139684,0.000104722254,0.00005589992],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00016637715,0.00013983638,0.00031586192,0.000035812136,0.00013047835,0.000018362847,0.0003523271,0.000039906372,0.00019507353],"category_scores_gemma":[0.00007268382,0.00007851633,0.000036151454,0.00023404334,0.00089335075,0.000120450095,0.00036561664,0.000104019404,0.000011163236],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000011658704,0.0003059469,0.0021809395,0.000021739217,0.00001938618,2.2063855e-7,0.0002542463,0.0000065882737,0.0035966348,0.98984003,0.000007822399,0.0037547748],"study_design_scores_gemma":[0.0003660342,0.00007469669,0.0037992557,0.00010110197,0.00002118615,6.201886e-7,0.00065441476,0.00017983945,0.0012503751,0.9932763,0.00014026482,0.0001359229],"about_ca_topic_score_codex":0.00005586148,"about_ca_topic_score_gemma":0.0000037421182,"teacher_disagreement_score":0.049307063,"about_ca_system_score_codex":0.000010908017,"about_ca_system_score_gemma":0.000021679802,"threshold_uncertainty_score":0.3291588},"labels":[],"label_agreement":null},{"id":"W2282058838","doi":"10.1007/s00220-017-2871-4","title":"Dyson’s Spike for Random Schroedinger Operators and Novikov–Shubin Invariants of Groups","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Random matrix; Eigenvalues and eigenvectors; Measure (data warehouse); Schrödinger's cat; Independence (probability theory); Poisson distribution; Lie group; Matrix (chemical analysis)","score_opus":0.15148196062642827,"score_gpt":0.4129045533409224,"score_spread":0.26142259271449414,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2282058838","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5544538,0.00032449522,0.39010778,0.0025810949,0.00024694615,0.0049003046,0.00013610374,0.0002446005,0.047004875],"genre_scores_gemma":[0.80888826,0.00008438803,0.19051269,0.000040845272,0.00007841102,0.00025588958,0.0000067086,0.00006518718,0.00006764688],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.997891,0.00015901026,0.0009380788,0.0003287846,0.0003022487,0.00038086736],"domain_scores_gemma":[0.99051166,0.004620085,0.00055328,0.003989038,0.00020679718,0.00011916379],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.001519305,0.00032035913,0.00092145556,0.00007604387,0.00051581516,0.00015649087,0.002178799,0.00015280506,0.000039492996],"category_scores_gemma":[0.005691864,0.00028821654,0.00018480724,0.00015966005,0.0011997288,0.0004618183,0.00096107426,0.0003979937,0.000025441735],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000040500356,0.00084797706,0.00018696018,0.0005935148,0.00005906058,5.552648e-7,0.0009776391,0.0000021555347,0.0012608045,0.9945241,0.00018792103,0.0013187858],"study_design_scores_gemma":[0.0019092205,0.00006042986,0.0002076492,0.00050473044,0.00010085331,0.0000034402328,0.0002477971,0.01117891,0.0020528126,0.9833927,0.00004901603,0.0002924357],"about_ca_topic_score_codex":0.0000072098387,"about_ca_topic_score_gemma":0.000012466172,"teacher_disagreement_score":0.25443444,"about_ca_system_score_codex":0.000074014824,"about_ca_system_score_gemma":0.000053890708,"threshold_uncertainty_score":0.999957},"labels":[],"label_agreement":null},{"id":"W2303412700","doi":"10.1007/s00220-017-2856-3","title":"The Kontsevich Matrix Integral: Convergence to the Painlevé Hierarchy and Stokes’ Phenomenon","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Matrix Theory and Algorithms","field":"Computer Science","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Concordia University; Université du Québec à Montréal","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada","keywords":"Matrix (chemical analysis); Ramanujan tau function; Convergence (economics); Hierarchy; Limit (mathematics); Space (punctuation); Nonlinear system; Function (biology); Complex system","score_opus":0.046401315434595546,"score_gpt":0.34658514569113164,"score_spread":0.3001838302565361,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2303412700","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.004344875,0.0008640421,0.9304021,0.046720654,0.00020865182,0.00082089636,0.0000062508757,0.000100034216,0.016532505],"genre_scores_gemma":[0.9184815,0.00040948295,0.07981796,0.00035170699,0.00006377369,0.00015868097,0.0000012329508,0.000013107132,0.00070254086],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99880385,0.00029184262,0.00027786975,0.00019720386,0.00018572398,0.00024350268],"domain_scores_gemma":[0.99293715,0.0014573338,0.00012943216,0.005330523,0.00006833068,0.0000772237],"candidate_categories":["sts","open_science"],"consensus_categories":[],"category_scores_codex":[0.0015494112,0.00012981052,0.00016246956,0.000022059136,0.00171598,0.0006103754,0.0068773916,0.000031638312,0.0000049365763],"category_scores_gemma":[0.0004855781,0.0000760676,0.000045180273,0.00019344217,0.0005512499,0.00033629587,0.002745739,0.0003507418,0.00013540956],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000017748254,0.000059536902,0.000043013602,0.000011593667,0.0000069338903,3.3542142e-7,0.0017136484,0.000010530431,0.00001343427,0.94496036,0.00017817844,0.053000685],"study_design_scores_gemma":[0.000104911014,0.000019318612,0.00040627073,0.000054010823,0.0000051873603,0.000002865312,0.000224826,0.124974675,0.000038612263,0.8621487,0.011902215,0.00011837669],"about_ca_topic_score_codex":0.000009285907,"about_ca_topic_score_gemma":0.000016482292,"teacher_disagreement_score":0.91413665,"about_ca_system_score_codex":0.000029912238,"about_ca_system_score_gemma":0.000033213877,"threshold_uncertainty_score":0.99958366},"labels":[],"label_agreement":null},{"id":"W2333319145","doi":"10.1007/s00220-016-2772-y","title":"Vertical D4–D2–D0 Bound States on K3 Fibrations and Modularity","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Algebra and Geometry","field":"Mathematics","cited_by":8,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto; University of Alberta","funders":"","keywords":"Modularity (biology); Fibered knot; Modular form; String (physics); Function (biology); Upper and lower bounds; Generating function; Complex system","score_opus":0.08332873621605684,"score_gpt":0.37083696063186533,"score_spread":0.2875082244158085,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2333319145","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.51461905,0.0001837179,0.46187758,0.008544841,0.00005501351,0.0007045127,0.000057061934,0.00023856682,0.013719641],"genre_scores_gemma":[0.94952047,0.00016077912,0.049749054,0.0001567444,0.00003624046,0.000082842394,0.000010969655,0.00003332502,0.00024956206],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99871165,0.00013715567,0.00042842719,0.00023581884,0.00021770019,0.00026925677],"domain_scores_gemma":[0.9939699,0.0039842473,0.00006157756,0.0018083518,0.000072061404,0.00010383114],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00028548203,0.00018646252,0.00030769323,0.00006836298,0.00021881843,0.000049080747,0.0005268841,0.0000902654,0.000058503065],"category_scores_gemma":[0.0012587236,0.00013464924,0.00006361104,0.00029942195,0.00052001333,0.00024718352,0.0003806021,0.00027353838,0.00013695948],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000072035077,0.0006597663,0.00016498977,0.00005671308,0.00001759013,6.839377e-7,0.0003419855,0.0000049674763,0.00034736175,0.99173784,0.00022015962,0.0064407326],"study_design_scores_gemma":[0.00039683553,0.000045226338,0.00038082164,0.0002058861,0.00002137066,0.0000026648324,0.00011561176,0.0038964604,0.0007004673,0.99376047,0.00028874466,0.00018542736],"about_ca_topic_score_codex":8.748955e-7,"about_ca_topic_score_gemma":0.000007951714,"teacher_disagreement_score":0.43490142,"about_ca_system_score_codex":0.00007209274,"about_ca_system_score_gemma":0.00002826824,"threshold_uncertainty_score":0.54908365},"labels":[],"label_agreement":null},{"id":"W2370155293","doi":"10.1007/s002200000333","title":"First KdV Integrals¶and Absolutely Continuous Spectrum¶for 1-D Schrödinger Operator","year":2001,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":44,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"University of Ottawa; National Science Foundation","keywords":"Korteweg–de Vries equation; Operator (biology); Mathematics; Spectrum (functional analysis); Mathematical physics; Absolute continuity; Schrödinger's cat; Mathematical analysis; Pure mathematics; Physics; Nonlinear system; Quantum mechanics","score_opus":0.10975542894362222,"score_gpt":0.375522260090032,"score_spread":0.26576683114640975,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2370155293","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.34620366,0.0008406396,0.5430679,0.011634008,0.00027108405,0.005754014,0.00008598716,0.0010556332,0.091087095],"genre_scores_gemma":[0.72159165,0.00028020446,0.27644482,0.00021455971,0.00018936115,0.00057458284,0.000014009982,0.00013662915,0.0005542015],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99750924,0.00016017711,0.0009722117,0.0004387251,0.00030898972,0.0006106392],"domain_scores_gemma":[0.99109775,0.005811647,0.00023538872,0.0025319355,0.00014552972,0.00017774377],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0010243692,0.00043164208,0.00086792535,0.00010656245,0.00037040547,0.00015961683,0.00145591,0.00017417756,0.000136456],"category_scores_gemma":[0.0021852294,0.00039037783,0.00021450833,0.0005778319,0.00070904853,0.00032261264,0.0005713403,0.0006177438,0.00017529541],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000025547106,0.0010162524,0.00013311997,0.00027863975,0.000052620144,0.0000023330138,0.0010426979,0.000008540659,0.00011810233,0.9958765,0.00045571168,0.0009899659],"study_design_scores_gemma":[0.00074136246,0.00007763538,0.000073694995,0.0004279184,0.000078968784,0.000023742497,0.00037511936,0.017010422,0.00029328902,0.9787945,0.0016627001,0.00044061974],"about_ca_topic_score_codex":0.0000066457756,"about_ca_topic_score_gemma":0.00003840857,"teacher_disagreement_score":0.37538797,"about_ca_system_score_codex":0.00016248232,"about_ca_system_score_gemma":0.000044783967,"threshold_uncertainty_score":0.9998548},"labels":[],"label_agreement":null},{"id":"W2471127199","doi":"10.1007/s00220-017-2947-1","title":"On Entropy Production of Repeated Quantum Measurements I. General Theory","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Thermodynamics and Statistical Mechanics","field":"Physics and Astronomy","cited_by":39,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Agence Nationale de la Recherche","keywords":"Entropy production; Arrow of time; Formalism (music); Quantum; Quantum relative entropy; Entropy (arrow of time); Joint quantum entropy; Complex system; Quantum discord","score_opus":0.07239613873715478,"score_gpt":0.35377737194684794,"score_spread":0.28138123320969316,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2471127199","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.13001227,0.000019090096,0.8368798,0.0003249358,0.00016312211,0.0004885941,0.000040389365,0.000026749753,0.032045055],"genre_scores_gemma":[0.97963077,0.000005414531,0.02010966,0.000008513442,0.00003665046,0.000041139334,0.000023304647,0.000016401194,0.00012816454],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991348,0.000108936154,0.00030301066,0.00015298043,0.00015953953,0.00014073678],"domain_scores_gemma":[0.99724466,0.00019247059,0.000245118,0.0021864597,0.0000964281,0.00003488351],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00032096312,0.00011226913,0.00021326401,0.000021844677,0.00024472564,0.000027421227,0.0007352169,0.000024919662,0.000045289966],"category_scores_gemma":[0.00025692792,0.000101160535,0.00005986127,0.000056229735,0.00020179668,0.00009188791,0.00020214483,0.000195576,0.000023226854],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000014646163,0.0005782391,0.00016677161,0.000013558587,0.000025713443,7.87201e-8,0.00009381722,0.00015814892,0.0019867625,0.9862394,0.000010063149,0.010712844],"study_design_scores_gemma":[0.0002050907,0.000024745428,0.0002787779,0.00008706426,0.00001612173,8.173072e-8,0.000039556046,0.058772,0.0015116981,0.9389621,0.000011580622,0.00009120973],"about_ca_topic_score_codex":0.000007059995,"about_ca_topic_score_gemma":8.084768e-7,"teacher_disagreement_score":0.8496185,"about_ca_system_score_codex":0.000029454974,"about_ca_system_score_gemma":0.000018635168,"threshold_uncertainty_score":0.4125207},"labels":[],"label_agreement":null},{"id":"W2516619901","doi":"10.1007/s00220-017-2923-9","title":"Fault-Tolerant Quantum Error Correction for non-Abelian Anyons","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":33,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Sherbrooke","funders":"Fonds de recherche du Québec – Nature et technologies; Natural Sciences and Engineering Research Council of Canada","keywords":"Topological quantum computer; Anyon; Toric code; Quantum; Abelian group; Lattice (music); Ising model; Symplectic geometry","score_opus":0.05536608491310637,"score_gpt":0.34700828059169686,"score_spread":0.2916421956785905,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2516619901","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.010254826,0.000035132816,0.98281604,0.0040088957,0.00042239952,0.00041379614,0.00000586925,0.00012181397,0.0019212293],"genre_scores_gemma":[0.7214504,0.000013076235,0.2781295,0.000091618494,0.00007868785,0.00009730578,0.000006159045,0.000016167753,0.000117116215],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9988712,0.00006573129,0.0003336342,0.0002819892,0.00015884683,0.0002885974],"domain_scores_gemma":[0.9947151,0.0006007401,0.00021659539,0.0042920043,0.0001030227,0.00007252195],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00041369293,0.00016235969,0.00026466083,0.00005604536,0.0010745734,0.00034190918,0.003885849,0.000068234694,0.0000015866513],"category_scores_gemma":[0.00030309704,0.00014719396,0.0001179276,0.00016592519,0.0002398257,0.00029716903,0.0010611165,0.00034494017,0.00004488596],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006453964,0.0010810312,0.00014679633,0.00013037593,0.000031065647,0.0000019748545,0.0032305825,0.0032779695,0.0003322031,0.77312654,0.0017853283,0.21684967],"study_design_scores_gemma":[0.00022171426,0.00003177623,0.0005749777,0.00012265799,0.000005075638,0.0000037779414,0.0000346192,0.70919454,0.00010571853,0.2888336,0.00073930284,0.00013223522],"about_ca_topic_score_codex":0.000017483064,"about_ca_topic_score_gemma":0.000017528873,"teacher_disagreement_score":0.7111955,"about_ca_system_score_codex":0.00003887522,"about_ca_system_score_gemma":0.0000582643,"threshold_uncertainty_score":0.8264858},"labels":[],"label_agreement":null},{"id":"W2521985090","doi":"10.1007/s00220-017-2898-6","title":"Counting Unstable Eigenvalues in Hamiltonian Spectral Problems via Commuting Operators","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":20,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McMaster University","funders":"Agence Nationale de la Recherche","keywords":"Eigenvalues and eigenvectors; Bounded function; Hamiltonian (control theory); Transverse plane; Operator (biology); Hamiltonian system; Spectral theory; Essential spectrum","score_opus":0.12899700220928226,"score_gpt":0.3903765360870366,"score_spread":0.26137953387775437,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2521985090","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.72292805,0.00026278218,0.056835335,0.0023884887,0.00020407689,0.0029604512,0.000024678764,0.00052551815,0.21387063],"genre_scores_gemma":[0.87997407,0.00005329533,0.11937982,0.000062656574,0.000108352026,0.00018141056,0.000008868087,0.000106972446,0.00012456004],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99640405,0.00039986987,0.0013473866,0.0004674752,0.0005192446,0.0008619738],"domain_scores_gemma":[0.99040866,0.0025109898,0.0005885704,0.0062164664,0.00013620629,0.00013910246],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.002463963,0.00048054254,0.0009653986,0.00013079244,0.0009857722,0.00043794644,0.0041543753,0.00019160366,0.000091476344],"category_scores_gemma":[0.0023887178,0.00047121683,0.00019813693,0.00042602234,0.0010755791,0.0008305285,0.0014655921,0.0012630321,0.00022090299],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000062930326,0.0014422311,0.002352546,0.00039822172,0.000034874953,0.000005143671,0.0026935819,0.00013078698,0.0008381699,0.99033004,0.000040016108,0.001728094],"study_design_scores_gemma":[0.0006069576,0.000025107129,0.000923329,0.00092613866,0.000035478966,0.0000070008887,0.0004091823,0.051520497,0.0009310927,0.94407326,0.000055671564,0.00048630175],"about_ca_topic_score_codex":0.00008659699,"about_ca_topic_score_gemma":0.00027750776,"teacher_disagreement_score":0.21374607,"about_ca_system_score_codex":0.00037886432,"about_ca_system_score_gemma":0.00008663159,"threshold_uncertainty_score":0.999774},"labels":[],"label_agreement":null},{"id":"W2540201969","doi":"10.1007/s00220-017-2901-2","title":"Orbifolds and Cosets of Minimal $${\\mathcal{W}}$$-Algebras","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":35,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"Japan Society for the Promotion of Science; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Simons Foundation","keywords":"Coset; Vertex operator algebra; Lie algebra; Affine transformation; Centralizer and normalizer; Vertex (graph theory); Conjecture; Affine Lie algebra; Simple Lie group","score_opus":0.11755443151896615,"score_gpt":0.3909239979910228,"score_spread":0.2733695664720566,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2540201969","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9684555,0.00025056617,0.005405082,0.0011837637,0.00012681392,0.0005527249,0.000013539846,0.0000641163,0.02394787],"genre_scores_gemma":[0.963291,0.00007311307,0.036441144,0.00001955095,0.000036803856,0.000036890586,0.0000025005509,0.000025278203,0.00007375462],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988285,0.00008233124,0.000497198,0.0001796815,0.00021679273,0.00019553002],"domain_scores_gemma":[0.9953729,0.0009458132,0.00034251102,0.0031801944,0.00008982813,0.0000687904],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00034488732,0.00016899554,0.00044714217,0.000037148373,0.00029688276,0.00007293461,0.0014618475,0.00011356228,0.000025309893],"category_scores_gemma":[0.0009775016,0.00013551736,0.00008081798,0.00007802134,0.0006907102,0.00018705476,0.0010207895,0.0002562306,0.000008727528],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000068601025,0.0002691502,0.0005248132,0.00013491166,0.000021612443,5.6605217e-7,0.0006987399,3.9278902e-7,0.00007954161,0.995042,0.00007761699,0.0031437783],"study_design_scores_gemma":[0.0004396376,0.000029854733,0.0017234063,0.00016361443,0.000034569894,0.0000035144021,0.000115938186,0.0021332076,0.00034986326,0.9947781,0.00007852002,0.00014979205],"about_ca_topic_score_codex":0.000012596994,"about_ca_topic_score_gemma":0.000007871832,"teacher_disagreement_score":0.031036062,"about_ca_system_score_codex":0.000026360345,"about_ca_system_score_gemma":0.000036645546,"threshold_uncertainty_score":0.55262375},"labels":[],"label_agreement":null},{"id":"W2546131889","doi":"10.1007/s00220-020-03717-0","title":"Weighted Hurwitz Numbers and Topological Recursion","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Non-Hermitian Physics","field":"Physics and Astronomy","cited_by":28,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University; Université de Montréal","funders":"European Research Council; Institute for Basic Science; Russian Foundation for Basic Research; Agence Nationale de la Recherche","keywords":"Recursion (computer science); Generating function; Polynomial; Series (stratigraphy); Hypergeometric distribution; Representation (politics); Genus; Hurwitz matrix","score_opus":0.05312136076804218,"score_gpt":0.3105942150860671,"score_spread":0.2574728543180249,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2546131889","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.40818253,0.00043658155,0.28741312,0.019506525,0.00012874493,0.0013646455,0.00011325681,0.0002828769,0.2825717],"genre_scores_gemma":[0.98621196,0.000030190513,0.013255851,0.00026692718,0.00009919737,0.000035367048,0.00003363439,0.00001927097,0.000047620626],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99908954,0.00010042411,0.00028466998,0.00021136938,0.000119552875,0.00019441685],"domain_scores_gemma":[0.99879944,0.00027217282,0.00008057646,0.0006827591,0.000038440183,0.0001265964],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0001200246,0.00015157611,0.00026130144,0.000014226788,0.00013000124,0.000041413532,0.0004994033,0.000046199475,0.00017352689],"category_scores_gemma":[0.000020505473,0.00013956144,0.00006997069,0.0002776775,0.00017817231,0.00011953949,0.0004023419,0.00035835302,0.00015600408],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000005051328,0.00025925654,0.00046324823,0.000021578278,0.000013870168,4.1404883e-7,0.00060777355,0.000001648205,0.00024406918,0.98861176,0.00027266634,0.009498676],"study_design_scores_gemma":[0.00029558828,0.000037241633,0.00007412208,0.000043463067,0.000015955513,4.1649304e-7,0.0003712437,0.04126903,0.00040445998,0.95570946,0.0016025688,0.00017646911],"about_ca_topic_score_codex":0.0000069481516,"about_ca_topic_score_gemma":5.356884e-7,"teacher_disagreement_score":0.5780294,"about_ca_system_score_codex":0.0000140521815,"about_ca_system_score_gemma":0.00002278462,"threshold_uncertainty_score":0.56911504},"labels":[],"label_agreement":null},{"id":"W2552837225","doi":"10.1007/s00220-017-2991-x","title":"Periods and Motives in the Spectral Action of Robertson–Walker Spacetimes","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometric Analysis and Curvature Flows","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Government of Canada; National Science Foundation","keywords":"Hyperplane; Quadric; Action (physics); Affine transformation; Spacetime; Scaling; Space (punctuation); Spectral properties","score_opus":0.16077766789984552,"score_gpt":0.41233804402470137,"score_spread":0.2515603761248558,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2552837225","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9331975,0.00053955603,0.014130044,0.004298059,0.000028185097,0.00053227384,0.000005256117,0.000021715154,0.047247402],"genre_scores_gemma":[0.97498614,0.0002028482,0.024605867,0.000016452705,0.000020467634,0.000025593743,0.000002315194,0.00000951427,0.00013078998],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.999094,0.00015704351,0.00031978416,0.00011784157,0.00017831734,0.00013301587],"domain_scores_gemma":[0.99663955,0.00096949254,0.00022497,0.0020998067,0.000045098528,0.00002108756],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00072261447,0.000110485365,0.00030742295,0.000071759365,0.00021425501,0.00008914369,0.0009711732,0.000060406404,0.0000334666],"category_scores_gemma":[0.00094318506,0.000076944554,0.000078887744,0.00025111611,0.0004733553,0.00019772725,0.00026219685,0.00030086073,0.0000050727494],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000003838639,0.000764321,0.0048466045,0.00009048299,0.000028782411,5.220732e-7,0.005596568,0.000008782048,0.00010017625,0.9846346,0.00017745054,0.0037478826],"study_design_scores_gemma":[0.00024490524,0.000019461642,0.030491443,0.000109631954,0.00005339489,0.0000025301667,0.0034607942,0.0076943706,0.000118287615,0.9574749,0.00022184002,0.000108469154],"about_ca_topic_score_codex":0.000033766308,"about_ca_topic_score_gemma":0.00014713337,"teacher_disagreement_score":0.04711661,"about_ca_system_score_codex":0.000020808428,"about_ca_system_score_gemma":0.000013841258,"threshold_uncertainty_score":0.3137708},"labels":[],"label_agreement":null},{"id":"W2571907426","doi":"10.1007/s00220-017-3002-y","title":"Quantum Algorithm for Linear Differential Equations with Exponentially Improved Dependence on Precision","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":196,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Canadian Institute for Advanced Research; Intelligence Advanced Research Projects Activity; National Science Foundation","keywords":"Quantum algorithm for linear systems of equations; Quantum algorithm; Quantum phase estimation algorithm; Logarithm; Linear differential equation; Quantum; Propagator; Exponential function; Exponential growth; Linear system","score_opus":0.050342640721197485,"score_gpt":0.32690952416301217,"score_spread":0.2765668834418147,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2571907426","genre_codex":"methods","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":"methods","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0031316956,0.000018631288,0.9948197,0.0009499262,0.00010369155,0.0005439863,0.000011713027,0.00009688784,0.00032375264],"genre_scores_gemma":[0.4359206,0.000007825796,0.5637996,0.000031420088,0.00006795313,0.00010963093,0.000009871413,0.000015557227,0.000037514765],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99864966,0.00009009434,0.00033803715,0.0003662968,0.00027161097,0.0002842972],"domain_scores_gemma":[0.994138,0.001222312,0.0002560753,0.004167862,0.00013887617,0.00007687624],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00030902398,0.00019593512,0.0002633474,0.00006111526,0.00096531905,0.00036316836,0.003985123,0.00006836641,0.0000025565284],"category_scores_gemma":[0.00030723755,0.00015455938,0.00009509188,0.00013104246,0.00022167404,0.00030337233,0.0010770679,0.00036151268,0.000021518757],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001248145,0.0010202974,0.0000067969177,0.00003302304,0.000026875676,0.0000013274613,0.00069947116,0.0012278898,0.00042861752,0.6006459,0.000022226883,0.39587513],"study_design_scores_gemma":[0.00047424043,0.00014652172,0.00013084918,0.00016047544,0.000008939573,0.0000018905273,0.000010487086,0.7979115,0.00031135665,0.2006299,0.00005095867,0.00016287477],"about_ca_topic_score_codex":0.000008627217,"about_ca_topic_score_gemma":0.000008342957,"teacher_disagreement_score":0.7966836,"about_ca_system_score_codex":0.000033802873,"about_ca_system_score_gemma":0.00007231222,"threshold_uncertainty_score":0.7424551},"labels":[],"label_agreement":null},{"id":"W2576842103","doi":"10.1007/s00220-006-1557-0","title":"Infinite Volume Limit for the Stationary Distribution of Abelian Sandpile Models","year":2006,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":6,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Carleton University","funders":"","keywords":"Abelian sandpile model; Measure (data warehouse); Mathematics; Spanning tree; Abelian group; Limit (mathematics); Distribution (mathematics); Tree (set theory); Invariant (physics); Statistical physics; Pure mathematics; Combinatorics; Mathematical analysis; Physics; Mathematical physics; Computer science","score_opus":0.11825275130522908,"score_gpt":0.35653356946343023,"score_spread":0.23828081815820115,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2576842103","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00062840496,0.00014825434,0.9953989,0.0010528633,0.00002496556,0.00060486613,0.00036191754,0.00004734075,0.0017324922],"genre_scores_gemma":[0.81628937,0.000046127414,0.18296784,0.000032586646,0.000036425223,0.00033113742,0.00017899925,0.000022541146,0.00009499969],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987846,0.000051616233,0.0006160894,0.0001334903,0.00021624073,0.00019794914],"domain_scores_gemma":[0.9922186,0.006216257,0.00020248324,0.0010711972,0.00026192112,0.000029516688],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00041510983,0.00013347305,0.00027430215,0.000024627288,0.00017914503,0.000024994766,0.00067695417,0.00006712686,0.000011441731],"category_scores_gemma":[0.0010273248,0.00010356333,0.00008836549,0.00031807288,0.00022528341,0.00011105578,0.00018060958,0.00017578003,0.000008556724],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000112754105,0.00049086445,0.0000053308618,0.00019563382,0.000014021549,7.700856e-8,0.00016412209,0.0006418338,0.000023710258,0.99384326,0.0027532931,0.0018565878],"study_design_scores_gemma":[0.0001730383,0.000022603148,0.00003128622,0.000058963178,0.000038326594,5.591454e-7,0.00008109226,0.42635804,0.000025926924,0.572836,0.000308672,0.00006552619],"about_ca_topic_score_codex":0.000011022083,"about_ca_topic_score_gemma":0.000011415977,"teacher_disagreement_score":0.81566095,"about_ca_system_score_codex":0.00004894034,"about_ca_system_score_gemma":0.00005406267,"threshold_uncertainty_score":0.42231902},"labels":[],"label_agreement":null},{"id":"W2582925234","doi":"10.1007/s00220-017-2995-6","title":"Anyonic Chains, Topological Defects, and Conformal Field Theory","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Topological Materials and Phenomena","field":"Physics and Astronomy","cited_by":87,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Division of Materials Research; Science and Technology Facilities Council; Institut Périmètre de physique théorique; Royal Society; National Science Foundation; Government of Canada; Tsinghua University; Aspen Center for Physics; Harvard University","keywords":"Homogeneous space; Topological quantum field theory; Topology (electrical circuits); Topological space; Topological algebra; Zero-dimensional space; Field (mathematics); Conformal map; Space (punctuation); Conformal field theory","score_opus":0.045722397102524,"score_gpt":0.332251309743489,"score_spread":0.286528912640965,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2582925234","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7182086,0.00017851558,0.03125684,0.0017186874,0.00007616713,0.00035360846,0.000024929446,0.000046872236,0.24813576],"genre_scores_gemma":[0.9964529,0.000032941578,0.0031162868,0.0001242495,0.00008437009,0.000047735077,0.000007675055,0.0000073895726,0.00012640876],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99928933,0.00010489533,0.00022222407,0.00013020112,0.000059982653,0.00019337417],"domain_scores_gemma":[0.9979029,0.00054850156,0.000112274654,0.001358567,0.000019479714,0.000058218957],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00032119255,0.00011810683,0.00022878328,0.000011920305,0.00043466038,0.0001402471,0.0007939747,0.000049600392,0.00044663408],"category_scores_gemma":[0.0000903131,0.000092067305,0.000049685128,0.000026661153,0.00046343185,0.00014220651,0.00072763715,0.00022313994,0.00005019457],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006506041,0.00016138567,0.0038319596,0.000013405151,0.000008572702,2.2433827e-7,0.00017766499,8.7335314e-7,0.00012356952,0.98840195,0.000011243062,0.0072626234],"study_design_scores_gemma":[0.00023383556,0.000036978152,0.0064740703,0.000029188288,0.00001058329,4.550603e-7,0.00018405009,0.00064749253,0.00028254057,0.99176544,0.00021491491,0.00012044494],"about_ca_topic_score_codex":0.000016229342,"about_ca_topic_score_gemma":0.0000013765751,"teacher_disagreement_score":0.27824432,"about_ca_system_score_codex":0.0000083179775,"about_ca_system_score_gemma":0.00001299129,"threshold_uncertainty_score":0.48903298},"labels":[],"label_agreement":null},{"id":"W2594270228","doi":"10.1007/s00220-014-2241-4","title":"A Laplace-Dunkl Equation on S 2 and the Bannai–Ito Algebra","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic and Geometric Analysis","field":"Mathematics","cited_by":29,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal","funders":"","keywords":"Casimir element; Tensor product; Algebra over a field; Laplace operator; Universal enveloping algebra; Operator (biology); Product (mathematics); Quadratic equation; Tensor (intrinsic definition); Hopf algebra","score_opus":0.2090580848783059,"score_gpt":0.37600026389599395,"score_spread":0.16694217901768804,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2594270228","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.099820554,0.0019755827,0.63956714,0.031817712,0.00014847159,0.0024732265,0.000017866101,0.00037447675,0.223805],"genre_scores_gemma":[0.96889156,0.000115196584,0.029733896,0.00034557597,0.000065892076,0.00014587064,0.000011940968,0.000026515747,0.0006635787],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9983812,0.00039719048,0.00046450368,0.00018030255,0.00038281755,0.00019397993],"domain_scores_gemma":[0.9927948,0.0049639335,0.00016857998,0.0018486235,0.00013318697,0.00009083781],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0017255247,0.00016816733,0.00038986083,0.000104594124,0.00017365493,0.000067234054,0.00076130114,0.00008008852,0.000024748912],"category_scores_gemma":[0.0036248928,0.00011307298,0.00009521431,0.00090762397,0.0005572037,0.0001257077,0.0004068424,0.00036630686,0.00019500627],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000022117958,0.00031494745,0.00006330293,0.0000241402,0.000040110204,3.09776e-7,0.0023869132,0.000025300458,6.345153e-7,0.9920211,0.0017872526,0.0033138874],"study_design_scores_gemma":[0.0010337674,0.00002569993,0.000043583623,0.000055621844,0.00008029595,0.0000020835005,0.0009388258,0.051879343,0.000008706013,0.9452607,0.0005464516,0.00012494148],"about_ca_topic_score_codex":0.000011845904,"about_ca_topic_score_gemma":0.000009063196,"teacher_disagreement_score":0.869071,"about_ca_system_score_codex":0.0000787988,"about_ca_system_score_gemma":0.000047860427,"threshold_uncertainty_score":0.46109822},"labels":[],"label_agreement":null},{"id":"W2607855536","doi":"10.1007/s00220-017-2987-6","title":"Isomonodromic Deformations and Very Stable Vector Bundles of Rank Two","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic Geometry and Number Theory","field":"Mathematics","cited_by":4,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Agence Nationale de la Recherche","keywords":"Vector bundle; Rank (graph theory); Mathematics; Pure mathematics; Nilpotent; Vector field; Genus; Connection (principal bundle); Logarithm; Holomorphic function; Mathematical analysis; Combinatorics; Geometry","score_opus":0.07984628038350079,"score_gpt":0.3607149055752518,"score_spread":0.28086862519175104,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2607855536","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.85675365,0.00034788964,0.056329433,0.0009720188,0.000074634554,0.0006644124,0.000039780156,0.00009248462,0.08472572],"genre_scores_gemma":[0.9598962,0.000103119666,0.03974648,0.000015520523,0.000020775647,0.00004268967,0.0000070498527,0.000019710433,0.00014845475],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99894226,0.00011794216,0.0004808157,0.00012922921,0.00014508578,0.0001846634],"domain_scores_gemma":[0.9950761,0.0015377377,0.00032549264,0.0029232074,0.00008327303,0.000054170127],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006808323,0.00014208278,0.00037285982,0.000058418856,0.00043671715,0.000076183824,0.0011385788,0.00006128462,0.000057626414],"category_scores_gemma":[0.0011412501,0.00013331253,0.00007218746,0.00011525811,0.00067858276,0.00047868452,0.00069721,0.0002518109,0.000042770906],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000070155324,0.0004530759,0.00042776697,0.00020246668,0.00003134454,2.236281e-7,0.0011663128,0.000003410079,0.0002375587,0.9960457,0.00008686425,0.0013382679],"study_design_scores_gemma":[0.0004882946,0.0000149796215,0.0008073514,0.00015920805,0.000043655942,0.0000044537414,0.00039222933,0.004630254,0.0010454028,0.9922224,0.000058254318,0.00013349207],"about_ca_topic_score_codex":0.00001743346,"about_ca_topic_score_gemma":0.0000135840155,"teacher_disagreement_score":0.103142574,"about_ca_system_score_codex":0.00003511897,"about_ca_system_score_gemma":0.000035488058,"threshold_uncertainty_score":0.5436327},"labels":[],"label_agreement":null},{"id":"W2616123218","doi":"10.1007/s00220-017-3076-6","title":"Lax Integrability and the Peakon Problem for the Modified Camassa–Holm Equation","year":2018,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":42,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Saskatchewan","funders":"State Key Laboratory of Scientific and Engineering Computing; Natural Sciences and Engineering Research Council of Canada; National Natural Science Foundation of China; Pacific Institute for the Mathematical Sciences","keywords":"Peakon; Camassa–Holm equation; Mathematics; Riemann–Stieltjes integral; Lax pair; Boundary value problem; Applied mathematics; Partial differential equation; Nonlinear system; Mathematical analysis; Initial value problem; Integrable system; Integral equation; Physics","score_opus":0.08093147424037729,"score_gpt":0.34921931659100486,"score_spread":0.2682878423506276,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2616123218","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.017477125,0.00013375991,0.90027565,0.010367823,0.00005838868,0.002299368,0.00007343239,0.000038255006,0.06927622],"genre_scores_gemma":[0.9828072,0.00000972607,0.016405307,0.000060121485,0.00017622761,0.00031428479,0.000025844782,0.000011639253,0.00018961905],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9992554,0.0001453585,0.00025960186,0.00011658292,0.000083363666,0.00013965544],"domain_scores_gemma":[0.996348,0.0022164513,0.000082239836,0.0012192725,0.00011019352,0.000023814806],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00078363495,0.000096043834,0.00015811852,0.000009804035,0.00041503154,0.00007120135,0.0005630485,0.000024821455,0.000022992586],"category_scores_gemma":[0.000085788735,0.000052781583,0.00007765695,0.00014740531,0.0009260821,0.00007124493,0.00025090572,0.00021339086,0.00001798351],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010878657,0.00014737267,0.00009232642,0.00001300411,0.00001961858,2.5860418e-9,0.0015282499,0.000017229228,0.00001401214,0.9893453,0.00009420789,0.008717782],"study_design_scores_gemma":[0.00038883102,0.000010911828,0.00010793775,0.000018964636,0.000026599713,8.0264456e-8,0.0004969541,0.30623534,0.000031832213,0.69179237,0.00083972537,0.00005047677],"about_ca_topic_score_codex":0.00006161277,"about_ca_topic_score_gemma":0.000014435615,"teacher_disagreement_score":0.9653301,"about_ca_system_score_codex":0.000017054768,"about_ca_system_score_gemma":0.000030072364,"threshold_uncertainty_score":0.3412188},"labels":[],"label_agreement":null},{"id":"W2618321052","doi":"10.1007/s00220-017-3081-9","title":"Averages of Eigenfunctions Over Hypersurfaces","year":2018,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Holomorphic and Operator Theory","field":"Mathematics","cited_by":16,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Agence Nationale de la Recherche","keywords":"Hypersurface; Eigenfunction; Riemannian manifold; Manifold (fluid mechanics); Measure (data warehouse); Sequence (biology)","score_opus":0.13414639519531651,"score_gpt":0.39246747883244326,"score_spread":0.25832108363712675,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2618321052","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.67027843,0.00023249538,0.074792355,0.00033692218,0.00013367886,0.0005511232,0.000028006449,0.00012370049,0.25352326],"genre_scores_gemma":[0.9315583,0.00004151054,0.06783987,0.000059029117,0.000031498326,0.000029735855,0.0000030683893,0.000023017647,0.00041398584],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99893135,0.00020012293,0.00041546088,0.00012845929,0.00016251343,0.00016207599],"domain_scores_gemma":[0.9968312,0.0011453661,0.000104785315,0.0017429573,0.00013257188,0.000043137155],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005151574,0.00012327307,0.0002844482,0.000045518012,0.0001373314,0.000014046905,0.00063833414,0.00007325629,0.0004250278],"category_scores_gemma":[0.00052452623,0.00010949817,0.00007535323,0.00034381278,0.0007581092,0.00010408494,0.00021507291,0.000202679,0.00015601757],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00000421508,0.00053911837,0.00044748277,0.000050721468,0.000023071134,1.7595053e-7,0.0012599251,0.0000020864404,0.0007146509,0.9958289,0.0006476891,0.00048196263],"study_design_scores_gemma":[0.0002327561,0.00003789474,0.00015641803,0.00008122024,0.000028990324,0.0000018169527,0.0005145554,0.0016327709,0.0022484546,0.99401456,0.0009260233,0.00012452796],"about_ca_topic_score_codex":0.0000030840774,"about_ca_topic_score_gemma":0.000007783715,"teacher_disagreement_score":0.26127985,"about_ca_system_score_codex":0.00003335398,"about_ca_system_score_gemma":0.00004053235,"threshold_uncertainty_score":0.46537563},"labels":[],"label_agreement":null},{"id":"W2622502366","doi":"10.1007/s00220-017-3065-9","title":"Fermionic Approach to Weighted Hurwitz Numbers and Topological Recursion","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Topological and Geometric Data Analysis","field":"Computer Science","cited_by":19,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University; Université de Montréal","funders":"Agence Nationale de la Recherche","keywords":"Generating function; Monotone polygon; Hypergeometric distribution; Recursion (computer science); Multiplicative function; Basis (linear algebra); Simple (philosophy); Quantum; Hurwitz matrix","score_opus":0.08829402534430071,"score_gpt":0.3472792679979914,"score_spread":0.2589852426536907,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2622502366","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.036642037,0.0001957715,0.8458209,0.012938148,0.000051759736,0.0003933736,0.000005946958,0.0001410449,0.10381103],"genre_scores_gemma":[0.7724025,0.000095067546,0.22706224,0.0001715275,0.000014175561,0.000038170365,0.000006367526,0.0000036414924,0.0002062618],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99889237,0.00011725131,0.000265643,0.00032338017,0.00018098707,0.0002203982],"domain_scores_gemma":[0.9955382,0.00037084718,0.00010420272,0.0038091098,0.000049080933,0.00012856444],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00042460818,0.00012265546,0.00027273357,0.00008023919,0.00054443773,0.0002863899,0.003879964,0.00007680388,0.000012679219],"category_scores_gemma":[0.00053400005,0.00009272406,0.000059005128,0.0005234253,0.00038003534,0.00037078987,0.0031057198,0.00025289532,0.00011510182],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000012061507,0.00038871937,0.0002820481,0.000008281588,0.0000075294124,5.9992357e-7,0.00018432575,0.0000040497807,0.000005908131,0.97886294,0.00009648363,0.020157909],"study_design_scores_gemma":[0.00015392597,0.000030690084,0.0046448484,0.000022907983,0.000010030614,0.0000045046695,0.00005876839,0.029899364,0.000020781497,0.9638817,0.0011117393,0.00016077892],"about_ca_topic_score_codex":0.000025141486,"about_ca_topic_score_gemma":0.0000046461078,"teacher_disagreement_score":0.7357605,"about_ca_system_score_codex":0.000033859695,"about_ca_system_score_gemma":0.0000132910745,"threshold_uncertainty_score":0.7210003},"labels":[],"label_agreement":null},{"id":"W2729893749","doi":"10.1007/s00220-020-03689-1","title":"Approximate Quantum Error Correction Revisited: Introducing the Alpha-Bit","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":26,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Air Force Office of Scientific Research; Canadian Institute for Advanced Research; Simons Foundation","keywords":"Quantum channel; Quantum capacity; Quantum error correction; Quantum teleportation; Qubit; Quantum entanglement; Quantum information; Quantum information science; Amplitude damping channel; Quantum algorithm","score_opus":0.046564295707404404,"score_gpt":0.299005864727243,"score_spread":0.2524415690198386,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2729893749","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0029109865,0.00022689377,0.97219765,0.022726668,0.0001295518,0.00028158328,0.0000014858628,0.00024249955,0.0012826703],"genre_scores_gemma":[0.7922371,0.000049068727,0.20608078,0.0013178223,0.00021997126,0.00004261241,0.000007795931,0.000021449332,0.000023397846],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9985857,0.00026790882,0.0003796741,0.00030923623,0.00022014572,0.0002373391],"domain_scores_gemma":[0.99669737,0.0007571244,0.00013561387,0.0022720417,0.00006603074,0.000071809154],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004940596,0.00015612866,0.00023685799,0.00003138858,0.00034276096,0.00017609328,0.0028277019,0.0000423318,0.0000050473013],"category_scores_gemma":[0.00038375804,0.00011367578,0.000084735024,0.00094296475,0.00016223357,0.0001858103,0.0013288176,0.0006518302,0.000098396216],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000031899908,0.0002609358,0.00004096481,0.00010044278,0.000019419169,0.0000016556426,0.0077701113,0.008252529,0.00022278503,0.88503224,0.002179164,0.096116565],"study_design_scores_gemma":[0.000089780835,0.000023887624,0.00006039912,0.00007555928,0.000006014553,0.0000064378683,0.000113166316,0.8368826,0.000080767095,0.16161516,0.00093109487,0.00011514129],"about_ca_topic_score_codex":0.0000043086816,"about_ca_topic_score_gemma":8.672731e-7,"teacher_disagreement_score":0.8286301,"about_ca_system_score_codex":0.000031131956,"about_ca_system_score_gemma":0.000034544497,"threshold_uncertainty_score":0.52546203},"labels":[],"label_agreement":null},{"id":"W2734523089","doi":"10.1007/s00220-019-03313-x","title":"Relative Commutant Pictures of Roe Algebras","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":27,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Ottawa","funders":"FP7 People: Marie-Curie Actions; Engineering and Physical Sciences Research Council","keywords":"Centralizer and normalizer; Mathematics; Diagonal; Pure mathematics; Dimension (graph theory); Algebra over a field; Space (punctuation); Extension (predicate logic); Computer science; Geometry","score_opus":0.09503313755156825,"score_gpt":0.4092506827652585,"score_spread":0.3142175452136903,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2734523089","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7018455,0.0007570937,0.12883233,0.0018848904,0.00009660852,0.0033097288,0.00005613349,0.00026415408,0.16295351],"genre_scores_gemma":[0.8411819,0.000047364974,0.15833414,0.000035823094,0.000011702168,0.000064425985,0.000009072037,0.000041169347,0.0002744411],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99812406,0.00032094037,0.00066857896,0.00020159276,0.00040052095,0.0002843113],"domain_scores_gemma":[0.99230415,0.003920911,0.000196745,0.0033207736,0.000191951,0.000065474305],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.000587813,0.0001907149,0.0005252803,0.00008943612,0.00008361889,0.000019945626,0.0015509687,0.000102289,0.00021137304],"category_scores_gemma":[0.0010647959,0.00016762657,0.000115313254,0.00059143826,0.00042178645,0.0002755489,0.00087567366,0.00068892667,0.00026407852],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009579179,0.0006498988,0.00068222574,0.0001915714,0.000035915262,5.503084e-7,0.0015967377,0.000036709785,0.001052816,0.9948379,0.00008469068,0.0008214261],"study_design_scores_gemma":[0.00042093755,0.00005344522,0.00021226708,0.00024140516,0.00001728001,0.0000022186189,0.00049146445,0.0066266158,0.0021713695,0.9894402,0.00015632679,0.00016649679],"about_ca_topic_score_codex":0.0000033336958,"about_ca_topic_score_gemma":0.0000075106736,"teacher_disagreement_score":0.16267908,"about_ca_system_score_codex":0.00010899336,"about_ca_system_score_gemma":0.000069477086,"threshold_uncertainty_score":0.6835613},"labels":[],"label_agreement":null},{"id":"W2739000410","doi":"10.1007/s00220-019-03300-2","title":"The Moonshine Anomaly","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":23,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Institut Périmètre de physique théorique; Ontario Ministry of Research and Innovation; Ontario Ministry of Research, Innovation and Science; Government of Canada; Innovation, Science and Economic Development Canada","keywords":"Mathematics; Anomaly (physics); AKA; Pure mathematics; Cohomology; Omega; Duality (order theory); Class (philosophy); Lattice (music); Order (exchange); Combinatorics; Mathematical physics; Physics; Computer science; Quantum mechanics; Artificial intelligence","score_opus":0.06709470849127525,"score_gpt":0.3506958370255636,"score_spread":0.28360112853428837,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2739000410","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.80806047,0.0007428565,0.012658142,0.0048462753,0.0005602144,0.0018225618,0.000005491826,0.0002741593,0.17102984],"genre_scores_gemma":[0.988109,0.000050206585,0.010954032,0.000055771692,0.000043500488,0.00006732067,0.0000024539097,0.000025531115,0.00069220166],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99890554,0.00012567555,0.00038463555,0.00014121245,0.00021724468,0.00022566272],"domain_scores_gemma":[0.9942252,0.0027780747,0.00011037501,0.002784178,0.00006209623,0.000040074163],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004228631,0.00013472697,0.00023300473,0.000019263625,0.00020575043,0.00006737271,0.0014554744,0.000064558735,0.000055815217],"category_scores_gemma":[0.00037791705,0.000091822505,0.00008855403,0.0002754201,0.00018439656,0.00009636035,0.00051116507,0.00035426443,0.00020430023],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000039236097,0.000119015276,0.0002667391,0.000024664276,0.000012705398,1.1371743e-7,0.00026564457,0.0000060686584,0.00001719753,0.9978573,0.00022775463,0.0011988796],"study_design_scores_gemma":[0.00024144058,0.00001533889,0.0001953285,0.000042777257,0.00001097511,0.0000015039045,0.00016531062,0.005832187,0.000038900034,0.9921752,0.001167054,0.0001139613],"about_ca_topic_score_codex":0.000003997272,"about_ca_topic_score_gemma":0.000007793962,"teacher_disagreement_score":0.18004851,"about_ca_system_score_codex":0.000054830743,"about_ca_system_score_gemma":0.000033945555,"threshold_uncertainty_score":0.37444133},"labels":[],"label_agreement":null},{"id":"W2740845329","doi":"10.1007/s00220-009-0919-9","title":"On q-Deformed $${\\mathfrak{gl}_{\\ell+1}}$$ -Whittaker Function II","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":20,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"The Mayer Institute","funders":"","keywords":"Mathematics; Cohomology; Combinatorics; Lattice (music); Toda lattice; Characteristic class; Space (punctuation); Function (biology); Generating function; Pure mathematics; Mathematical physics; Physics","score_opus":0.07207243895467846,"score_gpt":0.3474448596638232,"score_spread":0.27537242070914475,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2740845329","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6444353,0.0003215208,0.09685299,0.006156513,0.00075620855,0.0023671763,0.000014496652,0.00094024313,0.24815555],"genre_scores_gemma":[0.98609513,0.000027540857,0.012749223,0.00052886625,0.00011014506,0.00007040936,0.000014949396,0.000036999936,0.000366715],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99820495,0.00012664704,0.0006268678,0.0002814191,0.00040062776,0.00035950815],"domain_scores_gemma":[0.9959937,0.00096656056,0.00019069621,0.0026512565,0.00009971036,0.00009813095],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00035313662,0.00029250165,0.0004513554,0.00008595798,0.00037567547,0.000051844978,0.0010338288,0.00017682055,0.00011186977],"category_scores_gemma":[0.00050518726,0.0002509698,0.00016845175,0.0004702765,0.00015169797,0.0001886931,0.0002723737,0.0005998712,0.00012787714],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000026713173,0.0010064703,0.000005394814,0.000028483735,0.000018604089,5.106617e-7,0.0006634521,0.000029061046,0.000050668477,0.9915119,0.0010566188,0.005602152],"study_design_scores_gemma":[0.00060006836,0.00022226346,0.00016924068,0.00014654732,0.00004179966,0.000002690308,0.000105466126,0.0035491388,0.00010033259,0.9943054,0.0004909993,0.00026610598],"about_ca_topic_score_codex":0.0000018721967,"about_ca_topic_score_gemma":0.0000022669617,"teacher_disagreement_score":0.34165984,"about_ca_system_score_codex":0.0001374806,"about_ca_system_score_gemma":0.000046591478,"threshold_uncertainty_score":0.9999943},"labels":[],"label_agreement":null},{"id":"W2743806489","doi":"10.1007/s00220-017-2958-y","title":"Complex Bounds for Real Maps","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":18,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"FP7 Ideas: European Research Council; Fundação de Amparo à Pesquisa do Estado de São Paulo; Natural Sciences and Engineering Research Council of Canada; University of Warwick; Imperial College London; National Science Foundation","keywords":"Mathematics; Holomorphic function; Julia set; Interval (graph theory); A priori and a posteriori; Neighbourhood (mathematics); Markov chain; Domain (mathematical analysis); Pure mathematics; Discrete mathematics; Combinatorics; Mathematical analysis","score_opus":0.28881669146717476,"score_gpt":0.45635450069224465,"score_spread":0.1675378092250699,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2743806489","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.01304162,0.000036883743,0.48774794,0.005375859,0.00012139544,0.0023113724,0.00020688087,0.000251649,0.4909064],"genre_scores_gemma":[0.57567495,0.000070408285,0.42278194,0.000068736386,0.000084569205,0.00038769472,0.000057691785,0.000063552165,0.00081045995],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9983524,0.000076305136,0.0007008168,0.00025278146,0.00024139529,0.00037627987],"domain_scores_gemma":[0.99158126,0.0026341008,0.0003960459,0.00513415,0.00014853069,0.00010588447],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00090546184,0.00023351269,0.0005675522,0.000046727542,0.00080376514,0.0002796925,0.0025709192,0.00012592718,0.00006567606],"category_scores_gemma":[0.0021806026,0.00021466806,0.00020318522,0.00008570445,0.00061961403,0.00023802221,0.00082044443,0.0002906479,0.00008210004],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006918504,0.0007654033,0.00008526294,0.00029813018,0.000025517234,5.6067347e-7,0.0003219401,0.0000010046956,0.000112269314,0.9936602,0.0016213281,0.0031014606],"study_design_scores_gemma":[0.0004970346,0.000025779245,0.00030109606,0.00014158153,0.00003803006,0.000002191661,0.0000836339,0.072819546,0.000022786297,0.92404526,0.0017942189,0.00022881762],"about_ca_topic_score_codex":0.000010660512,"about_ca_topic_score_gemma":0.000038161194,"teacher_disagreement_score":0.56263334,"about_ca_system_score_codex":0.000080754086,"about_ca_system_score_gemma":0.00004157006,"threshold_uncertainty_score":0.87539095},"labels":[],"label_agreement":null},{"id":"W2753909436","doi":"10.1007/s00220-019-03314-w","title":"K3 Elliptic Genus and an Umbral Moonshine Module","year":2019,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Horizon 2020 Framework Programme; Aspen Center for Physics; U.S. Department of Energy; Harvard University; European Research Council; National Science Foundation","keywords":"Physics; Genus; Homogeneous space; String theory; Mathematical physics; Vertex operator algebra; Lattice (music); Pure mathematics; Algebra over a field; Mathematics; Current algebra; Geometry; Biology","score_opus":0.11752630562097825,"score_gpt":0.3820325807836909,"score_spread":0.26450627516271263,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2753909436","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9368117,0.001206821,0.046711277,0.0006208429,0.00054891885,0.0020173253,0.000059046382,0.00028254438,0.011741537],"genre_scores_gemma":[0.9314481,0.00020389263,0.06762749,0.00005911545,0.00017277017,0.0001644784,0.00006993386,0.00008897104,0.00016524001],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9977938,0.0002918457,0.00073574187,0.00049548916,0.00034081467,0.0003423041],"domain_scores_gemma":[0.99303323,0.0011296733,0.00031427082,0.0052741957,0.000116489,0.00013214382],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00046121186,0.0004307912,0.00085350126,0.00008010846,0.00014578989,0.00015605499,0.0019847779,0.00040463242,0.000041044765],"category_scores_gemma":[0.00036435563,0.00041328365,0.0001490301,0.00017982378,0.00032615286,0.00016451329,0.0032627115,0.001423761,0.000043160162],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006231065,0.00049790245,0.00012135522,0.0005769666,0.000046585563,7.510768e-7,0.0013027043,0.00027619663,0.000010242663,0.9959093,0.00009002243,0.0011617608],"study_design_scores_gemma":[0.0003244468,0.00003079585,0.000100451056,0.00031115106,0.00009021578,0.0000034877635,0.00013748162,0.08946263,0.00002678197,0.90907234,0.00005575837,0.00038444396],"about_ca_topic_score_codex":0.000018615452,"about_ca_topic_score_gemma":0.000010196453,"teacher_disagreement_score":0.08918644,"about_ca_system_score_codex":0.0001358203,"about_ca_system_score_gemma":0.00012152525,"threshold_uncertainty_score":0.9998319},"labels":[],"label_agreement":null},{"id":"W2755105463","doi":"10.1007/s00220-018-3143-7","title":"On the TAP Free Energy in the Mixed p-Spin Models","year":2018,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":19,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Infimum and supremum; Energy (signal processing); Entropy (arrow of time); Ising model; Space (punctuation); Free space; Representation (politics); Magnetization","score_opus":0.04528331096767566,"score_gpt":0.2947104601785684,"score_spread":0.24942714921089273,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2755105463","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.045712456,0.00003778914,0.4776784,0.009176207,0.00006353629,0.00051353325,0.000038476453,0.000039444836,0.46674016],"genre_scores_gemma":[0.9968282,0.000001989239,0.0020762414,0.00060761714,0.00014644748,0.00025719995,0.000020255924,0.0000140379925,0.000048019072],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988613,0.00029941817,0.00028406858,0.00014383644,0.00021841293,0.00019295575],"domain_scores_gemma":[0.9957461,0.0021538697,0.00006742273,0.0019448235,0.00006214522,0.000025655047],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00032421053,0.0001379538,0.00015595931,0.000022072227,0.00021273246,0.000059474143,0.0019858393,0.000026299018,0.00007769409],"category_scores_gemma":[0.000041258438,0.000082248414,0.00008308204,0.00041386913,0.0006231466,0.000085923515,0.0003819955,0.00031773755,0.00012133005],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00000389837,0.00070120604,0.000012140908,0.000002347372,0.000009213629,1.0821499e-7,0.000652839,0.00033986394,0.0000074598956,0.9931192,0.00080213475,0.004349616],"study_design_scores_gemma":[0.00016051946,0.000022043594,0.00008188536,0.000034598375,0.0000073914025,1.6329587e-7,0.0003453402,0.10876544,0.00006907367,0.890187,0.00023474441,0.0000917892],"about_ca_topic_score_codex":0.000025916392,"about_ca_topic_score_gemma":0.00000765876,"teacher_disagreement_score":0.9511157,"about_ca_system_score_codex":0.000020190531,"about_ca_system_score_gemma":0.000028296692,"threshold_uncertainty_score":0.36902165},"labels":[],"label_agreement":null},{"id":"W2760830203","doi":"10.1007/s00220-018-3138-4","title":"Soliton Resolution for the Derivative Nonlinear Schrödinger Equation","year":2018,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":91,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Simons Foundation","keywords":"Soliton; Nonlinear system; Sobolev space; Space (punctuation); Derivative (finance); Resolution (logic); Order (exchange); Nonlinear optics","score_opus":0.10595852545657494,"score_gpt":0.3767344433292265,"score_spread":0.27077591787265154,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2760830203","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.008512903,0.00005691978,0.97005653,0.0019256982,0.00008180746,0.0007102787,0.00005168107,0.00003256265,0.018571641],"genre_scores_gemma":[0.86861086,0.000007725762,0.1300335,0.000069659385,0.0007691542,0.00019245468,0.000089813635,0.000021847114,0.00020498237],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99921066,0.00006955711,0.0002812434,0.00013282431,0.00010465488,0.00020105188],"domain_scores_gemma":[0.9976096,0.0009967464,0.000098901626,0.0010943565,0.00016942396,0.000030946205],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003277557,0.00010784729,0.00014269383,0.00002320747,0.00043300295,0.000052227693,0.0005626929,0.00003314601,0.00005454701],"category_scores_gemma":[0.00008259702,0.00008180559,0.000087593275,0.00023605017,0.00038048613,0.00012145634,0.0002052353,0.00018575229,0.00009673615],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000007180503,0.00036944498,0.00017124799,0.000010943227,0.000029260536,1.1049095e-8,0.0011859054,0.000060372146,0.00017301153,0.989305,0.0002875334,0.008400095],"study_design_scores_gemma":[0.0002155299,0.00003012835,0.00011603512,0.00004246362,0.000022576676,9.3319436e-8,0.00060051074,0.45948544,0.0006408251,0.5340034,0.0047489563,0.00009406967],"about_ca_topic_score_codex":0.000019645819,"about_ca_topic_score_gemma":0.000005171581,"teacher_disagreement_score":0.86009794,"about_ca_system_score_codex":0.000032518707,"about_ca_system_score_gemma":0.000045421355,"threshold_uncertainty_score":0.33359352},"labels":[],"label_agreement":null},{"id":"W2762045958","doi":"10.1007/s00220-018-3210-0","title":"Noncommutative Painlevé Equations and Systems of Calogero Type","year":2018,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":15,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Concordia University","funders":"H2020 Marie Skłodowska-Curie Actions; Natural Sciences and Engineering Research Council of Canada; Horizon 2020 Framework Programme; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Fonds Québécois de la Recherche sur la Nature et les Technologies; Russian Foundation for Basic Research; Agence Nationale de la Recherche","keywords":"Noncommutative geometry; Trigonometry; Generalization; Hamiltonian system; Type (biology); Hamiltonian (control theory); Coupling (piping)","score_opus":0.14206149142092833,"score_gpt":0.3903598261018164,"score_spread":0.24829833468088808,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2762045958","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.59133613,0.0011012512,0.35868645,0.0007575383,0.00054855226,0.0018739611,0.00003414745,0.00020501872,0.04545698],"genre_scores_gemma":[0.9780667,0.000028060676,0.021727111,0.000018103905,0.000054292068,0.0000368586,0.000005024188,0.000019149002,0.000044731525],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988888,0.00021207785,0.00045532535,0.00012695714,0.00016968942,0.00014718474],"domain_scores_gemma":[0.995413,0.0028250322,0.0001759878,0.0012775594,0.00026222895,0.000046173165],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00041270445,0.00012442803,0.00032997553,0.00004667089,0.00012958444,0.000023669005,0.00053562556,0.00007859033,0.000016637392],"category_scores_gemma":[0.0010409704,0.00011010754,0.00003837799,0.00036041447,0.0006126941,0.000086217166,0.0003517596,0.00019205257,0.000014377548],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000049742207,0.00017664458,0.00008097608,0.0000851001,0.000023331118,1.0818409e-7,0.0023623295,0.000005074467,0.00006700533,0.99666363,0.00007090179,0.00045993816],"study_design_scores_gemma":[0.00022252032,0.000069117006,0.000055595614,0.00014201453,0.000029521521,0.0000014106162,0.0005885142,0.024180863,0.00010593567,0.97445625,0.00004262471,0.00010564113],"about_ca_topic_score_codex":0.000018297489,"about_ca_topic_score_gemma":0.000009107631,"teacher_disagreement_score":0.38673055,"about_ca_system_score_codex":0.000038631177,"about_ca_system_score_gemma":0.000044250068,"threshold_uncertainty_score":0.4490055},"labels":[],"label_agreement":null},{"id":"W2763393928","doi":"10.1007/s00220-008-0640-0","title":"Justification of the Lattice Equation for a Nonlinear Elliptic Problem with a Periodic Potential","year":2008,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":24,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McMaster University","funders":"Engineering and Physical Sciences Research Council","keywords":"Floquet theory; Elliptic function; Nonlinear system; Lattice (music); Jacobi elliptic functions; Elliptic operator; Elliptic curve; Toda lattice; Algebraic equation","score_opus":0.057663824361963004,"score_gpt":0.30137631288007216,"score_spread":0.24371248851810917,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2763393928","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.25727603,0.000053998487,0.7316252,0.0013738709,0.000033791457,0.0016324444,0.0001168711,0.000028140124,0.007859661],"genre_scores_gemma":[0.8352554,0.000004638396,0.16433424,0.000012031513,0.00006141028,0.00011660245,0.00006086569,0.000013987364,0.00014087114],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9992775,0.000060941366,0.0002962044,0.00010932209,0.00012998791,0.00012608017],"domain_scores_gemma":[0.99848324,0.00022013612,0.00015709078,0.0009815871,0.00013355882,0.000024359486],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0001335865,0.0000926633,0.00016188872,0.000018937459,0.00023552316,0.000014479636,0.00046917365,0.000025436138,0.000012940765],"category_scores_gemma":[0.000017987615,0.00006553458,0.00008656254,0.00024439563,0.00030418107,0.00007973873,0.00010098106,0.00015209701,0.000010229196],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000023172874,0.0018331829,0.002099369,0.00015987665,0.000059576578,9.298854e-8,0.0031627505,0.0022837261,0.0008363516,0.98666364,0.000055321656,0.0028229123],"study_design_scores_gemma":[0.0010228301,0.00007259945,0.0014642525,0.00022416833,0.00014830175,0.0000031638567,0.0008339248,0.5870881,0.0015069974,0.4067076,0.0006770781,0.00025093107],"about_ca_topic_score_codex":0.000010510073,"about_ca_topic_score_gemma":0.0000011807413,"teacher_disagreement_score":0.5848044,"about_ca_system_score_codex":0.000017399962,"about_ca_system_score_gemma":0.000095843265,"threshold_uncertainty_score":0.26724225},"labels":[],"label_agreement":null},{"id":"W2775170060","doi":"10.1007/s00220-019-03551-z","title":"The 1 / N Expansion of the Symmetric Traceless and the Antisymmetric Tensor Models in Rank Three","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":50,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Antisymmetric relation; Symmetric tensor; Rank (graph theory); Antisymmetric tensor; Tensor (intrinsic definition); Conjecture; Coupling (piping); Mathematics; Order (exchange); Coupling constant; Physics; Mathematical physics; Combinatorics; Pure mathematics; Mathematical analysis; Exact solutions in general relativity; Quantum mechanics; Engineering","score_opus":0.02301841670175475,"score_gpt":0.2644932720151541,"score_spread":0.24147485531339935,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2775170060","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.85436165,0.0014599017,0.05344533,0.0038764048,0.00010546933,0.0024640602,0.000026306287,0.000021627538,0.08423922],"genre_scores_gemma":[0.9991709,0.000089872185,0.0005687187,0.000028123477,0.000020185782,0.00006135301,0.000002459586,0.00001703693,0.00004137592],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987073,0.00027165245,0.00043999735,0.00014781825,0.00022173382,0.00021152453],"domain_scores_gemma":[0.9947877,0.0030545383,0.00015925788,0.0019061837,0.00006647273,0.000025849795],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0007243449,0.00014157586,0.00032744065,0.000040925475,0.00019073933,0.000049140406,0.0012809176,0.00003922383,0.0000073491324],"category_scores_gemma":[0.000055107776,0.00006866288,0.00013326197,0.001199173,0.0009175891,0.000106167165,0.00062345393,0.00048933347,0.000015526366],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000131621255,0.0002013941,0.0021054456,0.000022528147,0.000015857484,1.659262e-8,0.00033712093,0.00030175503,0.000009696719,0.9838141,0.0000059182616,0.013172977],"study_design_scores_gemma":[0.0008102788,0.0000071755885,0.0021866811,0.000083734325,0.000020626532,1.7294502e-7,0.00042319804,0.1349769,0.00007441656,0.8613216,0.000018427594,0.0000767902],"about_ca_topic_score_codex":0.000040779876,"about_ca_topic_score_gemma":0.000005854632,"teacher_disagreement_score":0.1448092,"about_ca_system_score_codex":0.000016939237,"about_ca_system_score_gemma":0.00003187618,"threshold_uncertainty_score":0.33808956},"labels":[],"label_agreement":null},{"id":"W2794605529","doi":"10.1007/s00220-019-03434-3","title":"Tracy–Widom Fluctuations in 2D Random Schrödinger Operators","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":2,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Uniwersytet Warszawski","keywords":"Eigenvalues and eigenvectors; Lattice (music); Partition function (quantum field theory); Partition (number theory); Operator (biology); Square lattice; Random matrix; Weight function; Type (biology)","score_opus":0.05763593105955296,"score_gpt":0.36063512324728275,"score_spread":0.3029991921877298,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2794605529","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7965247,0.0005398317,0.067310244,0.0039857477,0.00013712919,0.0046871705,0.000038378406,0.00032496924,0.12645179],"genre_scores_gemma":[0.92996925,0.00013708715,0.06866554,0.00008932512,0.00003970457,0.00053907104,0.000025557616,0.000048573955,0.00048591042],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9980243,0.00021097362,0.0008717717,0.00029260607,0.000273251,0.00032709105],"domain_scores_gemma":[0.9940757,0.003061141,0.00017259842,0.0025170983,0.00009790279,0.00007554528],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00084418675,0.00023010695,0.00055722584,0.00016342475,0.00014623432,0.00008840871,0.0012251765,0.000119612065,0.00027428116],"category_scores_gemma":[0.00052652357,0.00021297767,0.00014397193,0.0010871183,0.00015829611,0.0003045186,0.00031178587,0.0005301042,0.0007569117],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000015685115,0.0011228564,0.00084346236,0.00012251551,0.000019323283,4.7545336e-7,0.0014340114,0.00020156777,0.00048113868,0.9938938,0.00037666693,0.0014885227],"study_design_scores_gemma":[0.0030130076,0.000015258904,0.00054279866,0.00021311436,0.0000361704,0.0000025195584,0.00062723795,0.041464332,0.00015083498,0.9522048,0.001428084,0.0003018167],"about_ca_topic_score_codex":0.000015314468,"about_ca_topic_score_gemma":0.000033164935,"teacher_disagreement_score":0.1334445,"about_ca_system_score_codex":0.00011682579,"about_ca_system_score_gemma":0.0000728672,"threshold_uncertainty_score":0.9728821},"labels":[],"label_agreement":null},{"id":"W2794645221","doi":"10.1007/s00220-019-03518-0","title":"A Borcherds–Kac–Moody Superalgebra with Conway Symmetry","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":9,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Institut Périmètre de physique théorique; Ministero dell’Istruzione, dell’Università e della Ricerca; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Aspen Center for Physics; Office of Science; Canada Research Chairs; California Institute of Technology; High Energy Physics; U.S. Department of Energy; National Science Foundation","keywords":"Superstring theory; Superalgebra; Cohomology; Automorphism; Partition function (quantum field theory); Genus; Lie superalgebra; Type (biology); Superconformal algebra; Conformal field theory","score_opus":0.0535059654725556,"score_gpt":0.33066195398782,"score_spread":0.2771559885152644,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2794645221","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.90655124,0.00020734667,0.013538006,0.0011819026,0.00015273724,0.001642151,0.000009422905,0.00025413733,0.07646303],"genre_scores_gemma":[0.9626414,0.000022223689,0.03659029,0.00012739694,0.000051061266,0.00012620915,0.000011535301,0.000060828028,0.0003690285],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998352,0.00016573076,0.00048599267,0.0002854225,0.00036643562,0.00034443956],"domain_scores_gemma":[0.99516356,0.0014625086,0.00013859388,0.0030251371,0.00011924064,0.00009094201],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003327013,0.00026658355,0.0005223909,0.00006244616,0.0001135695,0.00006886923,0.0013141445,0.00013634423,0.0002692894],"category_scores_gemma":[0.00019876819,0.0002125902,0.0001053019,0.00052157685,0.00023658018,0.00020943544,0.00046533425,0.00057492394,0.00021318531],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000013757556,0.00042311457,0.0007865268,0.00013311328,0.00004432271,7.9249446e-7,0.00078775076,0.000008182802,0.000054734686,0.99714255,0.000108135355,0.0004970077],"study_design_scores_gemma":[0.00081475964,0.00007553152,0.00016484507,0.00020276206,0.000037714042,0.0000062199447,0.00037816993,0.0030098814,0.00019062811,0.99456334,0.00026929934,0.00028683408],"about_ca_topic_score_codex":0.00000756737,"about_ca_topic_score_gemma":0.000005672527,"teacher_disagreement_score":0.076094,"about_ca_system_score_codex":0.000099733625,"about_ca_system_score_gemma":0.00008403059,"threshold_uncertainty_score":0.86691767},"labels":[],"label_agreement":null},{"id":"W2799017499","doi":"10.1007/s00220-019-03288-9","title":"Vanishing of Categorical Obstructions for Permutation Orbifolds","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":12,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada","keywords":"Categorical variable; Orbifold; Conjecture; Permutation (music); Vertex operator algebra; Conformal field theory; Operator algebra; Vertex (graph theory); Extension (predicate logic); Fusion rules","score_opus":0.09373820383400677,"score_gpt":0.3761496278475149,"score_spread":0.2824114240135081,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2799017499","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7101131,0.00011376165,0.27508488,0.0005594761,0.0004100477,0.0018124696,0.000018088469,0.00012095538,0.011767204],"genre_scores_gemma":[0.9215408,0.000009918641,0.078154325,0.000012328772,0.000039520266,0.00010715917,0.000014740051,0.000026665595,0.00009454265],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99888873,0.000069399684,0.00051989284,0.00016043407,0.00018886212,0.00017268307],"domain_scores_gemma":[0.99642414,0.00188694,0.00019150182,0.0013061828,0.00015422858,0.000036992875],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00025373852,0.00012945768,0.00034995616,0.000048034253,0.000085808926,0.000022634867,0.0006634822,0.00009939822,0.000041313928],"category_scores_gemma":[0.00043881964,0.0001223011,0.0001292728,0.00028581676,0.00010315237,0.00015406056,0.0001892402,0.00020209249,0.000014703164],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000066062576,0.00022114435,0.00014735485,0.00017774671,0.00001891467,4.2442124e-8,0.0010704035,0.00006575491,0.00021398415,0.99726427,0.000051791932,0.00076200714],"study_design_scores_gemma":[0.00043034935,0.000036052006,0.00006967159,0.000053629843,0.000034283257,0.0000019174831,0.0005884719,0.016410496,0.00029784118,0.98187256,0.00008159117,0.00012315458],"about_ca_topic_score_codex":0.0000048822567,"about_ca_topic_score_gemma":0.0000024331505,"teacher_disagreement_score":0.21142769,"about_ca_system_score_codex":0.00007642379,"about_ca_system_score_gemma":0.000048405742,"threshold_uncertainty_score":0.4987294},"labels":[],"label_agreement":null},{"id":"W2799240000","doi":"10.1007/s00220-019-03673-4","title":"S-duality for the Large N = 4 Superconformal Algebra","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":23,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute; University of Alberta","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Simons Foundation","keywords":"Vertex operator algebra; Superconformal algebra; Central charge; Superalgebra; Algebra representation; Cellular algebra; Current algebra; Vertex (graph theory); Supersymmetry algebra; Affine transformation","score_opus":0.28091532568706895,"score_gpt":0.45746584870733153,"score_spread":0.17655052302026258,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2799240000","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.008968856,0.00025709087,0.96177864,0.020436853,0.000030424593,0.0021545608,0.00009421953,0.00018328254,0.0060960893],"genre_scores_gemma":[0.8279904,0.00007137071,0.16986272,0.0011076602,0.0001189479,0.000683901,0.000026170575,0.00005828525,0.00008053342],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984274,0.00016155242,0.0005210364,0.0001959213,0.00029687534,0.0003972187],"domain_scores_gemma":[0.9919687,0.005672278,0.00007372733,0.0020180754,0.00015711895,0.00011012202],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0009288815,0.00017000029,0.00031769625,0.000019423951,0.00036769384,0.00006758591,0.0018954093,0.00007184322,0.000089945046],"category_scores_gemma":[0.0029988016,0.000124056,0.00013557373,0.00043584642,0.0002965236,0.00026524122,0.0008751511,0.00054496113,0.00012439463],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000012529693,0.0003100813,0.00005349334,0.00016333257,0.000025300838,2.405668e-7,0.0025578903,0.000011007164,0.00006719844,0.9940052,0.00097402977,0.0018196827],"study_design_scores_gemma":[0.0005727832,0.000035577075,0.000037774906,0.000030384179,0.000025863912,9.980852e-7,0.0013352034,0.09209651,0.00032885966,0.9002293,0.005149969,0.00015679646],"about_ca_topic_score_codex":0.0000010199303,"about_ca_topic_score_gemma":0.000008299866,"teacher_disagreement_score":0.8190216,"about_ca_system_score_codex":0.00005671812,"about_ca_system_score_gemma":0.00007103004,"threshold_uncertainty_score":0.50588566},"labels":[],"label_agreement":null},{"id":"W2807736484","doi":"10.1007/s00220-019-03600-7","title":"Diffusion Limit for a Slow-Fast Standard Map","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Directorate for Mathematical and Physical Sciences","keywords":"Standard map; Limit (mathematics); Formalism (music); Central limit theorem; Random variable; Initial value problem; Variable (mathematics)","score_opus":0.07908406717316285,"score_gpt":0.37226539347683363,"score_spread":0.2931813263036708,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2807736484","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.17724176,0.00020792337,0.6812568,0.0038374856,0.00039969312,0.007498029,0.00016809875,0.0008374318,0.12855282],"genre_scores_gemma":[0.5608628,0.00003444027,0.43635678,0.00018470449,0.00014148692,0.0006064249,0.000044115288,0.00016396728,0.0016052846],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9973986,0.00020517557,0.0009335205,0.00041799084,0.0004816875,0.0005629878],"domain_scores_gemma":[0.9892193,0.0063603297,0.00027657452,0.0038143755,0.00020011947,0.00012928335],"candidate_categories":["metaepi_narrow","insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0010178573,0.0003863306,0.0008515351,0.00009219533,0.00018233167,0.000090518675,0.001833192,0.00017233021,0.0002403114],"category_scores_gemma":[0.0010144507,0.00035241136,0.00032216747,0.00046378883,0.0003301926,0.00026694263,0.0006801186,0.0005619613,0.0008305388],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000049345257,0.0011331722,0.000072709394,0.00074986235,0.000038547765,4.376609e-7,0.0009777264,0.000013722929,0.0008496104,0.9933082,0.0007838077,0.0020228648],"study_design_scores_gemma":[0.0010407356,0.00012631797,0.000021412381,0.00047927123,0.000060484694,0.0000023419386,0.00039277808,0.020011906,0.0006594735,0.9752862,0.001518487,0.00040060678],"about_ca_topic_score_codex":0.0000011725657,"about_ca_topic_score_gemma":0.0000041533326,"teacher_disagreement_score":0.38362104,"about_ca_system_score_codex":0.00023565089,"about_ca_system_score_gemma":0.00006488403,"threshold_uncertainty_score":0.9999474},"labels":[],"label_agreement":null},{"id":"W2808550443","doi":"10.1007/s00220-019-03597-z","title":"Classification of Quantum Groups via Galois Cohomology","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"","keywords":"Galois cohomology; Group cohomology; Galois group; Quantum cohomology; Cohomology; Differential Galois theory; Algebra over a field; Embedding problem; Fundamental theorem of Galois theory","score_opus":0.07285322133939535,"score_gpt":0.3443307253813654,"score_spread":0.27147750404197,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2808550443","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8888995,0.000107336266,0.09343839,0.0004677274,0.00021182561,0.00079720217,0.000005100258,0.000085629115,0.015987288],"genre_scores_gemma":[0.9866575,0.00002328755,0.013108961,0.000026128817,0.00002726935,0.000057444475,0.000012267331,0.000028212615,0.000058906116],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985811,0.0001785911,0.0006266763,0.00019081192,0.00022758362,0.00019524334],"domain_scores_gemma":[0.9957305,0.0014449689,0.00028049096,0.0023797457,0.00012279689,0.000041503947],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003602933,0.00015485639,0.00045246197,0.00006036222,0.000053359767,0.0000120912455,0.0010248641,0.00013479206,0.00011079038],"category_scores_gemma":[0.00024355989,0.0001439121,0.0001079912,0.00033695836,0.00023743382,0.000109149296,0.00032966258,0.00031150374,0.000103319144],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000007969734,0.00042078446,0.0008368234,0.00013766527,0.000020706346,1.1576085e-7,0.0005922421,0.000008054341,0.0007583191,0.9965936,0.000053076652,0.0005706223],"study_design_scores_gemma":[0.00035959028,0.00004061002,0.0011437221,0.00007528921,0.000024164538,0.0000027010178,0.00018684726,0.034705248,0.00019228441,0.96309125,0.00004243871,0.00013585162],"about_ca_topic_score_codex":0.000008004312,"about_ca_topic_score_gemma":0.0000027291,"teacher_disagreement_score":0.09775802,"about_ca_system_score_codex":0.00006884146,"about_ca_system_score_gemma":0.000038720387,"threshold_uncertainty_score":0.58685654},"labels":[],"label_agreement":null},{"id":"W2810866271","doi":"10.1007/s00220-021-03942-1","title":"Rigorous Asymptotics of a KdV Soliton Gas","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":45,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Mila - Quebec Artificial Intelligence Institute","funders":"Horizon 2020 Framework Programme; H2020 European Research Council; Directorate for Mathematical and Physical Sciences; Scuola Internazionale Superiore di Studi Avanzati; National Science Foundation","keywords":"Korteweg–de Vries equation; Soliton; Limit (mathematics); Zero (linguistics); Space (punctuation); Class (philosophy); Nonlinear system; Order (exchange)","score_opus":0.037838683451726765,"score_gpt":0.3316286391987979,"score_spread":0.2937899557470712,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2810866271","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.28732818,0.0005259592,0.1856757,0.0023066592,0.00015738553,0.00058032665,0.000213768,0.0000813509,0.52313066],"genre_scores_gemma":[0.93964297,0.000021218175,0.05984021,0.000026588881,0.000085480206,0.00001555938,0.00007532068,0.00001719879,0.00027548018],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991152,0.000095528594,0.0003722146,0.000121609955,0.00012275849,0.00017268097],"domain_scores_gemma":[0.99783266,0.0003779736,0.00009429133,0.0015254442,0.000121053745,0.0000485961],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00012366865,0.000105112274,0.000264817,0.000020364792,0.000071569215,0.00002241034,0.00046330926,0.000033026932,0.00014357148],"category_scores_gemma":[0.000035374116,0.00010530641,0.000117315794,0.00027852887,0.00017651866,0.000065184184,0.0003595507,0.00023563276,0.000059434136],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000010929413,0.0010994312,0.0013613505,0.000036053767,0.000030366307,5.3816996e-7,0.0005273973,0.00006564324,0.00040156243,0.99063677,0.00007088663,0.0057688975],"study_design_scores_gemma":[0.00026289458,0.000010972495,0.00022485002,0.00010162329,0.000029357627,0.0000010972918,0.000695261,0.02007926,0.0035534801,0.9738404,0.0010674569,0.00013335989],"about_ca_topic_score_codex":0.000013685044,"about_ca_topic_score_gemma":0.0000032728099,"teacher_disagreement_score":0.6523148,"about_ca_system_score_codex":0.000018130544,"about_ca_system_score_gemma":0.00009243024,"threshold_uncertainty_score":0.4294271},"labels":[],"label_agreement":null},{"id":"W2886234391","doi":"10.1007/s00220-019-03649-4","title":"Bounding Flows for Spherical Spin Glass Dynamics","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":19,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"United States-Israel Binational Science Foundation; National Science Foundation","keywords":"Spin glass; Saddle point; Phase diagram; Sobolev space; Critical point (mathematics); Spin (aerodynamics); Langevin dynamics; Phase (matter); Dynamics (music)","score_opus":0.020877423922210037,"score_gpt":0.3097934505575186,"score_spread":0.2889160266353086,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2886234391","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.086743966,0.000017244016,0.861602,0.0008954692,0.00008932097,0.0006773743,0.000051751613,0.00005155778,0.049871318],"genre_scores_gemma":[0.91737723,0.0000010075719,0.08192993,0.000053320317,0.00011241545,0.00013560338,0.00014838636,0.000027473261,0.00021465129],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99898,0.000058063284,0.0003516559,0.00020309995,0.00015075871,0.0002564177],"domain_scores_gemma":[0.99784786,0.0009728797,0.0000862404,0.00095040054,0.00007942204,0.00006319227],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00017144234,0.00016080373,0.0002874814,0.000020140034,0.00011592725,0.00006393372,0.0007207647,0.000038820253,0.00014691408],"category_scores_gemma":[0.000023002416,0.00015484485,0.00015529552,0.00026587237,0.00014262836,0.00013497773,0.00028256467,0.00025437336,0.0003586391],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000072680623,0.00047168307,0.0007545783,0.000035741356,0.000021191565,3.8747984e-8,0.00013987586,0.0008132869,0.00007623333,0.9868129,0.000039484607,0.0108277025],"study_design_scores_gemma":[0.0002634705,0.00001770432,0.00006170341,0.000037648413,0.000010578452,1.2482373e-7,0.0001866265,0.3733309,0.00004338302,0.62557673,0.0003505055,0.00012061213],"about_ca_topic_score_codex":0.0000047226367,"about_ca_topic_score_gemma":0.0000012082863,"teacher_disagreement_score":0.8306332,"about_ca_system_score_codex":0.00007280946,"about_ca_system_score_gemma":0.00004646819,"threshold_uncertainty_score":0.631439},"labels":[],"label_agreement":null},{"id":"W2896293035","doi":"10.1007/s00220-020-03800-6","title":"Quantum Fields and Local Measurements","year":2020,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Quantum Electrodynamics and Casimir Effect","field":"Physics and Astronomy","cited_by":3,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Banff International Research Station for Mathematical Innovation and Discovery; Mathematisches Forschungsinstitut Oberwolfach; Max-Planck-Institut für Mathematik in den Naturwissenschaften; Universität Potsdam; University of York","keywords":"Observable; Physics; Spacetime; Scalar (mathematics); Scalar field; Quantum field theory; Disjoint sets; Bounded function; Causality (physics); Scattering; Quantum system; Covariant transformation; Coupling (piping); Quantum mechanics; Quantum; Classical mechanics; Theoretical physics; Mathematics; Mathematical analysis; Geometry","score_opus":0.0788954519020189,"score_gpt":0.33626893510703765,"score_spread":0.25737348320501874,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2896293035","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.044700567,0.00055598904,0.91966563,0.0033877615,0.00010705117,0.0009834333,0.00006524387,0.000088423374,0.030445911],"genre_scores_gemma":[0.99521244,0.000039697145,0.0042267824,0.00008098769,0.00008349674,0.00017619353,0.00013089116,0.000033905166,0.000015634263],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99868363,0.00017247169,0.00039940255,0.0003173828,0.00019547725,0.00023164717],"domain_scores_gemma":[0.9978764,0.00029185397,0.00014614123,0.0015375743,0.000056903587,0.00009113012],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00025233463,0.00026648177,0.00044420856,0.00003293078,0.00010212342,0.00008546813,0.00089013454,0.00011753086,0.000039460338],"category_scores_gemma":[0.000024224972,0.0002687507,0.00012858519,0.00013776982,0.00022794779,0.00004829674,0.0016612464,0.0011560665,0.000047016994],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006479188,0.0004858208,0.0009961126,0.0002561999,0.00011196511,8.301411e-7,0.00052344,0.0003342299,0.00006732358,0.97847575,0.00027018905,0.018471688],"study_design_scores_gemma":[0.0001568843,0.000018706101,0.000125796,0.0001549482,0.000042793912,3.13083e-7,0.00006923428,0.29205132,0.00004556501,0.707083,0.000063318475,0.00018815324],"about_ca_topic_score_codex":0.000041880965,"about_ca_topic_score_gemma":0.00000601718,"teacher_disagreement_score":0.9505119,"about_ca_system_score_codex":0.000047987858,"about_ca_system_score_gemma":0.00008504135,"threshold_uncertainty_score":0.99997646},"labels":[],"label_agreement":null},{"id":"W2896717571","doi":"10.1007/s00220-019-03575-5","title":"Cohomological Hall Algebras, Vertex Algebras and Instantons","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":70,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"National Science Foundation","keywords":"Yangian; Moduli space; Cohomology; Vertex (graph theory); Instanton; Mathematics; Affine transformation; Pure mathematics; Conjecture; Cluster algebra; Space (punctuation); Vertex operator algebra; Algebra over a field; Combinatorics; Physics; Mathematical physics; Jordan algebra; Algebra representation; Quantum mechanics; Computer science; Quantum","score_opus":0.06307567601456227,"score_gpt":0.3319338644153143,"score_spread":0.26885818840075204,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2896717571","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.94869477,0.0004250804,0.004072712,0.0011906946,0.0001872506,0.0009823752,0.000007955333,0.00018814568,0.044251043],"genre_scores_gemma":[0.9779873,0.00010675021,0.021421397,0.00015843047,0.000028280885,0.00006655144,0.000009430002,0.000037271944,0.00018456968],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99838597,0.00018313453,0.0005227685,0.00031068528,0.00027550358,0.00032196616],"domain_scores_gemma":[0.99574983,0.0018610767,0.00013630747,0.0020760857,0.00007097943,0.000105720086],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00035535858,0.0002494348,0.0005206229,0.0000539828,0.0001342154,0.000064225256,0.0010064103,0.00017966791,0.00017496492],"category_scores_gemma":[0.00041882793,0.00021524225,0.00009480422,0.00030557462,0.00034541424,0.00017149957,0.00082570047,0.0005212694,0.00013797938],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000007792484,0.00033594412,0.0006984329,0.000083079496,0.000027289418,0.0000010795331,0.0005296831,0.0000021629307,0.000058543726,0.9968183,0.00019303225,0.0012446633],"study_design_scores_gemma":[0.0005929006,0.00005124936,0.0006416909,0.00011411832,0.000030733725,0.00001021341,0.00019989176,0.0039504087,0.00005298222,0.99380267,0.00030056978,0.00025259037],"about_ca_topic_score_codex":0.000009110883,"about_ca_topic_score_gemma":0.000008018149,"teacher_disagreement_score":0.044066474,"about_ca_system_score_codex":0.00007409765,"about_ca_system_score_gemma":0.00004811943,"threshold_uncertainty_score":0.87773246},"labels":[],"label_agreement":null},{"id":"W2896981111","doi":"10.1007/s00220-021-03963-w","title":"Trading Locality for Time: Certifiable Randomness from Low-Depth Circuits","year":2021,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Applications","field":"Physics and Astronomy","cited_by":6,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Army Research Office; Natural Sciences and Engineering Research Council of Canada; Multidisciplinary University Research Initiative; U.S. Air Force; Directorate for Computer and Information Science and Engineering; Air Force Office of Scientific Research; Canadian Institute for Advanced Research; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; National Science Foundation; Government of Canada; Institute for Quantum Information and Matter, California Institute of Technology; California Institute of Technology","keywords":"Randomness; Computer science; Quantum circuit; Qubit; Logarithm; Quantum computer; Constant (computer programming); Mathematics; Quantum; Theoretical computer science; Discrete mathematics; Algorithm; Quantum error correction; Quantum mechanics; Statistics; Physics; Mathematical analysis","score_opus":0.07602766528913843,"score_gpt":0.33176450247150435,"score_spread":0.25573683718236595,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2896981111","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.038979553,0.00019157045,0.95100015,0.00049398653,0.000101422316,0.0015196883,0.00051305356,0.00007508519,0.0071254903],"genre_scores_gemma":[0.9755142,0.000022393106,0.019253803,0.000043028744,0.0002169938,0.0020697662,0.0027381282,0.00007022383,0.00007146615],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9979453,0.00017489927,0.0008001232,0.0005396166,0.0002030171,0.0003370085],"domain_scores_gemma":[0.9944709,0.0013594169,0.00032184055,0.0035450999,0.0001994893,0.00010328271],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00044444326,0.00035072243,0.0008111731,0.000041982345,0.0002684317,0.00024474072,0.0016707991,0.0001761455,0.00028811314],"category_scores_gemma":[0.00005543036,0.00038079498,0.0003492456,0.00027223755,0.00014246223,0.00010234008,0.0011713634,0.0008288492,0.000075203985],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000007539404,0.0024002579,0.0000763653,0.00032946534,0.00022302619,2.5047606e-7,0.0009635901,0.00049003033,0.0010618019,0.9823445,0.000541311,0.011561881],"study_design_scores_gemma":[0.0004922327,0.0000032016203,0.000014929134,0.00041322812,0.000089781344,7.404582e-8,0.00021346536,0.31597498,0.0008695768,0.6814941,0.00016385531,0.0002705896],"about_ca_topic_score_codex":0.00012694547,"about_ca_topic_score_gemma":0.000006130599,"teacher_disagreement_score":0.93653464,"about_ca_system_score_codex":0.000094756295,"about_ca_system_score_gemma":0.00022122634,"threshold_uncertainty_score":0.9998644},"labels":[],"label_agreement":null},{"id":"W2897319785","doi":"10.1007/s00220-020-03730-3","title":"Pointwise Bounds for Joint Eigenfunctions of Quantum Completely Integrable Systems","year":2020,"lang":"lv","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Division of Mathematical Sciences; Directorate for Mathematical and Physical Sciences; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Agence Nationale de la Recherche","keywords":"Pointwise; Eigenfunction; Mathematics; Torus; Projection (relational algebra); Integrable system; Invariant (physics); Combinatorics; Upper and lower bounds; Riemannian manifold; Physics; Mathematical analysis; Mathematical physics; Geometry; Quantum mechanics","score_opus":0.3376962901291037,"score_gpt":0.39808718075113114,"score_spread":0.06039089062202746,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2897319785","genre_codex":"methods","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":"methods","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.000554418,0.0010245489,0.9705006,0.0021679618,0.00049331976,0.0072796573,0.0010793405,0.00030430243,0.016595883],"genre_scores_gemma":[0.42665172,0.00061738456,0.5662811,0.00012591643,0.00032521717,0.004213765,0.0007080322,0.00054213544,0.0005347213],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99008757,0.00079300127,0.0054800264,0.0013340446,0.0011096114,0.0011957601],"domain_scores_gemma":[0.9755185,0.010238233,0.003064284,0.00928993,0.001425719,0.0004633359],"candidate_categories":["metaepi_narrow","research_integrity"],"consensus_categories":["metaepi_narrow"],"category_scores_codex":[0.0021425255,0.0014573599,0.0044081723,0.00031268536,0.0005442264,0.00029515475,0.004742254,0.000795122,0.000100633646],"category_scores_gemma":[0.0049991426,0.0015000452,0.0014394823,0.0013465106,0.0019539811,0.00042788903,0.004801263,0.0032097388,0.00040962742],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000063473584,0.005080733,0.0000047689155,0.020214684,0.0005194538,0.0000014935977,0.0035263412,0.002649731,0.001431755,0.9638415,0.0017505983,0.00091549184],"study_design_scores_gemma":[0.00084631564,0.00018407611,0.0000030133526,0.003899761,0.00051125255,0.0000054736574,0.0014411756,0.38833869,0.00029050515,0.60298043,0.0007426156,0.00075673126],"about_ca_topic_score_codex":0.000065320026,"about_ca_topic_score_gemma":0.000013839398,"teacher_disagreement_score":0.4260973,"about_ca_system_score_codex":0.0007912411,"about_ca_system_score_gemma":0.0006810099,"threshold_uncertainty_score":0.9998176},"labels":[],"label_agreement":null},{"id":"W2899100665","doi":"10.1007/s00220-020-03709-0","title":"Critical Exponent for the Magnetization of the Weakly Coupled $$\\phi _4^4 $$ Model","year":2020,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada","keywords":"Magnetization; Critical exponent; Exponent; Logarithm; Scaling; Physics; Field (mathematics); Mathematical physics; Field theory (psychology); Condensed matter physics; Mathematics; Magnetic field; Statistical physics; Quantum mechanics; Pure mathematics; Mathematical analysis; Geometry","score_opus":0.0685498462328493,"score_gpt":0.3390769280713173,"score_spread":0.27052708183846796,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2899100665","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.001821519,0.00011918683,0.9815503,0.011382292,0.000099214165,0.0011678393,0.0002374261,0.000026408788,0.0035958432],"genre_scores_gemma":[0.9723583,0.000011588163,0.026480295,0.00014122209,0.00017721235,0.00062712544,0.00012349922,0.0000379961,0.000042766555],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99841243,0.00014679182,0.0006467376,0.00026954638,0.00031814692,0.00020635988],"domain_scores_gemma":[0.99444073,0.0029763405,0.0002463348,0.0019784798,0.00030222954,0.000055868324],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00023699789,0.00025521728,0.00041469556,0.00001696156,0.00023961777,0.000069296264,0.0021860148,0.000085376,0.000034781977],"category_scores_gemma":[0.00019809407,0.00017088864,0.00037297592,0.00023736268,0.000827583,0.00005963035,0.0020802382,0.0007469059,0.000014177331],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000107796295,0.0005214591,0.000022562625,0.0001673529,0.00004768244,1.3309152e-8,0.00053196045,0.046925098,0.000120741206,0.9497957,0.00015926817,0.0016973607],"study_design_scores_gemma":[0.00009965465,0.000006858595,0.00004206943,0.00010165179,0.00007720542,3.3725055e-8,0.000086098284,0.4851715,0.00009472518,0.51420575,0.000021566195,0.00009289319],"about_ca_topic_score_codex":0.000011435357,"about_ca_topic_score_gemma":7.029441e-7,"teacher_disagreement_score":0.97053677,"about_ca_system_score_codex":0.000035429723,"about_ca_system_score_gemma":0.0001870759,"threshold_uncertainty_score":0.69686365},"labels":[],"label_agreement":null},{"id":"W2899812451","doi":"10.1007/s00220-020-03695-3","title":"Global Navier–Stokes Flows for Non-decaying Initial Data with Slowly Decaying Oscillation","year":2020,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Navier-Stokes equation solutions","field":"Mathematics","cited_by":2,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Square-integrable function; Initial value problem; Physics; Geodetic datum; Infinity; Mathematical analysis; Oscillation (cell signaling); Compressibility; Constant (computer programming); Integrable system; Ball (mathematics); Mathematics; Small data; Cauchy problem; Square (algebra); Mathematical physics; Geometry; Mechanics","score_opus":0.35962991452065124,"score_gpt":0.46939407921885823,"score_spread":0.10976416469820699,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2899812451","genre_codex":"methods","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":"methods","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.005796014,0.00020682794,0.97672117,0.00237718,0.00019805731,0.0034681961,0.0014966534,0.00033037565,0.009405536],"genre_scores_gemma":[0.35293445,0.000079183934,0.64324325,0.00012065675,0.00028021316,0.00092922914,0.0022688755,0.00012198791,0.000022128308],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99571097,0.00038950707,0.001657574,0.0008778611,0.0007793136,0.00058479793],"domain_scores_gemma":[0.9859155,0.0040749037,0.00092136906,0.008334537,0.00054054137,0.00021318716],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0013097308,0.00067840185,0.0012137789,0.00013110152,0.0005886536,0.00030520314,0.005005684,0.00044815056,0.000022896469],"category_scores_gemma":[0.0028247247,0.0006862324,0.0002627639,0.0009801724,0.0004258987,0.0005532254,0.0061231744,0.0012749207,0.00008303547],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00009964049,0.0016717536,0.00034375503,0.0032054198,0.00043147002,0.000004202254,0.0042998525,0.002128233,0.000076865836,0.97144216,0.003260684,0.013035961],"study_design_scores_gemma":[0.0007155367,0.00003356341,0.000042779135,0.0011243646,0.00033006462,0.0000048439233,0.00036364913,0.33561495,0.000012182783,0.6605962,0.0006446486,0.0005172278],"about_ca_topic_score_codex":0.00002147762,"about_ca_topic_score_gemma":0.0001498035,"teacher_disagreement_score":0.34713843,"about_ca_system_score_codex":0.00062727113,"about_ca_system_score_gemma":0.0007466648,"threshold_uncertainty_score":0.99955887},"labels":[],"label_agreement":null},{"id":"W2903493469","doi":"10.1007/s00220-019-03634-x","title":"Quantum Spins and Random Loops on the Complete Graph","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":9,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Göteborgs Universitet; Vetenskapsrådet; Centre de Recherches Mathématiques; Simons Foundation","keywords":"Quantum; Spins; Critical exponent; Complex system; Graph; Phase transition; Symmetry (geometry); Loop (graph theory); Function (biology)","score_opus":0.03334759962339316,"score_gpt":0.27909718963062174,"score_spread":0.24574959000722857,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2903493469","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6499446,0.00009680957,0.14274389,0.0074568354,0.000096147465,0.0014056155,0.000076816876,0.00008107866,0.1980982],"genre_scores_gemma":[0.99836874,0.000004811525,0.0012041973,0.00022000929,0.000045328525,0.000056017077,0.000025112055,0.000014541741,0.00006126985],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99916273,0.00013714036,0.00023775519,0.00015215657,0.00014988868,0.0001603289],"domain_scores_gemma":[0.99703413,0.0018096225,0.00006717654,0.0010046693,0.00004195719,0.00004244467],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0001982555,0.00013625364,0.00021835892,0.00002063354,0.00014575214,0.000052266747,0.0005747471,0.000020263773,0.00015339584],"category_scores_gemma":[0.000016544169,0.00009388317,0.00008407335,0.00022013477,0.00034225563,0.00006589312,0.00026375052,0.00031751784,0.00046725947],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009168533,0.00030292055,0.00041579138,0.000011009439,0.000020365822,4.411526e-8,0.00020662067,0.0001662932,0.00006226337,0.99674505,0.00006149497,0.00199899],"study_design_scores_gemma":[0.00045673264,0.000023806213,0.0005319725,0.00006325329,0.000010887659,1.9578299e-7,0.00022600255,0.04593194,0.000037250487,0.952327,0.00027659052,0.000114369774],"about_ca_topic_score_codex":0.0000055474043,"about_ca_topic_score_gemma":2.3057703e-7,"teacher_disagreement_score":0.3484241,"about_ca_system_score_codex":0.000009519944,"about_ca_system_score_gemma":0.000016027449,"threshold_uncertainty_score":0.6005831},"labels":[],"label_agreement":null},{"id":"W2904794342","doi":"10.1007/s00220-020-03887-x","title":"The Generalized TAP Free Energy II","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":16,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Simons Foundation; National Science Foundation","keywords":"Measure (data warehouse); Spins; Energy (signal processing); Ising model; Representation (politics); Simple (philosophy); Zero (linguistics)","score_opus":0.032150032717850524,"score_gpt":0.27665409774134425,"score_spread":0.24450406502349373,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2904794342","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.01129829,0.00033855636,0.73486245,0.033004962,0.00008107057,0.000466514,0.000066901106,0.00015469837,0.21972656],"genre_scores_gemma":[0.9897683,0.000012650429,0.009132653,0.0005149371,0.00023193612,0.0001510968,0.000037982118,0.000019238923,0.00013119626],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99904996,0.000119317876,0.00031427873,0.00014718524,0.00017295439,0.00019631405],"domain_scores_gemma":[0.9979076,0.00068800314,0.00007749297,0.0011726564,0.000064413434,0.000089834306],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.000096596676,0.00013444846,0.00018237832,0.000007471973,0.00044887603,0.00005955606,0.0015324994,0.000022404392,0.00007870652],"category_scores_gemma":[0.00004494601,0.00009952098,0.00011204063,0.00030280554,0.00035420834,0.000081620274,0.0010255895,0.00023492752,0.000079679],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000048918346,0.0002402505,0.000039308306,0.0000037161594,0.000022001012,1.0397453e-7,0.00028556524,0.00016466982,0.000057252815,0.98338217,0.0010586842,0.0147413835],"study_design_scores_gemma":[0.000280587,0.000016308804,0.00002441375,0.000009593966,0.0000139299555,1.0351903e-7,0.00011219969,0.060762327,0.00017264704,0.9303658,0.008126764,0.00011533278],"about_ca_topic_score_codex":0.000008558241,"about_ca_topic_score_gemma":7.8595593e-7,"teacher_disagreement_score":0.97847,"about_ca_system_score_codex":0.0000129803675,"about_ca_system_score_gemma":0.000035346195,"threshold_uncertainty_score":0.40583476},"labels":[],"label_agreement":null},{"id":"W2907528256","doi":"10.1007/s00220-019-03671-6","title":"Fermionic Finite-Group Gauge Theories and Interacting Symmetric/Crystalline Orders via Cobordisms","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Topological Materials and Phenomena","field":"Physics and Astronomy","cited_by":75,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto; Perimeter Institute","funders":"Division of Physics; National Natural Science Foundation of China-Yunnan Joint Fund; Kavli Institute for Theoretical Physics, University of California, Santa Barbara; Harvard University; National Natural Science Foundation of China; U.S. Department of Energy; Corning Incorporated Foundation; Division of Mathematical Sciences; National Science Foundation","keywords":"Homogeneous space; Physics; Abelian group; Symmetry group; Gauge theory; Mathematical physics; Gauge group; Mathematics; Topology (electrical circuits); Pure mathematics; Combinatorics; Geometry","score_opus":0.04360183666123662,"score_gpt":0.3017936846971377,"score_spread":0.25819184803590106,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2907528256","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.38840458,0.00038955832,0.55794793,0.0074195815,0.00010011199,0.00088819256,0.00009839,0.00018116142,0.044570472],"genre_scores_gemma":[0.99116284,0.000020783418,0.00838367,0.00019737612,0.00009764855,0.000048347436,0.0000590044,0.000018230186,0.000012107817],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990204,0.00014753705,0.000369223,0.00018356646,0.00008701788,0.00019227187],"domain_scores_gemma":[0.9979107,0.00130623,0.00011897382,0.00053980434,0.00003366063,0.00009063767],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0001848901,0.00015879473,0.0003015115,0.000023404275,0.00015853586,0.00008772749,0.00046719605,0.0000337998,0.00029875993],"category_scores_gemma":[0.00012910202,0.00013508163,0.000055588902,0.0003338667,0.0002367202,0.0001453002,0.00052556104,0.00028198515,0.00005163458],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008664051,0.00023933209,0.0005069903,0.000040450464,0.000019668387,2.1681662e-7,0.00073261006,0.000048566635,0.00033607282,0.9942191,0.0000066301527,0.0038416898],"study_design_scores_gemma":[0.000272735,0.000046841677,0.00016645913,0.00004301785,0.000017646436,2.458958e-7,0.00062407984,0.014658572,0.00008115299,0.983599,0.00032760165,0.00016266962],"about_ca_topic_score_codex":0.000023954935,"about_ca_topic_score_gemma":0.0000011546529,"teacher_disagreement_score":0.6027582,"about_ca_system_score_codex":0.000014113444,"about_ca_system_score_gemma":0.000010869896,"threshold_uncertainty_score":0.55084693},"labels":[],"label_agreement":null},{"id":"W2908285344","doi":"10.1007/s00220-020-03699-z","title":"Quantum Spectral Methods for Differential Equations","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":119,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Army Research Office; National Science Foundation of Sri Lanka; Canadian Institute for Advanced Research","keywords":"Quantum algorithm for linear systems of equations; Quantum algorithm; Spectral method; Boundary value problem; Linear differential equation; Quantum; Numerical partial differential equations; Differential equation; Quantum phase estimation algorithm","score_opus":0.0972695013407251,"score_gpt":0.3856985214600209,"score_spread":0.28842902011929583,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2908285344","genre_codex":"methods","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":"methods","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00044782567,0.00008830181,0.9903994,0.008029678,0.000056666548,0.00030022606,0.0000039748957,0.00016001266,0.00051386503],"genre_scores_gemma":[0.25642318,0.0000059718204,0.7431745,0.00023835483,0.00007744235,0.000054593653,0.000007845463,0.000010931598,0.000007188959],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9988882,0.00019860132,0.0003319854,0.00024396167,0.00010793473,0.00022933852],"domain_scores_gemma":[0.9966062,0.00187211,0.000083273524,0.0012922338,0.00005353877,0.00009268764],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002478091,0.00013098006,0.00023782712,0.0000331002,0.00019408717,0.00011217278,0.00219771,0.000042506446,0.0000059182944],"category_scores_gemma":[0.0004426642,0.00012006154,0.000119970064,0.00046647072,0.00010554084,0.00012808523,0.000759443,0.00029083673,0.000027759976],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000012822729,0.0001701068,0.0000020956118,0.00003035848,0.000009023077,1.3635969e-7,0.0015506927,0.00077941106,0.0004591209,0.9482666,0.000069671616,0.048661463],"study_design_scores_gemma":[0.00012675539,0.000026782827,0.00001629451,0.000014636945,0.0000046191017,4.9156733e-7,0.000014230125,0.5758056,0.00015333941,0.4234048,0.00035078768,0.00008163398],"about_ca_topic_score_codex":0.0000011528151,"about_ca_topic_score_gemma":3.8928857e-7,"teacher_disagreement_score":0.5750262,"about_ca_system_score_codex":0.000021353613,"about_ca_system_score_gemma":0.000042709013,"threshold_uncertainty_score":0.48959672},"labels":[],"label_agreement":null},{"id":"W2910067784","doi":"10.1007/s00220-019-03603-4","title":"Operator-Algebraic Construction of Gauge Theories and Jones’ Actions of Thompson’s Groups","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Noncommutative and Quantum Gravity Theories","field":"Physics and Astronomy","cited_by":16,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"European Research Council; Banff International Research Station for Mathematical Innovation and Discovery; University of New South Wales","keywords":"Mathematics; Gauge group; Group (periodic table); Pure mathematics; Gauge theory; Von Neumann algebra; Mathematical physics; Algebra over a field; Quantum mechanics; Physics; Von Neumann architecture","score_opus":0.025319641879558256,"score_gpt":0.31360939389380954,"score_spread":0.2882897520142513,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2910067784","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9601476,0.000103720646,0.013627348,0.00015099875,0.000037121667,0.00025411037,0.00006344026,0.000012077275,0.025603548],"genre_scores_gemma":[0.98792654,0.00002704316,0.011925597,0.000006481815,0.00001779027,0.000025336853,0.000026592465,0.000011026029,0.00003361502],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9992014,0.00015120559,0.00034794273,0.00010265334,0.00009435636,0.000102422586],"domain_scores_gemma":[0.99814665,0.00070784125,0.00016696473,0.0008534681,0.00009857884,0.00002648979],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002246855,0.000109429624,0.00032243773,0.00004543592,0.00008063968,0.000015320917,0.00032021676,0.000030509053,0.00013832051],"category_scores_gemma":[0.000022934826,0.000099505836,0.00006412049,0.0002498568,0.00070987723,0.00018907957,0.00022539924,0.00019038765,0.000016830283],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006420018,0.0002715365,0.016830744,0.000071747825,0.000033893924,1.5252517e-8,0.0016666838,0.0000037433772,0.001612983,0.9773151,0.0000050374992,0.0021820748],"study_design_scores_gemma":[0.00026657747,0.000032806183,0.0014742138,0.00010912423,0.000024099154,6.1227445e-7,0.0058225486,0.0005358034,0.0043126303,0.9872777,0.000048528473,0.00009536204],"about_ca_topic_score_codex":0.000018255469,"about_ca_topic_score_gemma":0.0000019305883,"teacher_disagreement_score":0.027778883,"about_ca_system_score_codex":0.000010603874,"about_ca_system_score_gemma":0.000034580797,"threshold_uncertainty_score":0.405773},"labels":[],"label_agreement":null},{"id":"W2912056094","doi":"10.1007/s00220-019-03652-9","title":"Relating Nets and Factorization Algebras of Observables: Free Field Theories","year":2020,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Advanced Topics in Algebra","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Engineering and Physical Sciences Research Council; Institut Périmètre de physique théorique; Mathematisches Forschungsinstitut Oberwolfach","keywords":"Axiom; Factorization; Quantum field theory; Mathematics; Mathematical proof; Observable; Field (mathematics); Algebra over a field; Associative property; Pure mathematics; Theoretical physics; Physics; Quantum mechanics; Mathematical physics","score_opus":0.14686457117576798,"score_gpt":0.3797712231770708,"score_spread":0.2329066520013028,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2912056094","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.027456354,0.0008336271,0.9405008,0.004408369,0.00017564694,0.0014113274,0.00008972258,0.00026162996,0.02486251],"genre_scores_gemma":[0.56285936,0.00028627567,0.43646136,0.00009126818,0.00005829919,0.000095342984,0.000046307585,0.000058299414,0.000043498916],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9979186,0.000241566,0.0009887053,0.0003456054,0.0003006005,0.00020490681],"domain_scores_gemma":[0.98957175,0.005887081,0.0006243067,0.0036981476,0.00015104987,0.0000676833],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0003670663,0.0003171939,0.0007492292,0.00005821682,0.00011222866,0.000050701692,0.0018032256,0.0003296798,0.000023844392],"category_scores_gemma":[0.00756946,0.00032429714,0.00011242878,0.00027717336,0.00036352672,0.00015469003,0.0046964227,0.0012892099,0.0000052605305],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000045649003,0.00018879617,0.0003796771,0.0012271281,0.00004623542,5.373515e-7,0.003389336,0.000026893691,0.0001061443,0.99317205,0.0001282432,0.0013304213],"study_design_scores_gemma":[0.00020979285,0.000026157855,0.0000718229,0.0010117616,0.00007012923,8.5621343e-7,0.00037389557,0.006347229,0.0007882064,0.9907847,0.000056938636,0.0002585349],"about_ca_topic_score_codex":0.000007451044,"about_ca_topic_score_gemma":0.000011021113,"teacher_disagreement_score":0.535403,"about_ca_system_score_codex":0.00007074366,"about_ca_system_score_gemma":0.0000802596,"threshold_uncertainty_score":0.9999209},"labels":[],"label_agreement":null},{"id":"W2940751073","doi":"10.1007/s00220-020-03827-9","title":"A Short Proof of the Discontinuity of Phase Transition in the Planar Random-Cluster Model with $$q&gt;4$$","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":15,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia; University of Victoria","funders":"","keywords":"Discontinuity (linguistics); Planar; Phase transition; Bethe lattice; Square lattice; Lattice (music); Connection (principal bundle); Complex system; Square (algebra)","score_opus":0.09481368659028064,"score_gpt":0.3555136274178696,"score_spread":0.26069994082758896,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2940751073","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.29992723,0.0000680535,0.680645,0.010690892,0.0000037604068,0.0027070076,0.000073791416,0.000020822436,0.0058634104],"genre_scores_gemma":[0.975703,0.0000134550155,0.023865761,0.000108839304,0.0000103533075,0.0002684951,0.000008518333,0.00001427462,0.000007284389],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99868834,0.00022041652,0.00058909843,0.0001211731,0.0002622586,0.000118689226],"domain_scores_gemma":[0.9972703,0.0011232232,0.0001787862,0.0013406038,0.000062325715,0.00002475777],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00051935087,0.0001228564,0.00037600155,0.00002241612,0.00007081833,0.000013729947,0.0011360005,0.00004340585,0.0000033093777],"category_scores_gemma":[0.00014066919,0.000066659806,0.00011241297,0.00057639065,0.000306089,0.00009386031,0.00009582846,0.00027862372,9.04882e-7],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0003162589,0.004838516,0.000073572,0.00077760714,0.00005338135,3.2311058e-7,0.038740505,0.0036706976,0.0010296493,0.94807684,0.00034119337,0.0020814245],"study_design_scores_gemma":[0.0029587322,0.000042613636,0.000037501082,0.00019821998,0.000108409695,0.0000016657733,0.0010020584,0.39017457,0.00071799505,0.604638,0.000020283487,0.00010000806],"about_ca_topic_score_codex":0.0000031542952,"about_ca_topic_score_gemma":0.000028986356,"teacher_disagreement_score":0.67577577,"about_ca_system_score_codex":0.000015088072,"about_ca_system_score_gemma":0.000036303874,"threshold_uncertainty_score":0.2718308},"labels":[],"label_agreement":null},{"id":"W2942059153","doi":"10.1007/s00220-020-03803-3","title":"State Convertibility in the von Neumann Algebra Framework","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Guelph; University of Waterloo; Carleton University","funders":"Natural Sciences and Engineering Research Council of Canada; Queen's University; University College Dublin; Queen's University Belfast; Royal Society","keywords":"Quantum entanglement; Von Neumann entropy; LOCC; Von Neumann algebra; Context (archaeology); Monotone polygon; Quantum information; State (computer science); Convertibility; Quantum","score_opus":0.06409589087358897,"score_gpt":0.31265224304892747,"score_spread":0.2485563521753385,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2942059153","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.016700516,0.00007027539,0.9568072,0.018845562,0.000024591342,0.00033784733,0.0000023096666,0.00009951793,0.0071122036],"genre_scores_gemma":[0.9402464,0.000042952397,0.05541673,0.0042249695,0.000009054019,0.000049767503,0.0000041247604,0.000004658813,0.0000013552594],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998765,0.0002570064,0.00042888138,0.00014694243,0.00022836811,0.00017381548],"domain_scores_gemma":[0.9968419,0.0008669931,0.000085087,0.0021100212,0.00004299453,0.000053018462],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005146915,0.00010374569,0.00016246563,0.000036814414,0.00010086111,0.00013924687,0.0032321676,0.00004086282,0.000012243965],"category_scores_gemma":[0.0002500566,0.00007947927,0.000067027846,0.00119242,0.00019135275,0.00046339826,0.0005307662,0.0005023787,0.00022068515],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000013549876,0.00018527688,0.00032036356,0.00002957265,0.0000026604084,3.6714323e-7,0.014944481,0.00005438568,0.0000057671195,0.9798828,0.0001538016,0.0044192052],"study_design_scores_gemma":[0.00009389749,0.000015046925,0.0013368053,0.000027679564,0.0000013527531,4.9082826e-7,0.00028878354,0.27301395,0.00002529362,0.7245934,0.00052739773,0.00007594104],"about_ca_topic_score_codex":0.0000031629504,"about_ca_topic_score_gemma":0.0000032772061,"teacher_disagreement_score":0.9235459,"about_ca_system_score_codex":0.000018704895,"about_ca_system_score_gemma":0.000030614763,"threshold_uncertainty_score":0.60062253},"labels":[],"label_agreement":null},{"id":"W2942174818","doi":"10.1007/s00220-019-03430-7","title":"Boundary Harmonic Coordinates on Manifolds with Boundary in Low Regularity","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometric Analysis and Curvature Flows","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"The Scarborough Hospital; University of Toronto","funders":"","keywords":"Mathematics; Boundary (topology); Ricci curvature; Ricci-flat manifold; Mathematical analysis; Manifold (fluid mechanics); Harmonic coordinates; Curvature; Riemannian manifold; Pure mathematics; Scalar curvature; Geometry","score_opus":0.041519436757334716,"score_gpt":0.3109477351148916,"score_spread":0.2694282983575569,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2942174818","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.91644806,0.0005418084,0.008965435,0.0018832,0.000059535985,0.0012340603,0.00001398175,0.00014125872,0.07071269],"genre_scores_gemma":[0.9743142,0.000054816013,0.024347654,0.00013792401,0.00002144032,0.000092646376,0.00003179382,0.000045418197,0.00095410465],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9980374,0.00022357272,0.0006065636,0.00033478058,0.0004331598,0.00036454972],"domain_scores_gemma":[0.9951112,0.0014678288,0.00019800615,0.0030419272,0.000110954235,0.000070059716],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00085995,0.00027471496,0.0006406904,0.00023411155,0.00014073802,0.00013902913,0.001194834,0.0001465329,0.00019080934],"category_scores_gemma":[0.00029503595,0.00022478808,0.00013433,0.0016355563,0.00026515932,0.0002419877,0.00035620184,0.0008358513,0.00035654014],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000038743656,0.003251257,0.004349009,0.000437272,0.00008667749,0.0000062540307,0.00082402746,0.000095869036,0.000059288654,0.98770785,0.0006797201,0.0024640195],"study_design_scores_gemma":[0.000889296,0.00011438769,0.0051224437,0.000737598,0.00005644606,0.00000519826,0.00049798115,0.014287565,0.00009806133,0.9767701,0.0010571401,0.00036377902],"about_ca_topic_score_codex":0.000012525577,"about_ca_topic_score_gemma":0.000063499254,"teacher_disagreement_score":0.06975859,"about_ca_system_score_codex":0.00019973771,"about_ca_system_score_gemma":0.00010554266,"threshold_uncertainty_score":0.9166592},"labels":[],"label_agreement":null},{"id":"W2944289755","doi":"10.1007/s00220-019-03448-x","title":"Marked Length Spectrum, Homoclinic Orbits and the Geometry of Open Dispersing Billiards","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":6,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Hungarian Science Foundation; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; National Science Foundation","keywords":"Dynamical billiards; Homoclinic orbit; Periodic orbits; Lyapunov exponent; Curvature; Cantor set; Spectrum (functional analysis); Regular polygon; Inverse; Set (abstract data type)","score_opus":0.03125890670494374,"score_gpt":0.3244182933061973,"score_spread":0.29315938660125357,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2944289755","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8699028,0.0002718539,0.012067326,0.001899753,0.000070992784,0.0013938997,0.00003386496,0.000017724658,0.11434179],"genre_scores_gemma":[0.99774396,0.000028037866,0.0019103073,0.000021625689,0.000029898656,0.000037265243,0.00001317877,0.000014456424,0.00020124692],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99893135,0.00019757547,0.000435997,0.00015012882,0.000126976,0.00015799362],"domain_scores_gemma":[0.99689937,0.0014407417,0.00016818053,0.0014207757,0.00003144504,0.000039515304],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00073945354,0.00011505813,0.0004164916,0.00002687732,0.000093350885,0.00007884388,0.0011701669,0.000031224237,0.00011134867],"category_scores_gemma":[0.00003905751,0.00007564342,0.00008955231,0.00032001475,0.00039211786,0.00014097597,0.0009685762,0.000263297,0.000052949934],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000014030056,0.0002660417,0.008791207,0.00005049166,0.000036139896,2.8826225e-8,0.00034260793,0.000019128183,0.00003188254,0.98787194,0.000023013994,0.0025534886],"study_design_scores_gemma":[0.0013039503,0.000019201387,0.0021327974,0.00021372159,0.000025825502,4.6827952e-7,0.0007950093,0.10714446,0.000034178553,0.88800186,0.00019117686,0.00013738092],"about_ca_topic_score_codex":0.00013169604,"about_ca_topic_score_gemma":0.0000048874417,"teacher_disagreement_score":0.12784119,"about_ca_system_score_codex":0.000017907589,"about_ca_system_score_gemma":0.000024210081,"threshold_uncertainty_score":0.3084649},"labels":[],"label_agreement":null},{"id":"W2945738089","doi":"10.1007/s00220-019-03598-y","title":"Orbit Equivalence Rigidity for Product Actions","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometric and Algebraic Topology","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Regina","funders":"Pacific Institute for the Mathematical Sciences","keywords":"Measure (data warehouse); Orbit (dynamics); Equivalence (formal languages); Rigidity (electromagnetism); Product (mathematics); Action (physics); Direct product","score_opus":0.24260702660760855,"score_gpt":0.4284814789090594,"score_spread":0.18587445230145086,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2945738089","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.33873147,0.0005199025,0.4900334,0.009448986,0.0006048264,0.0059154676,0.00008931338,0.00058952,0.15406713],"genre_scores_gemma":[0.84607726,0.00004767823,0.15199439,0.000059471018,0.00006049868,0.00025634118,0.000014166655,0.000027071683,0.0014631446],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99878156,0.000096766395,0.0004266268,0.00024453847,0.00015861643,0.0002919104],"domain_scores_gemma":[0.99406326,0.0032085592,0.00014592698,0.0024092507,0.00012100971,0.000051966566],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00055148796,0.0001508916,0.00035095203,0.00009186548,0.00013693607,0.000024409137,0.0010163216,0.00007098958,0.00018703728],"category_scores_gemma":[0.0015167327,0.0001394575,0.00011555521,0.0006106783,0.00021989107,0.00015160028,0.00035414964,0.00031129978,0.00039166145],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000003841029,0.0006525475,0.0002871612,0.00018781208,0.00001703204,9.2845426e-8,0.00026838583,0.0000073304204,0.00015583573,0.9952115,0.0010800269,0.0021284805],"study_design_scores_gemma":[0.000318995,0.000033903776,0.000174225,0.00006501458,0.00002154101,0.0000036609474,0.0001856955,0.003399589,0.0003089362,0.9916542,0.0036738897,0.00016032353],"about_ca_topic_score_codex":0.0000033822612,"about_ca_topic_score_gemma":0.000004581822,"teacher_disagreement_score":0.5073458,"about_ca_system_score_codex":0.00007343073,"about_ca_system_score_gemma":0.00005911815,"threshold_uncertainty_score":0.56869113},"labels":[],"label_agreement":null},{"id":"W2949991087","doi":"10.1007/s00220-009-0816-2","title":"A Local Families Index Formula for $${\\overline{\\partial}}$$ -Operators on Punctured Riemann Surfaces","year":2009,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Riemann surface; Moduli space; Heat kernel; Curvature; Line bundle; Genus; Geometric function theory; Degree (music)","score_opus":0.08522892253250094,"score_gpt":0.3587460404967862,"score_spread":0.27351711796428524,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2949991087","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0853259,0.00016181785,0.8881514,0.0027735885,0.00009308086,0.0018780649,0.000047138295,0.000334333,0.021234674],"genre_scores_gemma":[0.9489928,0.000025273162,0.050094504,0.00039817553,0.000053147996,0.00015926978,0.000032646083,0.000034206212,0.00020996656],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9981514,0.00013444261,0.0006860826,0.0002957996,0.0003233429,0.0004088844],"domain_scores_gemma":[0.9952923,0.0020420293,0.00016525183,0.0022571983,0.00014764574,0.00009558235],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00054978806,0.00032704684,0.0005683045,0.00011309723,0.00028755373,0.00008385371,0.0012155266,0.00015783685,0.000034591132],"category_scores_gemma":[0.0006588655,0.0002767514,0.00020285281,0.00056558335,0.00022497326,0.00019305073,0.00020341971,0.00039776936,0.00006996499],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000045045454,0.0015128638,0.000035290504,0.00011192862,0.000030135914,6.3923903e-7,0.00083094847,0.0008719641,0.00008219499,0.99047077,0.0010361011,0.0049721086],"study_design_scores_gemma":[0.0006747445,0.00017719499,0.00021185543,0.00013612231,0.000039936218,0.000001849582,0.00054845616,0.10080727,0.00070524594,0.89430237,0.002105398,0.000289576],"about_ca_topic_score_codex":0.0000036914444,"about_ca_topic_score_gemma":0.000017797263,"teacher_disagreement_score":0.8636669,"about_ca_system_score_codex":0.00009301924,"about_ca_system_score_gemma":0.00005112779,"threshold_uncertainty_score":0.99996847},"labels":[],"label_agreement":null},{"id":"W2950029516","doi":"10.1007/s00220-020-03747-8","title":"Braided Tensor Categories Related to $${\\mathcal {B}}_{p}$$ Vertex Algebras","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":26,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Vertex operator algebra; Operator algebra; Vertex (graph theory); Symplectic geometry; Tensor (intrinsic definition); Parameterized complexity; Operator (biology); Quantum group; Tensor product","score_opus":0.0995252455706306,"score_gpt":0.3548279501841166,"score_spread":0.25530270461348603,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2950029516","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.787029,0.0005186997,0.066584796,0.062437054,0.00072048994,0.0043676444,0.000045173507,0.0017600612,0.07653702],"genre_scores_gemma":[0.96530473,0.000016471564,0.033393364,0.0009054189,0.00005572534,0.0001220361,0.000013321698,0.00006875421,0.00012015638],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99792075,0.00018932522,0.0007904379,0.0003551268,0.00036745073,0.00037692764],"domain_scores_gemma":[0.99615264,0.001351151,0.00014353056,0.0019532538,0.00013397883,0.0002654197],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00025026963,0.0002974007,0.00059197214,0.000052558404,0.00019334514,0.00007705538,0.001624715,0.00016580119,0.0001277509],"category_scores_gemma":[0.0019162092,0.00027525157,0.00015215011,0.0008631157,0.0002259232,0.00017739771,0.0008705372,0.00059282884,0.00040029403],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000015038701,0.00022703427,0.000077743,0.00008329162,0.000036850586,0.0000019859335,0.0045401896,0.000021368262,0.00008952559,0.9922382,0.0012814522,0.0013872677],"study_design_scores_gemma":[0.00047390783,0.00006407302,0.00007293492,0.000078764155,0.00003958534,0.0000037250697,0.00046145509,0.010193437,0.0001724703,0.987629,0.0005009579,0.0003096635],"about_ca_topic_score_codex":0.0000075991866,"about_ca_topic_score_gemma":0.0000040324685,"teacher_disagreement_score":0.17827569,"about_ca_system_score_codex":0.000085182575,"about_ca_system_score_gemma":0.0000725844,"threshold_uncertainty_score":0.99996996},"labels":[],"label_agreement":null},{"id":"W2950130089","doi":"10.1007/s00220-020-03691-7","title":"$$\\hbox {Next-to}{}^k$$ Leading Log Expansions by Chord Diagrams","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"Institut des sciences de l'information et de leurs interactions; Natural Sciences and Engineering Research Council of Canada; Agence Nationale de la Recherche","keywords":"Propagator; Quantum field theory; Beta function (physics); Diagonal; Yukawa potential; Massless particle; Power series; Quantum; Renormalization; Quantization (signal processing)","score_opus":0.1727704800238417,"score_gpt":0.3898751687026019,"score_spread":0.2171046886787602,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2950130089","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.05512855,0.0006877737,0.826085,0.046365645,0.000063786414,0.0032581282,0.000121921476,0.0008025136,0.06748674],"genre_scores_gemma":[0.85315007,0.00020181983,0.14452906,0.0010757984,0.000097086595,0.00061109645,0.000045956982,0.00007175462,0.0002173573],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99817556,0.00013857473,0.0007003196,0.000338318,0.0002825124,0.0003647179],"domain_scores_gemma":[0.9954409,0.0020503937,0.00015509031,0.0019826938,0.000085935804,0.00028500697],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0003189032,0.0002511977,0.0005143384,0.00005015513,0.00027733197,0.00011780197,0.0016469909,0.000098489356,0.000072850264],"category_scores_gemma":[0.000945565,0.00023926698,0.0001454057,0.0010820911,0.00017128691,0.00021035185,0.00064485136,0.0004902468,0.00095208373],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009693236,0.00096848514,0.00010102451,0.00014712718,0.00002911739,6.5229233e-7,0.0032797062,0.00004180009,0.002906323,0.9600443,0.025035856,0.0074358964],"study_design_scores_gemma":[0.00069247704,0.00005024009,0.00002813608,0.00015547586,0.000074600386,0.0000020890436,0.00082965987,0.015564389,0.0007137282,0.95975333,0.021670664,0.0004651974],"about_ca_topic_score_codex":0.0000054321968,"about_ca_topic_score_gemma":0.0000067620003,"teacher_disagreement_score":0.7980215,"about_ca_system_score_codex":0.0000675771,"about_ca_system_score_gemma":0.000032470147,"threshold_uncertainty_score":0.9998258},"labels":[],"label_agreement":null},{"id":"W2951014977","doi":"10.1007/s00220-015-2488-4","title":"Critical Correlation Functions for the 4-Dimensional Weakly Self-Avoiding Walk and n-Component $${|\\varphi|^4}$$ | φ | 4 Model","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":19,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Logarithm; Scaling; Critical point (mathematics); Correlation function (quantum field theory); Gaussian; Lattice (music); Function (biology); Critical phenomena; Critical exponent","score_opus":0.054317398415082145,"score_gpt":0.314700487254173,"score_spread":0.26038308883909084,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2951014977","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.008403762,0.00011643622,0.9812355,0.0030469971,0.00007590339,0.0004418267,0.00004761187,0.000057671998,0.0065742685],"genre_scores_gemma":[0.9494382,0.0000019894844,0.049944494,0.00008980214,0.0001312309,0.00022673316,0.000069244394,0.000020673111,0.00007762037],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989495,0.00010956659,0.00033207567,0.0001902038,0.00021113038,0.00020751511],"domain_scores_gemma":[0.995338,0.0036232432,0.00006539563,0.00063712074,0.00022436207,0.0001118305],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00043573166,0.00015676436,0.00019692004,0.0000262578,0.00037352534,0.00007654581,0.000378866,0.000038796716,0.000010335409],"category_scores_gemma":[0.00012452243,0.00012283312,0.0000865067,0.00018367352,0.00033017277,0.0001997299,0.0003000651,0.0003479247,0.000048056078],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000011264058,0.0005131042,0.000073938136,0.00001317137,0.00002977543,3.5936548e-8,0.00052019174,0.01994567,0.000034090208,0.97573787,0.00048471914,0.0026361677],"study_design_scores_gemma":[0.00018719515,0.000012105572,0.000026767659,0.000018002787,0.000038613587,4.979753e-7,0.00021990029,0.49029955,0.000009527316,0.50899845,0.00011220333,0.00007717405],"about_ca_topic_score_codex":0.000005773245,"about_ca_topic_score_gemma":4.621899e-7,"teacher_disagreement_score":0.94103444,"about_ca_system_score_codex":0.00004404032,"about_ca_system_score_gemma":0.00008360854,"threshold_uncertainty_score":0.50089896},"labels":[],"label_agreement":null},{"id":"W2951607815","doi":"10.1007/s00220-014-2157-z","title":"Perturbative Corrections to Kähler Moduli Spaces","year":2014,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":49,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Moduli space; Moduli; Calabi–Yau manifold; Physics; Space (punctuation); Gauge theory; Partition function (quantum field theory); Pure mathematics; Theoretical physics; Mathematical physics; Mathematics; Quantum mechanics","score_opus":0.025870215995223815,"score_gpt":0.30118784676521737,"score_spread":0.27531763076999355,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2951607815","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.017745063,0.000009629192,0.70785546,0.001651387,0.00006400297,0.00031377113,0.000014927299,0.00005785049,0.27228788],"genre_scores_gemma":[0.97719455,0.0000017288338,0.021900758,0.00018349409,0.00015780446,0.000121842335,0.00002395562,0.000027703756,0.00038818683],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989591,0.00014246532,0.00028216562,0.00021398753,0.00014574526,0.00025651633],"domain_scores_gemma":[0.9975918,0.00068940845,0.00006362961,0.0014376059,0.00009308882,0.0001244577],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002029411,0.00017391238,0.000275365,0.00004016079,0.00018997866,0.00007172996,0.0007137423,0.000035534198,0.00016607576],"category_scores_gemma":[0.000065476546,0.00015977908,0.000103189835,0.00044876683,0.00025602145,0.00011773993,0.0003989523,0.00033864827,0.00072109496],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000024060264,0.00049433246,0.0004293798,0.000007810857,0.000016107038,2.3851323e-8,0.0008943684,0.00024045781,0.000026028238,0.985533,0.00030077147,0.012055299],"study_design_scores_gemma":[0.0001672351,0.00002823317,0.00022707687,0.000057520123,0.000017041815,9.394401e-8,0.00046340632,0.026838453,0.00019632273,0.9694475,0.0023671887,0.00018993647],"about_ca_topic_score_codex":0.000020211619,"about_ca_topic_score_gemma":0.0000025188954,"teacher_disagreement_score":0.95944947,"about_ca_system_score_codex":0.00003211888,"about_ca_system_score_gemma":0.000019766034,"threshold_uncertainty_score":0.9268457},"labels":[],"label_agreement":null},{"id":"W2955936886","doi":"10.1007/s00220-020-03713-4","title":"Geometrically Finite Poincaré–Einstein Metrics","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometric Analysis and Curvature Flows","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université du Québec à Montréal","funders":"Canada Research Chairs; Simons Foundation","keywords":"Einstein; Conformal map; Infinity; Construct (python library); Poincaré conjecture; Mathematics; Function (biology); Pure mathematics; Inverse; Mathematical analysis; Mathematical physics; Computer science; Geometry","score_opus":0.15913625584838442,"score_gpt":0.35216055470875124,"score_spread":0.19302429886036682,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2955936886","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.009079234,0.0011931023,0.8732798,0.0093354685,0.00005545851,0.00083946245,0.000029532224,0.0003691845,0.10581874],"genre_scores_gemma":[0.8151279,0.00017093663,0.18355213,0.0007734653,0.00009309405,0.000061610175,0.000028493563,0.00004880637,0.00014357785],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99749166,0.00024381305,0.0009287954,0.00034969268,0.00060445373,0.000381584],"domain_scores_gemma":[0.9921964,0.004907633,0.0002680126,0.0021891298,0.00020636783,0.00023245461],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00076920993,0.00028119178,0.00072484754,0.00035761125,0.0001577704,0.000109472945,0.0019298743,0.00016458597,0.00019437766],"category_scores_gemma":[0.007948848,0.00025380193,0.0002897707,0.008611779,0.00018558926,0.0002398094,0.00083662843,0.00078898936,0.0004917973],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009311174,0.0014313948,0.0005282148,0.0002263481,0.00012466272,0.0000060216184,0.0011626527,0.0001666157,0.000048469028,0.96404713,0.0032187884,0.029030368],"study_design_scores_gemma":[0.00059172587,0.00007458709,0.00015838943,0.000067511624,0.00015593435,0.0000018968965,0.00041637142,0.12669745,0.000075691765,0.8626644,0.008680619,0.0004154292],"about_ca_topic_score_codex":0.000003620294,"about_ca_topic_score_gemma":0.0000033906679,"teacher_disagreement_score":0.80604863,"about_ca_system_score_codex":0.000086283995,"about_ca_system_score_gemma":0.000056946054,"threshold_uncertainty_score":0.9999914},"labels":[],"label_agreement":null},{"id":"W2963092953","doi":"10.1007/s00220-017-2903-0","title":"The Coulomb Branch of 3d $${\\mathcal{N}= 4}$$ N = 4 Theories","year":2017,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":142,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Institut Périmètre de physique théorique; U.S. Department of Energy; Ministero dello Sviluppo Economico; Industry Canada; European Commission; Government of Canada","keywords":"Quiver; Moduli space; Coulomb; Physics; Holomorphic function; Instanton; Mathematical physics; Gauge theory; Supersymmetry; Dyon; Supersymmetric gauge theory; Twistor space; Magnetic monopole; Twistor theory; Theoretical physics; Quantum mechanics; Pure mathematics; Mathematics","score_opus":0.02855709355935224,"score_gpt":0.3280253628485771,"score_spread":0.2994682692892248,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2963092953","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0586757,0.00026744755,0.19140805,0.003378665,0.00015587958,0.0007191577,0.000076726945,0.00005157938,0.7452668],"genre_scores_gemma":[0.9969141,0.00003418198,0.0027168887,0.000016344398,0.000083656516,0.000052878608,0.00000929388,0.00002067726,0.00015200273],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99894387,0.00010168541,0.0004038439,0.00013542651,0.0001792921,0.00023586386],"domain_scores_gemma":[0.9947097,0.0010372063,0.00027044083,0.0038231618,0.00011211466,0.00004743308],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004354147,0.00014796125,0.00028463447,0.000010980513,0.00083314534,0.00015009427,0.002249764,0.00003747109,0.000045589746],"category_scores_gemma":[0.00010147788,0.00010448265,0.00011817172,0.00009202563,0.001993181,0.00016985407,0.0007910361,0.0003405259,0.00007718945],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000005299766,0.00031967327,0.0010332443,0.00001886309,0.000029033206,4.618549e-8,0.0002972958,0.000006283299,0.00002524223,0.9714971,0.000041252453,0.026726618],"study_design_scores_gemma":[0.00022452956,0.000011828986,0.0007930926,0.000076588316,0.000021039124,1.2124615e-7,0.00020977996,0.0021986852,0.00048808046,0.9953708,0.0004892339,0.00011622137],"about_ca_topic_score_codex":0.000020220135,"about_ca_topic_score_gemma":0.0000027171934,"teacher_disagreement_score":0.9382384,"about_ca_system_score_codex":0.0000124702565,"about_ca_system_score_gemma":0.00003737579,"threshold_uncertainty_score":0.7343958},"labels":[],"label_agreement":null},{"id":"W2963252449","doi":"10.1007/s00220-016-2747-z","title":"On the Nodal Lines of Eisenstein Series on Schottky Surfaces","year":2016,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"","keywords":"Complex system; Series (stratigraphy); NODAL; Eisenstein series; Schottky diode; Mathematics; Physics; Pure mathematics; Computer science; Quantum mechanics; Artificial intelligence; Geology","score_opus":0.11884486571554084,"score_gpt":0.3659889829325781,"score_spread":0.24714411721703725,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2963252449","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.85045666,0.000054496406,0.017013889,0.015838688,0.00011375076,0.0015293256,0.00007261082,0.0002906919,0.11462991],"genre_scores_gemma":[0.97231317,0.000055612323,0.026795112,0.0001213826,0.000057528043,0.00011654104,0.0000020395537,0.00006512391,0.00047348367],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99755603,0.000470356,0.00084216875,0.00026658003,0.0005204853,0.0003443495],"domain_scores_gemma":[0.9764833,0.019205268,0.0003222999,0.0037694701,0.00015152931,0.000068128706],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0010363429,0.00032572864,0.0005910717,0.00006950016,0.00017483307,0.00003481861,0.0018564484,0.000109568464,0.00019292612],"category_scores_gemma":[0.0037289152,0.0001749069,0.00020369743,0.0004950493,0.0011706537,0.00018844705,0.00038361963,0.00043078332,0.00044207126],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000038824106,0.0012347109,0.000013297708,0.00011436859,0.00003905213,6.2647484e-7,0.0003796939,0.000015388128,0.0031096323,0.9936622,0.00042946168,0.0009627433],"study_design_scores_gemma":[0.00031412928,0.00012778732,0.00003008921,0.0009950042,0.000028287119,0.000002008099,0.0002798126,0.00064203126,0.01583441,0.9814538,0.000071441784,0.00022119677],"about_ca_topic_score_codex":0.0000012750277,"about_ca_topic_score_gemma":0.0000045008364,"teacher_disagreement_score":0.12185653,"about_ca_system_score_codex":0.00009314029,"about_ca_system_score_gemma":0.000040172712,"threshold_uncertainty_score":0.7132497},"labels":[],"label_agreement":null},{"id":"W2964036796","doi":"10.1007/s00220-013-1665-6","title":"The JLO Character for the Noncommutative Space of Connections of Aastrup-Grimstrup-Nest","year":2013,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Noncommutative and Quantum Gravity Theories","field":"Physics and Astronomy","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Spectral triple; Noncommutative geometry; Dirac operator; Commutative property; Mathematics; Pure mathematics; Holonomy; Operator (biology); Operator algebra; Physics","score_opus":0.03743920805942932,"score_gpt":0.3323700230014069,"score_spread":0.2949308149419776,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2964036796","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.31962973,0.00056077045,0.6162778,0.016165182,0.000240375,0.0047318633,0.0004863069,0.000053088403,0.04185484],"genre_scores_gemma":[0.99021894,0.00002069777,0.00900501,0.000015666104,0.000044479995,0.00052563346,0.000024434985,0.000015988582,0.00012916011],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99896514,0.00019382579,0.00045969684,0.00009091536,0.00011396285,0.00017643618],"domain_scores_gemma":[0.9892524,0.008699642,0.00031354686,0.0014219482,0.0002852026,0.0000272949],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00041962508,0.0001331586,0.00028299753,0.000022732687,0.00042688136,0.000039456467,0.0010348818,0.000026629692,0.00005446609],"category_scores_gemma":[0.000116543735,0.00008046487,0.00015694076,0.0002753043,0.0011785933,0.0001530776,0.00028371107,0.0002654073,0.00002491145],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006452018,0.00031606277,0.0007147111,0.000025053585,0.000080915925,5.389344e-9,0.0024122342,0.000022531425,0.00054779643,0.9893708,0.00012805918,0.00637533],"study_design_scores_gemma":[0.00027580376,0.00004186719,0.0015147027,0.000066817076,0.000045948414,2.0841102e-7,0.008672052,0.0074413903,0.0034961938,0.9776383,0.000714906,0.00009179245],"about_ca_topic_score_codex":0.00011144672,"about_ca_topic_score_gemma":0.000012051917,"teacher_disagreement_score":0.6705892,"about_ca_system_score_codex":0.000015215792,"about_ca_system_score_gemma":0.000047988586,"threshold_uncertainty_score":0.43425763},"labels":[],"label_agreement":null},{"id":"W2964198446","doi":"10.1007/s00220-020-03876-0","title":"Super Quantum Airy Structures","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Cold Atom Physics and Bose-Einstein Condensates","field":"Physics and Astronomy","cited_by":15,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"FP7 Ideas: European Research Council; European Regional Development Fund; Engineering and Physical Sciences Research Council; Natural Sciences and Engineering Research Council of Canada; Fundacja na rzecz Nauki Polskiej; European Commission","keywords":"Quantum; Physics; Quantum mechanics","score_opus":0.07237111470882818,"score_gpt":0.31460816079869147,"score_spread":0.2422370460898633,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2964198446","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.64599496,0.00075867417,0.123872735,0.020267827,0.00020749931,0.0018249326,0.00019272897,0.0004570672,0.2064236],"genre_scores_gemma":[0.9946685,0.0000058801074,0.004697083,0.00028991338,0.0001908946,0.000045839904,0.000044237182,0.000025778885,0.00003187301],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990205,0.00006891977,0.00033075924,0.00020547595,0.00015677715,0.00021754387],"domain_scores_gemma":[0.99836075,0.00035963592,0.00007357572,0.0010512137,0.00005326573,0.00010153867],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00007456915,0.0001752958,0.00027845314,0.000018679553,0.00013387097,0.0000705435,0.0008878853,0.000032620417,0.00034158325],"category_scores_gemma":[0.000026434669,0.00016242608,0.00012045727,0.00033037688,0.00017100877,0.00015186486,0.00046344733,0.00035501848,0.00023605187],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000025900656,0.00020945772,0.0015238731,0.000025196452,0.00002981464,3.064537e-7,0.0010394339,0.000052388128,0.000823229,0.98869294,0.0004009873,0.007199813],"study_design_scores_gemma":[0.00028224778,0.000017402224,0.00033564173,0.000031471933,0.000024769797,1.5772643e-7,0.00061513804,0.04293525,0.0010798989,0.95228493,0.0021734224,0.00021967973],"about_ca_topic_score_codex":0.000014942461,"about_ca_topic_score_gemma":0.0000010392778,"teacher_disagreement_score":0.34867355,"about_ca_system_score_codex":0.00001436524,"about_ca_system_score_gemma":0.00004200691,"threshold_uncertainty_score":0.6623543},"labels":[],"label_agreement":null},{"id":"W2964260944","doi":"10.1007/s00220-019-03301-1","title":"Non-closure of the Set of Quantum Correlations via Graphs","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Applications","field":"Physics and Astronomy","cited_by":89,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Bipartite graph; Mathematics; Closure (psychology); Quantum; Set (abstract data type); Complex system; Discrete mathematics; Graph; Computer science; Quantum mechanics; Physics; Artificial intelligence","score_opus":0.026025571326888517,"score_gpt":0.29065837587923177,"score_spread":0.2646328045523432,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2964260944","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.69379526,0.00005237346,0.27654997,0.0009003123,0.00010612194,0.001320606,0.00015214825,0.000020573805,0.027102599],"genre_scores_gemma":[0.99800265,0.0000044073836,0.001808083,0.000010262254,0.000012466687,0.00006432975,0.000029581135,0.000013698986,0.000054493594],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991395,0.000050943236,0.00044020146,0.000109026565,0.00014566637,0.00011469864],"domain_scores_gemma":[0.997268,0.0003089069,0.00026016444,0.002035875,0.000102705766,0.000024333198],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00018097868,0.00009989785,0.0002396736,0.000031556214,0.00007970155,0.0000072108774,0.00094806973,0.000035788464,0.000107239466],"category_scores_gemma":[0.000009257123,0.00007886033,0.00015760363,0.0005522765,0.00016331696,0.00006128826,0.00030437286,0.00023983035,0.00006605734],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[8.99495e-7,0.00032162352,0.010233156,0.00003097174,0.00001988074,3.2984724e-9,0.00035068337,0.000111073816,0.001135253,0.9873732,0.00005767807,0.0003655929],"study_design_scores_gemma":[0.00017182424,0.000010618527,0.0019308256,0.00008718195,0.000023510649,1.1627602e-7,0.00026372808,0.10430047,0.00095442345,0.89206153,0.00012235185,0.00007342214],"about_ca_topic_score_codex":0.000026418862,"about_ca_topic_score_gemma":0.0000014050961,"teacher_disagreement_score":0.30420738,"about_ca_system_score_codex":0.000009794689,"about_ca_system_score_gemma":0.000045409983,"threshold_uncertainty_score":0.32158306},"labels":[],"label_agreement":null},{"id":"W2966843394","doi":"10.1007/s00220-019-03539-9","title":"Embeddings of Uniform Roe Algebras","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":16,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"York University","funders":"Agence Nationale de la Recherche","keywords":"Embedding; Mathematics; Pure mathematics; Algebra over a field; Metric (unit); Computer science","score_opus":0.08918555069672833,"score_gpt":0.4109881209479378,"score_spread":0.32180257025120945,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2966843394","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.78369766,0.00019663625,0.06380603,0.0008787213,0.000063860636,0.0019335032,0.000023466673,0.00019614557,0.14920399],"genre_scores_gemma":[0.8010897,0.000040446226,0.19826515,0.00002882025,0.000012694223,0.000058648377,0.000007906533,0.000041681746,0.00045495643],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99838775,0.00012329627,0.0006188435,0.00019262733,0.00038288636,0.0002946091],"domain_scores_gemma":[0.9945758,0.0020299011,0.00016376645,0.0029787312,0.00018412479,0.00006770649],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00059517106,0.00016692163,0.0004532519,0.00009337129,0.000061547114,0.0000216386,0.0015119014,0.00008676941,0.0002529882],"category_scores_gemma":[0.0007453795,0.00015435508,0.00010245658,0.0006532965,0.000294091,0.0002589755,0.00078958727,0.00047320998,0.00041020807],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000059255412,0.0005634804,0.000479638,0.00026859296,0.000018894672,3.4874256e-7,0.000861283,0.000028401357,0.0010564773,0.99526674,0.00009865578,0.00135155],"study_design_scores_gemma":[0.0003746033,0.000038691123,0.000076219854,0.00020722835,0.000011593333,0.0000020736502,0.00047986224,0.013811641,0.00249479,0.9821335,0.00021283765,0.00015694545],"about_ca_topic_score_codex":0.0000028755119,"about_ca_topic_score_gemma":0.0000046779246,"teacher_disagreement_score":0.14874904,"about_ca_system_score_codex":0.00010579678,"about_ca_system_score_gemma":0.000069094225,"threshold_uncertainty_score":0.62944174},"labels":[],"label_agreement":null},{"id":"W2967806771","doi":"10.1007/s00220-020-03932-9","title":"Brownian Loops, Layering Fields and Imaginary Gaussian Multiplicative Chaos","year":2021,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"New York University Abu Dhabi; York University; Université du Luxembourg","keywords":"Mathematics; Brownian motion; Renormalization; Gaussian free field; Loop (graph theory); Multiplicative function; Vertex (graph theory); Mathematical analysis; Gaussian; Mathematical physics; Physics; Quantum mechanics; Combinatorics","score_opus":0.11495384330058858,"score_gpt":0.3902559213209483,"score_spread":0.27530207802035966,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2967806771","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.002569065,0.0009749059,0.9836503,0.0022190965,0.000088654284,0.00084279553,0.00007969754,0.00014128131,0.009434171],"genre_scores_gemma":[0.57092714,0.00047097268,0.42779356,0.00012811096,0.000063707776,0.0004077325,0.00006678103,0.00006714249,0.00007485331],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9977517,0.00018249168,0.0008002592,0.00057674054,0.00030148632,0.00038731543],"domain_scores_gemma":[0.9932743,0.0029446573,0.00030218455,0.0031008134,0.00021331338,0.00016474216],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00039486328,0.00043833832,0.0008625692,0.00007767386,0.00018443947,0.00018240152,0.0013301139,0.000351772,0.000049709924],"category_scores_gemma":[0.0019561546,0.0004396471,0.00013103252,0.00028081212,0.00035524,0.00011349186,0.0041759987,0.001681682,0.000020045973],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000070217347,0.00080367754,0.000016142618,0.0019328122,0.00007643328,0.00001180623,0.0034481708,0.00002176426,0.000052343945,0.982026,0.00013860143,0.0114652645],"study_design_scores_gemma":[0.0002433341,0.000022336591,0.000036960304,0.001292877,0.00009313889,0.000012607114,0.00059220195,0.13646375,0.00008432205,0.8607354,0.000037798192,0.0003852452],"about_ca_topic_score_codex":0.000017189146,"about_ca_topic_score_gemma":0.000031655174,"teacher_disagreement_score":0.56835806,"about_ca_system_score_codex":0.00010968671,"about_ca_system_score_gemma":0.00014642958,"threshold_uncertainty_score":0.9998055},"labels":[],"label_agreement":null},{"id":"W2969837229","doi":"10.1007/s00220-021-04058-2","title":"Thermodynamic Formalism for Coarse Expanding Dynamical Systems","year":2021,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Narodowe Centrum Nauki; Alfred P. Sloan Foundation","keywords":"Uniqueness; Conformal map; Logarithm; Mathematics; Dynamical systems theory; Law of the iterated logarithm; Pure mathematics; Class (philosophy); Formalism (music); Exponential function; Central limit theorem; Large deviations theory; Generalization; Iterated function; Statistical physics; Mathematical analysis; Physics; Quantum mechanics; Computer science","score_opus":0.14471647406790733,"score_gpt":0.40573700931380585,"score_spread":0.2610205352458985,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2969837229","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0401154,0.00059751014,0.94013244,0.00051418686,0.00037816266,0.0034965037,0.00029288398,0.00026667613,0.01420625],"genre_scores_gemma":[0.6785243,0.00023393623,0.31745964,0.000052384286,0.00013915391,0.0024659005,0.00062992127,0.00019953343,0.0002952079],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99574417,0.00039108287,0.0019067727,0.0006946967,0.00055021245,0.00071305333],"domain_scores_gemma":[0.9873782,0.0059225503,0.0007467632,0.0053825607,0.0003827283,0.00018720284],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0015494185,0.0006965308,0.0017335727,0.00016256656,0.0002660332,0.00047572877,0.0026645702,0.0007320504,0.00004998746],"category_scores_gemma":[0.0017454379,0.00066708255,0.0006509323,0.00033906888,0.00040538888,0.00020708823,0.0032969387,0.0016373202,0.000023145089],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000010061023,0.0015358429,0.0000076188608,0.004359047,0.00014800065,0.0000039211386,0.001392352,0.00021517048,0.00010309102,0.9907437,0.00014063243,0.0013405918],"study_design_scores_gemma":[0.00027635734,0.00001293748,0.0000031239072,0.0013613416,0.000112606154,0.000006417555,0.00051422353,0.48516068,0.0000070145097,0.51214933,0.000030663392,0.00036529847],"about_ca_topic_score_codex":0.000015326359,"about_ca_topic_score_gemma":0.000026374413,"teacher_disagreement_score":0.6384089,"about_ca_system_score_codex":0.00044240922,"about_ca_system_score_gemma":0.0002127799,"threshold_uncertainty_score":0.99957806},"labels":[],"label_agreement":null},{"id":"W2980426037","doi":"10.1007/s00220-020-03857-3","title":"A Non-degenerate Scattering Theory for the Wave Equation on Extremal Reissner–Nordström","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":16,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Connaught Fund; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Alfred P. Sloan Foundation","keywords":"Event horizon; Scattering; Blueshift; Redshift; Scattering theory; Horizon; Class (philosophy)","score_opus":0.10098811839053765,"score_gpt":0.3094838256733885,"score_spread":0.20849570728285086,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2980426037","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.010052296,0.000029133118,0.95811933,0.0049053323,0.000037416263,0.0008060035,0.000038433787,0.000037445607,0.025974583],"genre_scores_gemma":[0.9918926,0.000005487579,0.0068071294,0.00051317,0.0003366082,0.00029610653,0.000053333202,0.000038922168,0.00005665906],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989553,0.00009717195,0.00034104782,0.00021937962,0.00014316806,0.00024392056],"domain_scores_gemma":[0.99715763,0.0014341972,0.00010854872,0.0011565299,0.00006693985,0.00007614881],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00027466376,0.00018738696,0.0002443255,0.000014591572,0.00027146348,0.000078049736,0.0007316533,0.000036866437,0.00009146789],"category_scores_gemma":[0.000048812297,0.00014022973,0.0001557022,0.0002511182,0.00029210027,0.00009552431,0.00028627517,0.0003507391,0.00011589897],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000026030128,0.00024767464,0.000022767024,0.00002880019,0.000036014666,7.793515e-8,0.000859868,0.0006277323,0.0002778672,0.9821723,0.00012955222,0.015571301],"study_design_scores_gemma":[0.0003200616,0.000037947408,0.000039276412,0.000053630603,0.00003665446,7.349634e-8,0.00039260916,0.1789841,0.0010067342,0.8187812,0.00020820918,0.00013947272],"about_ca_topic_score_codex":0.0000026830317,"about_ca_topic_score_gemma":2.3505815e-7,"teacher_disagreement_score":0.9818403,"about_ca_system_score_codex":0.00002294806,"about_ca_system_score_gemma":0.000029508064,"threshold_uncertainty_score":0.5718403},"labels":[],"label_agreement":null},{"id":"W2981028649","doi":"10.1007/s00220-020-03733-0","title":"Geometric Inequalities for Quasi-Local Masses","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spacecraft Dynamics and Control","field":"Engineering","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Directorate for Mathematical and Physical Sciences; Gordon and Betty Moore Foundation; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; John Templeton Foundation; National Science Foundation","keywords":"Entropy (arrow of time); Inequality; Complex system; Hamiltonian (control theory); Kullback–Leibler divergence; Upper and lower bounds","score_opus":0.06491309394769379,"score_gpt":0.2932648521596827,"score_spread":0.2283517582119889,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2981028649","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0012563601,0.00037352156,0.9930503,0.0013611537,0.000020384834,0.00024257415,0.000022031514,0.0001484115,0.0035252876],"genre_scores_gemma":[0.959165,0.00009925533,0.040278368,0.00015169253,0.00004100615,0.00019832354,0.000020838537,0.000028595096,0.00001691705],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9994156,0.000022608692,0.00024432834,0.000080001344,0.00008273588,0.00015472446],"domain_scores_gemma":[0.9985835,0.00071658875,0.000022225338,0.0005879917,0.00003528451,0.00005440994],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.000104177285,0.00010115564,0.00021077607,0.00004110533,0.00004463492,0.000031053038,0.0005053886,0.00004394722,0.000011061205],"category_scores_gemma":[0.0001683608,0.00010341966,0.00006508525,0.0004134543,0.00007380054,0.000073779716,0.00009792721,0.00016077518,0.00004236191],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000051986544,0.0002189472,0.000103220875,0.00040019117,0.00004626798,3.085077e-7,0.0012339457,0.00699258,0.00024963426,0.96550524,0.0006839744,0.02456048],"study_design_scores_gemma":[0.00020943352,0.000020429856,0.000018793828,0.000019143477,0.00001053115,1.8244765e-7,0.00037825946,0.8188881,0.00003955221,0.17879082,0.0015234215,0.00010133742],"about_ca_topic_score_codex":0.0000015337323,"about_ca_topic_score_gemma":0.0000031053376,"teacher_disagreement_score":0.95790863,"about_ca_system_score_codex":0.000040623567,"about_ca_system_score_gemma":0.000011935297,"threshold_uncertainty_score":0.42173314},"labels":[],"label_agreement":null},{"id":"W2983031382","doi":"10.1007/s00220-019-03616-z","title":"Isospectral Flows Related to Frobenius–Stickelberger–Thiele Polynomials","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":9,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Saskatchewan","funders":"Youth Innovation Promotion Association of the Chinese Academy of Sciences; Natural Sciences and Engineering Research Council of Canada; National Natural Science Foundation of China","keywords":"Isospectral; Peakon; Integrable system; Mathematics; Lattice (music); Eigenvalues and eigenvectors; Ode; Interlacing; Pure mathematics; Mathematical analysis; Physics; Quantum mechanics; Computer science","score_opus":0.018384350108637895,"score_gpt":0.31335929931891854,"score_spread":0.29497494921028067,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2983031382","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7308494,0.000062413405,0.013275183,0.0020230983,0.00017534796,0.001011301,0.00007053099,0.00009282732,0.2524399],"genre_scores_gemma":[0.9614075,0.0000034470302,0.036614865,0.00008638483,0.000078657584,0.000044796852,0.00006063643,0.000032097552,0.0016716257],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988176,0.00008632928,0.00045268427,0.00021056707,0.00013199008,0.00030081856],"domain_scores_gemma":[0.99765676,0.0003061973,0.000075035576,0.0018086204,0.00004596308,0.00010740319],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.00020162623,0.00016600778,0.00033391526,0.00004778746,0.000099751414,0.000050327944,0.00078812154,0.000052855146,0.0008890073],"category_scores_gemma":[0.000026305806,0.00016143681,0.0001338415,0.00037647237,0.00006387167,0.000114699484,0.00037653308,0.00036851055,0.0031254266],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004291436,0.0006045462,0.003059748,0.000015997037,0.000037981798,1.8400702e-7,0.001002456,0.00042277406,0.0011096221,0.9908209,0.00040201892,0.0025195063],"study_design_scores_gemma":[0.0005341791,0.00003990229,0.00097188185,0.00011942598,0.000028569233,6.000084e-7,0.00056589796,0.048470955,0.0005727831,0.9447328,0.003589536,0.0003734825],"about_ca_topic_score_codex":0.000035732362,"about_ca_topic_score_gemma":0.000004072532,"teacher_disagreement_score":0.25076827,"about_ca_system_score_codex":0.000040876625,"about_ca_system_score_gemma":0.000049069404,"threshold_uncertainty_score":0.99765074},"labels":[],"label_agreement":null},{"id":"W2983832016","doi":"10.1007/s00220-022-04483-x","title":"Logarithmic Variance for the Height Function of Square-Ice","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":23,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Victoria","funders":"National Center of Competence in Research Quantum Science and Technology; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada","keywords":"Logarithm; Square lattice; Square (algebra); Mathematics; Function (biology); Homomorphism; Mean square; Variance (accounting); Vertex (graph theory); Combinatorics; Geometry; Mathematical analysis; Physics; Statistical physics; Graph","score_opus":0.11703606612820683,"score_gpt":0.36665516475161825,"score_spread":0.24961909862341142,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2983832016","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00013903531,0.0002140948,0.99592626,0.00103318,0.00008031121,0.00071563607,0.000080223894,0.000031981217,0.0017792676],"genre_scores_gemma":[0.76173574,0.00003311895,0.23627716,0.00017795336,0.000042481624,0.0015239333,0.000021141483,0.00003630402,0.00015214318],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99884313,0.00011000756,0.00046798468,0.00014579063,0.00025607657,0.00017702134],"domain_scores_gemma":[0.98987406,0.008412604,0.0001959007,0.0013643664,0.00012614371,0.000026927726],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0007237424,0.000114043556,0.0002610239,0.000030233285,0.00038716383,0.000015045746,0.0010521375,0.00003336409,0.000092664384],"category_scores_gemma":[0.0013427847,0.00009141151,0.00008672428,0.0004044503,0.00014603612,0.00005119765,0.0005164662,0.0003264818,0.0000068604545],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000026295505,0.000560088,0.0000012284058,0.00020805867,0.000033909833,1.16635704e-7,0.0004602716,0.0001431974,0.000044328717,0.992815,0.0005070611,0.0052004494],"study_design_scores_gemma":[0.00026752226,0.00008690593,0.00000799789,0.000034356617,0.000074810276,0.0000020230789,0.00046856134,0.17786027,0.000027112974,0.8197662,0.0013218272,0.00008240578],"about_ca_topic_score_codex":0.0000027760705,"about_ca_topic_score_gemma":0.0000035741725,"teacher_disagreement_score":0.76159674,"about_ca_system_score_codex":0.000072457915,"about_ca_system_score_gemma":0.0000591809,"threshold_uncertainty_score":0.3727653},"labels":[],"label_agreement":null},{"id":"W2985527116","doi":"10.1007/s00220-020-03911-0","title":"Geometry of Twisted Kähler–Einstein Metrics and Collapsing","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Division of Mathematical Sciences; Engineering and Physical Sciences Research Council; Simons Foundation","keywords":"Fiber bundle; Gravitational singularity; Holomorphic function; Bundle; Discriminant; Base (topology); Differential geometry; Flow (mathematics)","score_opus":0.19533033423577398,"score_gpt":0.36105646387223844,"score_spread":0.16572612963646446,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2985527116","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.55928403,0.0013765821,0.3852515,0.004705213,0.000065897904,0.0013318205,0.000050072897,0.00029924535,0.04763567],"genre_scores_gemma":[0.8550424,0.000054465974,0.14467032,0.00011357573,0.000021046031,0.000017536637,0.0000061923456,0.000022980132,0.000051485044],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99857944,0.0001525438,0.0006265617,0.0001892356,0.00025909801,0.00019309037],"domain_scores_gemma":[0.99621457,0.002141567,0.00021371365,0.0012084419,0.0001179415,0.00010376383],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00041181545,0.00016498154,0.00049005455,0.00012893094,0.00009414602,0.000033441527,0.000815578,0.00008365716,0.000044494005],"category_scores_gemma":[0.0018788567,0.00016501776,0.00007900213,0.0019627146,0.00026486948,0.00011846879,0.0007238668,0.0003009785,0.000022279148],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000079070005,0.00051520596,0.00049785903,0.00059962657,0.000035608875,9.887985e-7,0.001455058,0.000011751364,0.000667732,0.99216557,0.00021370858,0.0038289754],"study_design_scores_gemma":[0.0005578753,0.00008197452,0.0003213368,0.00017665578,0.00007093777,0.0000042063098,0.0009790948,0.033739727,0.0010479524,0.9620029,0.00077451626,0.00024282883],"about_ca_topic_score_codex":0.0000032022963,"about_ca_topic_score_gemma":0.0000021933608,"teacher_disagreement_score":0.29575837,"about_ca_system_score_codex":0.000030523326,"about_ca_system_score_gemma":0.000030789663,"threshold_uncertainty_score":0.6729229},"labels":[],"label_agreement":null},{"id":"W2988031215","doi":"10.1007/s00220-021-04307-4","title":"Chiral Algebras, Factorization Algebras, and Borcherds’s “Singular Commutative Rings” Approach to Vertex Algebras","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Sherbrooke","funders":"","keywords":"Vertex (graph theory); Mathematics; Factorization; Pure mathematics; Non-associative algebra; Commutative property; Algebra representation; Vertex operator algebra; Algebra over a field; Jordan algebra; Combinatorics; Graph; Algorithm","score_opus":0.07067331368770442,"score_gpt":0.3318442975506059,"score_spread":0.2611709838629015,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2988031215","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5885174,0.000836002,0.36530554,0.0019870473,0.0005386834,0.0039151944,0.000094549956,0.00060439954,0.038201164],"genre_scores_gemma":[0.9272952,0.000023682442,0.07153293,0.000273248,0.000054208303,0.0004927212,0.000087524655,0.00008828516,0.0001521701],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9971201,0.00059187994,0.00073728507,0.0004793492,0.00061422784,0.00045716995],"domain_scores_gemma":[0.99609965,0.0011912882,0.0002504923,0.002158646,0.00011467286,0.00018526461],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00069263,0.00038610084,0.0006390126,0.00014584852,0.00081704877,0.00012162932,0.0016267251,0.000115078365,0.00007097307],"category_scores_gemma":[0.00062181253,0.00040059185,0.00012357756,0.0008835722,0.00028876384,0.00023645003,0.0022564756,0.00091867894,0.00001526983],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000017348768,0.0008366479,0.00013941625,0.00009487522,0.000060793216,7.4548007e-7,0.0079023205,0.00011934325,0.00006217018,0.98848206,0.0004146356,0.0018696729],"study_design_scores_gemma":[0.00062917377,0.00008725388,0.00025434283,0.00005346031,0.00006113667,0.000010376985,0.001877134,0.013378752,0.00010482749,0.98270303,0.00041354826,0.00042697007],"about_ca_topic_score_codex":0.000023999068,"about_ca_topic_score_gemma":0.0000030985823,"teacher_disagreement_score":0.3387778,"about_ca_system_score_codex":0.00032421885,"about_ca_system_score_gemma":0.000092660506,"threshold_uncertainty_score":0.9998446},"labels":[],"label_agreement":null},{"id":"W2989905849","doi":"10.1007/s00220-021-04027-9","title":"Large Deviations for the Largest Eigenvalue of Sub-Gaussian Matrices","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Toronto Metropolitan University","funders":"European Research Council; Agence Nationale de la Recherche","keywords":"Eigenvalues and eigenvectors; Gaussian; Mathematics; Combinatorics; Applied mathematics; Statistical physics; Physics","score_opus":0.09921858437633929,"score_gpt":0.3890068613198011,"score_spread":0.2897882769434618,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2989905849","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.015559799,0.0033967134,0.96402097,0.0054022637,0.000054494874,0.0016633772,0.00024644105,0.000092109534,0.009563829],"genre_scores_gemma":[0.9133962,0.0017115042,0.08350898,0.000087076565,0.000075446726,0.0008826357,0.000068428635,0.000043084743,0.00022664026],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985807,0.000130627,0.00066509796,0.00017645102,0.00020298491,0.00024413818],"domain_scores_gemma":[0.99070966,0.0064185006,0.0002699859,0.0022929155,0.0002652078,0.00004371005],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00073292415,0.00014545022,0.00035055794,0.000043296117,0.00037269868,0.000047896123,0.0009838955,0.000074929594,0.000041292245],"category_scores_gemma":[0.0009640289,0.00011201212,0.00019958233,0.00080141734,0.0001544374,0.0001043713,0.00032773818,0.00021721452,0.000028667928],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000033141496,0.00095872884,0.000136145,0.00020477273,0.000038893562,1.5485999e-7,0.0006425326,0.000017640992,0.00024391936,0.9961521,0.0011222782,0.000479521],"study_design_scores_gemma":[0.000652691,0.000008838697,0.00025038052,0.000091059985,0.0001457553,0.00000289956,0.0008812246,0.01480755,0.0013668912,0.976053,0.0056060073,0.00013370409],"about_ca_topic_score_codex":0.0000033824613,"about_ca_topic_score_gemma":0.00005159369,"teacher_disagreement_score":0.8978364,"about_ca_system_score_codex":0.00003658787,"about_ca_system_score_gemma":0.00009899672,"threshold_uncertainty_score":0.45677218},"labels":[],"label_agreement":null},{"id":"W2991540144","doi":"10.1007/s00220-019-03636-9","title":"Correction to: The Moonshine Anomaly","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Fetal and Pediatric Neurological Disorders","field":"Medicine","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Anomaly (physics); Computer science; Data science; Theoretical physics; Physics; Quantum mechanics","score_opus":0.04375034133975381,"score_gpt":0.3172623491320483,"score_spread":0.2735120077922945,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2991540144","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5919277,0.0003731153,0.00838049,0.04214667,0.0005053986,0.0020425576,0.0000066821235,0.0001636912,0.35445365],"genre_scores_gemma":[0.9942716,0.000052299143,0.002121923,0.001581292,0.000041052357,0.00005232594,0.000010055891,0.0000091274505,0.0018603525],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9994031,0.00006248029,0.0001847196,0.000109532244,0.000121656245,0.000118480944],"domain_scores_gemma":[0.99803245,0.0006807954,0.000030361969,0.0011741616,0.00003479585,0.000047445883],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.00015799818,0.0000741335,0.00016193223,0.00002481797,0.000056548903,0.000012097928,0.00035995158,0.000029337925,0.00013279598],"category_scores_gemma":[0.000324944,0.000046392124,0.00006053535,0.00043960617,0.00006955299,0.000035982634,0.00020921866,0.00033533567,0.0016137111],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00040691727,0.008511684,0.12365695,0.00054808165,0.00011756625,0.000007727335,0.0042001703,0.0020841802,0.0026337968,0.64499336,0.099866845,0.112972684],"study_design_scores_gemma":[0.0022670384,0.0011407747,0.2674395,0.0003250411,0.00018811808,0.00005621089,0.000826104,0.21896565,0.00019772399,0.44111416,0.066864856,0.0006148083],"about_ca_topic_score_codex":0.000009515965,"about_ca_topic_score_gemma":0.000009227595,"teacher_disagreement_score":0.40234384,"about_ca_system_score_codex":0.000019510484,"about_ca_system_score_gemma":0.000019269335,"threshold_uncertainty_score":0.9991636},"labels":[],"label_agreement":null},{"id":"W2992120299","doi":"10.1007/s00220-019-03632-z","title":"Interface Dynamics in Semilinear Wave Equations","year":2019,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometric Analysis and Curvature Flows","field":"Mathematics","cited_by":6,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Hypersurface; Curvature; Euclidean geometry; Motion (physics); Constructive; Mathematics; Mean curvature; Wave equation; Mathematical analysis; Character (mathematics); Mathematical physics; Dynamics (music); Pure mathematics; Physics; Geometry; Classical mechanics","score_opus":0.08818590304758006,"score_gpt":0.3606680148646585,"score_spread":0.27248211181707843,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2992120299","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.2085352,0.00046164135,0.5898275,0.0024935126,0.000099340534,0.0015505139,0.000029216113,0.00017673617,0.19682638],"genre_scores_gemma":[0.9320446,0.000042157073,0.06689248,0.000042720843,0.000016205326,0.000057230496,0.00003505319,0.000028141725,0.0008413577],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984029,0.00016863397,0.0006820272,0.00022455961,0.00026159405,0.00026027337],"domain_scores_gemma":[0.9948455,0.0025133502,0.00015280252,0.0023369084,0.00010152228,0.00004993604],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0007418903,0.0001791911,0.00046074792,0.00020516636,0.000054161974,0.000048101254,0.0008489545,0.00011953154,0.00019908063],"category_scores_gemma":[0.001082588,0.00016785484,0.0001259185,0.0016532877,0.00010126036,0.00018934597,0.0004556191,0.00059780746,0.00043063491],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000024925566,0.0008226421,0.0009052449,0.000083861996,0.00002168279,4.988896e-7,0.0005941676,0.00027030043,0.000025202158,0.99522567,0.00011095408,0.0019372604],"study_design_scores_gemma":[0.00021873732,0.0000109515495,0.00008427779,0.00010901824,0.000018491764,7.6964847e-7,0.0011869513,0.46410716,0.000018158386,0.5339965,0.00012109671,0.00012789405],"about_ca_topic_score_codex":0.000012914461,"about_ca_topic_score_gemma":0.00019148109,"teacher_disagreement_score":0.72350943,"about_ca_system_score_codex":0.0003108752,"about_ca_system_score_gemma":0.000041632156,"threshold_uncertainty_score":0.68449223},"labels":[],"label_agreement":null},{"id":"W2992683988","doi":"10.1007/s00220-021-04187-8","title":"Gauge Theory on Noncommutative Riemannian Principal Bundles","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":14,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of New Brunswick","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Noncommutative geometry; Spectral triple; Noncommutative algebraic geometry; Noncommutative quantum field theory; Gauge theory; Principal (computer security); Dirac operator; Quantum differential calculus; Affine transformation; Manifold (fluid mechanics)","score_opus":0.15268214902214924,"score_gpt":0.44828151880300315,"score_spread":0.2955993697808539,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W2992683988","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.18206467,0.0007598012,0.28204072,0.0052529746,0.00012497292,0.002029994,0.0001267678,0.00053977955,0.52706033],"genre_scores_gemma":[0.7877267,0.00008463389,0.21027872,0.00023368305,0.00005433806,0.0002715344,0.00004084138,0.00008213819,0.0012274245],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99728566,0.0009494145,0.0005751461,0.00032029863,0.00046271158,0.00040674428],"domain_scores_gemma":[0.98886156,0.006931579,0.000120559795,0.003685816,0.00027798218,0.00012251562],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0009427932,0.00025472383,0.00046437993,0.000074121584,0.00028699855,0.000076713804,0.00134789,0.00010659885,0.00016478596],"category_scores_gemma":[0.0034328985,0.00023730777,0.0001328214,0.00070540013,0.0005583011,0.0001999398,0.0009997855,0.00094578974,0.00043514822],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001574177,0.0017460751,0.000046597113,0.00011020876,0.000038653736,0.00001276434,0.0023480929,0.000031094416,0.0001936666,0.99214447,0.00012268423,0.0031899377],"study_design_scores_gemma":[0.0004373436,0.00004690717,0.000070062335,0.00027451327,0.000020016885,0.000008212421,0.0014735907,0.0024553654,0.0026943458,0.99169546,0.0005807975,0.00024340344],"about_ca_topic_score_codex":0.0000010921891,"about_ca_topic_score_gemma":0.000022249667,"teacher_disagreement_score":0.60566205,"about_ca_system_score_codex":0.00021906997,"about_ca_system_score_gemma":0.00016661314,"threshold_uncertainty_score":0.96771306},"labels":[],"label_agreement":null},{"id":"W3000096852","doi":"10.1007/s00220-021-03979-2","title":"Gibbsian Representations of Continuous Specifications: The Theorems of Kozlov and Sullivan Revisited","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"semigroups and automata theory","field":"Computer Science","cited_by":9,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"Israel Science Foundation; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Agence Nationale de la Recherche","keywords":"Lattice (music); Characterization (materials science); Algebra over a field; Complete lattice; Uniform continuity; Continuous function (set theory)","score_opus":0.06212556313151681,"score_gpt":0.3152315522961542,"score_spread":0.2531059891646374,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3000096852","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.025986636,0.0035014409,0.91308403,0.008864098,0.000045458033,0.0006126036,0.000030308154,0.00009225157,0.04778318],"genre_scores_gemma":[0.89414215,0.00046480438,0.10521757,0.000059232127,0.000009996684,0.000024481416,0.000011945587,0.0000068365707,0.00006295936],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99883896,0.0002931511,0.00046297908,0.00015801754,0.00014794801,0.00009896369],"domain_scores_gemma":[0.9946482,0.0018232176,0.0001945101,0.0031294397,0.00017827177,0.000026329206],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005052477,0.000079010206,0.00023080687,0.00003703514,0.00009710483,0.000043764325,0.0013783284,0.000030680032,0.000014351236],"category_scores_gemma":[0.00041449768,0.000061564046,0.000059026326,0.00071796967,0.0004999368,0.00015735868,0.00067856547,0.00014782323,0.0000068639447],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[6.334154e-7,0.00024652996,0.00016541063,0.000035838446,0.000012506111,3.4296306e-7,0.0018370686,0.000008497237,0.0015132757,0.98843217,0.00006540362,0.007682315],"study_design_scores_gemma":[0.00013607477,0.000009107782,0.0020864403,0.00013843241,0.000013475042,0.0000075019475,0.0011372044,0.026103033,0.0029718415,0.9670845,0.00024038668,0.00007194929],"about_ca_topic_score_codex":0.000004650606,"about_ca_topic_score_gemma":0.000002242054,"teacher_disagreement_score":0.86815554,"about_ca_system_score_codex":0.000010473749,"about_ca_system_score_gemma":0.0000396187,"threshold_uncertainty_score":0.25613},"labels":[],"label_agreement":null},{"id":"W3003585707","doi":"10.1007/s00220-021-04224-6","title":"Tau-Functions and Monodromy Symplectomorphisms","year":2021,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University","funders":"Division of Mathematical Sciences; Natural Sciences and Engineering Research Council of Canada; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Scuola Internazionale Superiore di Studi Avanzati; National Science Foundation","keywords":"Monodromy; Symplectic geometry; Symplectomorphism; Pure mathematics; Mathematics; Symplectic manifold; Monodromy matrix; Manifold (fluid mechanics); Moment map; Hamiltonian (control theory); Mathematical analysis; Algebra over a field; Physics; Eigenvalues and eigenvectors; Quantum mechanics","score_opus":0.09801084659635731,"score_gpt":0.3486539472576811,"score_spread":0.2506431006613238,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3003585707","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.7565275,0.0039938623,0.19973299,0.0034899958,0.0012968895,0.0030973218,0.00009695286,0.0006659539,0.031098569],"genre_scores_gemma":[0.9398773,0.0003238383,0.05886755,0.000054153767,0.00010898516,0.00037155635,0.000100727084,0.00007425386,0.00022168126],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99797815,0.00026043577,0.0007104532,0.00046010432,0.00029851025,0.0002923262],"domain_scores_gemma":[0.9941536,0.0014861625,0.0002738599,0.003809913,0.00016845432,0.00010798611],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00030991135,0.00038064268,0.00077833206,0.000080604594,0.00021786129,0.00020079874,0.0011876469,0.00036211277,0.0000796342],"category_scores_gemma":[0.000510246,0.00038532313,0.00018837537,0.00029838597,0.00035736014,0.000109988134,0.003612334,0.0013899653,0.000014257667],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000022418508,0.00042650462,0.000053195352,0.0003653448,0.00008150506,0.0000019992694,0.0011550642,0.000038321446,0.000019480809,0.99657065,0.00029406906,0.0009916405],"study_design_scores_gemma":[0.00028524184,0.0000129165055,0.000056597488,0.0004975336,0.00012951378,0.000009290741,0.0004684493,0.008763805,0.000042699638,0.989295,0.00008312153,0.0003558278],"about_ca_topic_score_codex":0.000024410594,"about_ca_topic_score_gemma":0.000020532114,"teacher_disagreement_score":0.18334979,"about_ca_system_score_codex":0.0001443611,"about_ca_system_score_gemma":0.00016622178,"threshold_uncertainty_score":0.99985987},"labels":[],"label_agreement":null},{"id":"W3006783142","doi":"10.1007/s00220-021-03992-5","title":"Poisson-geometric Analogues of Kitaev Models","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Institut Périmètre de physique théorique; Studienstiftung des Deutschen Volkes; Friedrich-Alexander-Universität Erlangen-Nürnberg; Government of Canada","keywords":"Poisson distribution; Vertex (graph theory); Algorithm; Combinatorics; Mathematics; Graph; Statistics","score_opus":0.15601034057705812,"score_gpt":0.3682347426252823,"score_spread":0.21222440204822415,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3006783142","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.39266047,0.0035395268,0.47516116,0.0018141358,0.0003273779,0.0010093646,0.000052713283,0.00027397016,0.12516129],"genre_scores_gemma":[0.9186071,0.00015533346,0.08100575,0.000033092096,0.000030711428,0.00003181534,0.000015948533,0.000025571191,0.00009468632],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985253,0.00016263162,0.0006126912,0.00018840462,0.00030123602,0.00020973431],"domain_scores_gemma":[0.99550253,0.0016813965,0.0001828338,0.002321126,0.00025351843,0.00005857105],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00029655074,0.00015788198,0.00048000205,0.000099379795,0.00007792393,0.00002448446,0.00090368843,0.000101020305,0.000051685332],"category_scores_gemma":[0.00081952213,0.00015089978,0.00015040424,0.0012280963,0.00018990904,0.00015554138,0.00056274334,0.000290148,0.000012247921],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000023712955,0.00057146547,0.00004291514,0.00012191021,0.00003242166,0.0000010264234,0.00054460135,0.0000931684,0.000071223396,0.99714696,0.00013511705,0.0012368341],"study_design_scores_gemma":[0.000277171,0.000014404867,0.00004639247,0.00011769218,0.00003780462,0.0000033575495,0.00027434947,0.01149777,0.0011436348,0.98640525,0.000039169616,0.00014301727],"about_ca_topic_score_codex":0.0000064352457,"about_ca_topic_score_gemma":0.000005033121,"teacher_disagreement_score":0.5259466,"about_ca_system_score_codex":0.000056053686,"about_ca_system_score_gemma":0.00008418002,"threshold_uncertainty_score":0.61535144},"labels":[],"label_agreement":null},{"id":"W3006924576","doi":"10.1007/s00220-021-04061-7","title":"Asymptotic Symmetries in the BV-BFV Formalism","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":20,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Engineering and Physical Sciences Research Council; Institut Périmètre de physique théorique; National Centres of Competence in Research SwissMAP; Schweizerischer Nationalfonds zur Förderung der Wissenschaftlichen Forschung; National Science Foundation","keywords":"Noether's theorem; Homogeneous space; Symplectic geometry; Mathematical physics; Conservation law; Formalism (music); Gauge theory; Scalar field; Boundary value problem; Physics; Mathematics; Asymptotic expansion; Pure mathematics; Mathematical analysis; Geometry","score_opus":0.03296626249681955,"score_gpt":0.3066128943744894,"score_spread":0.27364663187766985,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3006924576","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.103547245,0.00050622347,0.1519163,0.010079679,0.00010665949,0.0008534731,0.00005461494,0.00007051793,0.7328653],"genre_scores_gemma":[0.9953989,0.000018160328,0.0039539253,0.00032106525,0.000077434575,0.000081677674,0.000060111273,0.000017689881,0.000071060356],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99873906,0.00024574244,0.00038198556,0.00016329168,0.0001952603,0.0002746655],"domain_scores_gemma":[0.99694073,0.0010861361,0.00006610376,0.0017719473,0.00009564527,0.000039421833],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003729056,0.000150865,0.00025912313,0.000029817915,0.00013831373,0.00009759218,0.0009929495,0.000039391947,0.00010191815],"category_scores_gemma":[0.0000734625,0.00011758643,0.00011872415,0.0008232594,0.00032718226,0.00016168153,0.00041399262,0.00051596283,0.00015177474],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000012883522,0.00080870406,0.0007200638,0.000021500244,0.000013044678,0.000001036476,0.0011307207,0.00002803271,0.000007786853,0.99302524,0.00011184912,0.0041307067],"study_design_scores_gemma":[0.0002659967,0.000008104512,0.0005602084,0.00007376063,0.000019071182,0.0000011283889,0.002018457,0.003113732,0.00023312269,0.9929482,0.0006195316,0.00013870893],"about_ca_topic_score_codex":0.000012187295,"about_ca_topic_score_gemma":0.000004975684,"teacher_disagreement_score":0.8918516,"about_ca_system_score_codex":0.00002536434,"about_ca_system_score_gemma":0.0000541925,"threshold_uncertainty_score":0.47950354},"labels":[],"label_agreement":null},{"id":"W3011552233","doi":"10.1007/s00220-020-03720-5","title":"Optimal Bounds on the Positivity of a Matrix from a Few Moments","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Matrix Theory and Algorithms","field":"Computer Science","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Austrian Science Fund","keywords":"Semidefinite programming; Hermitian matrix; Hilbert space; Orthonormal basis; Dimension (graph theory); Relaxation (psychology); Positive-definite matrix; Matrix (chemical analysis); Moment problem; Tensor (intrinsic definition)","score_opus":0.059788387105167345,"score_gpt":0.31956884567068317,"score_spread":0.2597804585655158,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3011552233","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.052428376,0.000098052056,0.92006564,0.015552121,0.000026549182,0.00033855508,0.000027139016,0.00008087795,0.011382717],"genre_scores_gemma":[0.8866337,0.0000130813205,0.11291989,0.00035680275,0.000020588981,0.000027956372,0.0000039742426,0.0000062809395,0.00001771468],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990194,0.0002568041,0.0002581449,0.0001527473,0.00019266675,0.000120250654],"domain_scores_gemma":[0.9966794,0.0014105008,0.00009973182,0.0017279838,0.000033883975,0.00004849058],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002978991,0.00009743161,0.0001897975,0.000016263317,0.00011113294,0.00006213788,0.0024815262,0.00003067914,0.00001840279],"category_scores_gemma":[0.0001501432,0.00007212156,0.00007090075,0.00042677877,0.00017793804,0.00015151843,0.0009225948,0.0002577223,0.00010177174],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004242013,0.0003344054,0.0000110199935,0.000014369074,0.0000135911305,5.416003e-7,0.0019614496,0.00016143724,0.0002829505,0.995319,0.00009669089,0.0018003203],"study_design_scores_gemma":[0.00013977854,0.000038900085,0.00006619074,0.000057204765,0.0000065326617,3.587271e-7,0.00008421652,0.32165432,0.0010149092,0.67674404,0.00011501359,0.000078538724],"about_ca_topic_score_codex":0.000004368402,"about_ca_topic_score_gemma":2.7006803e-7,"teacher_disagreement_score":0.8342053,"about_ca_system_score_codex":0.000019522538,"about_ca_system_score_gemma":0.000027566095,"threshold_uncertainty_score":0.46113345},"labels":[],"label_agreement":null},{"id":"W3012099713","doi":"10.1007/s00220-022-04380-3","title":"On the Classification of Topological Orders","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":175,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute; Dalhousie University","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Simons Foundation","keywords":"Triviality; Indecomposable module; Mathematics; Topological space; Manifold (fluid mechanics); Pure mathematics; Series (stratigraphy); Topology (electrical circuits); Invertible matrix; Topological algebra; Separable space; Combinatorics","score_opus":0.17097572038521658,"score_gpt":0.3706946378511608,"score_spread":0.19971891746594422,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3012099713","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9430619,0.00005840957,0.012313115,0.00726816,0.00014971703,0.0008851719,0.000011939788,0.00007897039,0.036172643],"genre_scores_gemma":[0.9962818,0.0000055570563,0.0032751653,0.00012971502,0.000012829656,0.00023323299,0.000004270399,0.00001301174,0.00004440288],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998747,0.00035535166,0.0003578677,0.00011879172,0.00029703087,0.00012399231],"domain_scores_gemma":[0.9946546,0.003413813,0.00016221429,0.0017078964,0.00004199323,0.000019516932],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005122417,0.000095394505,0.00019850869,0.00003039868,0.0002785733,0.000010022163,0.0012423599,0.00003435418,0.000299561],"category_scores_gemma":[0.0006601232,0.000067542795,0.000080558755,0.00036472225,0.0002701883,0.000027834305,0.00054896856,0.0004407089,0.000007987836],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000070869182,0.0004800839,0.000027614391,0.000012925063,0.000009696717,9.508101e-8,0.0005087696,0.000052220184,0.000045349178,0.99818414,0.00038718668,0.00028480665],"study_design_scores_gemma":[0.00014653265,0.00005031408,0.00015541563,0.000013305487,0.000010836913,9.2245915e-7,0.0007955728,0.0051413034,0.000038467584,0.99343765,0.00013848026,0.00007122892],"about_ca_topic_score_codex":0.0000032557166,"about_ca_topic_score_gemma":0.0000010226081,"teacher_disagreement_score":0.053219944,"about_ca_system_score_codex":0.000073900206,"about_ca_system_score_gemma":0.000031283183,"threshold_uncertainty_score":0.3279983},"labels":[],"label_agreement":null},{"id":"W3012875410","doi":"10.1007/s00220-023-04736-3","title":"On Asymptotic Stability of the Sine-Gordon Kink in the Energy Space","year":2023,"lang":"lv","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":16,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Universidad de Córdoba; Conselho Nacional de Desenvolvimento Científico e Tecnológico","keywords":"Stability (learning theory); Physics; Algorithm; Space (punctuation); Mathematical physics; Mathematics; Computer science; Machine learning","score_opus":0.10547005588674138,"score_gpt":0.35237754460588844,"score_spread":0.24690748871914706,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3012875410","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.45365354,0.0013035485,0.1943033,0.06417245,0.0010495281,0.015163629,0.0005227646,0.000993964,0.26883727],"genre_scores_gemma":[0.9903621,0.000197122,0.00840083,0.00028253312,0.000052547988,0.00038581126,0.000022630149,0.000113777096,0.00018265018],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9939562,0.0016828689,0.0018735385,0.00053908274,0.0011618523,0.0007864611],"domain_scores_gemma":[0.9689602,0.020895509,0.00074683543,0.009107006,0.00020316294,0.00008727881],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.002724609,0.0005922073,0.0011120733,0.00016075575,0.00031785574,0.00008134882,0.005128963,0.00026517254,0.000059367198],"category_scores_gemma":[0.0044860523,0.00039539195,0.00044536428,0.004073565,0.0016105147,0.00023037233,0.002043306,0.0015774914,0.00027508466],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000012703401,0.0039770016,0.00009279719,0.0009355717,0.000040445582,0.0000016253631,0.0061560133,0.0009892648,0.0003670857,0.985858,0.00054459664,0.0010248823],"study_design_scores_gemma":[0.0005540973,0.0000688791,0.00026105982,0.0014699387,0.00008906149,0.0000019316005,0.001690626,0.04421095,0.0010953114,0.950066,0.00013886909,0.00035328546],"about_ca_topic_score_codex":0.00002955648,"about_ca_topic_score_gemma":0.00007048426,"teacher_disagreement_score":0.53670853,"about_ca_system_score_codex":0.0003245445,"about_ca_system_score_gemma":0.00018021242,"threshold_uncertainty_score":0.9998498},"labels":[],"label_agreement":null},{"id":"W3021603590","doi":"10.1007/s00220-023-04735-4","title":"BFN Springer Theory","year":2023,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Advanced Algebra and Geometry","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Saskatchewan; McGill University; University of Toronto; Perimeter Institute","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Pure mathematics; Mathematics; Vector bundle; Affine variety; Grassmannian; Symplectic geometry; Tautological line bundle; Affine transformation; Affine space; Space (punctuation); Algebra over a field; Normal bundle; Frame bundle; Computer science","score_opus":0.2210315566669125,"score_gpt":0.42795774072390896,"score_spread":0.20692618405699648,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3021603590","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.026173176,0.0010197463,0.8972343,0.002602943,0.00062740565,0.0023311982,0.00012767031,0.0017221236,0.06816139],"genre_scores_gemma":[0.52561873,0.00081546523,0.46686164,0.00020349954,0.00038365272,0.0011525151,0.00017635654,0.00039670098,0.00439145],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99748063,0.0003595727,0.0008983301,0.0004648132,0.0003750848,0.00042156823],"domain_scores_gemma":[0.9873236,0.0057697548,0.00035113675,0.0063364105,0.00012409319,0.00009501006],"candidate_categories":["metaepi_narrow","insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0012634258,0.0004167872,0.00078916724,0.00019224662,0.00015485707,0.00007754565,0.0027873754,0.0003572387,0.00008470715],"category_scores_gemma":[0.0024728938,0.0004071412,0.00028530232,0.00059581513,0.0004274524,0.000102147984,0.005741889,0.0019237086,0.00089678366],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000040785026,0.0005779243,0.000050616796,0.00068858854,0.00006500474,0.0000029626772,0.0008314769,0.0001095069,0.000011071541,0.99341697,0.00058959756,0.0036521864],"study_design_scores_gemma":[0.0001683358,0.0000074774243,0.00008930476,0.00084296736,0.00007403036,0.0000013791558,0.00026212077,0.0039842427,0.00006041356,0.99384755,0.00026018286,0.0004019986],"about_ca_topic_score_codex":0.0000013955004,"about_ca_topic_score_gemma":0.000008087557,"teacher_disagreement_score":0.49944553,"about_ca_system_score_codex":0.0001593691,"about_ca_system_score_gemma":0.00009409272,"threshold_uncertainty_score":0.99988115},"labels":[],"label_agreement":null},{"id":"W3043834968","doi":"10.1007/s00220-021-04097-9","title":"On Ribbon Categories for Singlet Vertex Algebras","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":27,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada","keywords":"Subcategory; Vertex operator algebra; Ribbon; Operator algebra; Vertex (graph theory); Tensor product; Operator (biology); Projective test","score_opus":0.10081416444357329,"score_gpt":0.3664126730818993,"score_spread":0.265598508638326,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3043834968","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.4703466,0.0011084753,0.41543394,0.009635527,0.0015590035,0.0033395372,0.000077933924,0.0007206839,0.0977783],"genre_scores_gemma":[0.9449039,0.00002560149,0.05431026,0.00022164776,0.00006377457,0.0001952534,0.00003198575,0.000046334666,0.00020120805],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987402,0.00011791714,0.0004300795,0.00023596294,0.00021781979,0.00025804402],"domain_scores_gemma":[0.99393874,0.0036241116,0.000110448986,0.0020923908,0.00017532823,0.000058957095],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00023152599,0.00019168883,0.00038064222,0.00003362665,0.00020960264,0.00006583514,0.00070923264,0.00011159643,0.00004825826],"category_scores_gemma":[0.0016147078,0.00018108009,0.00014360086,0.00030233528,0.00012880951,0.00009020595,0.00030472904,0.00028640477,0.00003010489],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00000985006,0.00058092765,0.0000064283436,0.00010471721,0.00002648534,8.203303e-7,0.00063556846,0.000011974126,0.00007396133,0.9963279,0.00093960995,0.0012817765],"study_design_scores_gemma":[0.0005161756,0.00004120041,0.000010438429,0.000120628334,0.00003664883,0.0000027780093,0.0002251678,0.003566927,0.001284658,0.9935291,0.00047105228,0.0001952375],"about_ca_topic_score_codex":0.0000018716983,"about_ca_topic_score_gemma":0.000006694732,"teacher_disagreement_score":0.47455734,"about_ca_system_score_codex":0.000095035626,"about_ca_system_score_gemma":0.000092067894,"threshold_uncertainty_score":0.73842317},"labels":[],"label_agreement":null},{"id":"W3044842406","doi":"10.1007/s00220-020-03819-9","title":"Hodge and Prym Tau Functions, Strebel Differentials and Combinatorial Model of $${\\mathcal {M}}_{g,n}$$","year":2020,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic Geometry and Number Theory","field":"Mathematics","cited_by":6,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University","funders":"Fonds Québécois de la Recherche sur la Nature et les Technologies; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada","keywords":"Moduli space; Mathematics; Symplectic geometry; Pure mathematics; Section (typography); Integrable system; Phase space; Riemann surface; Line bundle; Boundary (topology); Vector bundle; Mathematical analysis; Physics","score_opus":0.11228500171963535,"score_gpt":0.33029049493445223,"score_spread":0.21800549321481688,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3044842406","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.82189137,0.00031984565,0.17099135,0.0017512689,0.000052380827,0.0006325851,0.000056971552,0.000109395885,0.004194844],"genre_scores_gemma":[0.9759377,0.00008761743,0.02376734,0.0000578276,0.00003813602,0.0000365727,0.0000128577185,0.000024974936,0.000036928195],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987179,0.00017751449,0.00054192636,0.00020340903,0.00019123928,0.00016801243],"domain_scores_gemma":[0.9973233,0.0014359716,0.0001735241,0.0008817375,0.00006778517,0.00011772484],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0003681169,0.0001715676,0.0004778673,0.00004109848,0.00011937286,0.00002643509,0.00042988043,0.000106572894,0.000022730046],"category_scores_gemma":[0.00075642864,0.00016640034,0.000061348714,0.00024739475,0.00047643707,0.00013901289,0.00064325443,0.00033258012,0.000009821618],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000020621126,0.00054935634,0.00021726849,0.00038988257,0.000035288554,2.1449654e-7,0.0019626014,0.000008112111,0.0005218259,0.99450594,0.00014260036,0.0016462972],"study_design_scores_gemma":[0.0006033234,0.000043541473,0.00010365353,0.00007317894,0.0000707387,0.0000018008336,0.0005311705,0.052624546,0.00037189148,0.9454113,0.000016618575,0.00014819962],"about_ca_topic_score_codex":0.0000017276469,"about_ca_topic_score_gemma":8.2917103e-7,"teacher_disagreement_score":0.15404639,"about_ca_system_score_codex":0.00001540581,"about_ca_system_score_gemma":0.000030336429,"threshold_uncertainty_score":0.6785609},"labels":[],"label_agreement":null},{"id":"W3059166463","doi":"10.1007/s00220-021-04255-z","title":"Expansions in the Local and the Central Limit Theorems for Dynamical Systems","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":19,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Agence Nationale de la Recherche","keywords":"Dynamical systems theory; Limit (mathematics); Observable; Moment (physics); Chaotic; Central limit theorem; Complex system; Matrix (chemical analysis); Order (exchange)","score_opus":0.07759656411030874,"score_gpt":0.350431124910719,"score_spread":0.27283456080041024,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3059166463","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.023349635,0.00085254567,0.9461019,0.011128227,0.00008257401,0.0024017543,0.000050315804,0.000055873978,0.01597714],"genre_scores_gemma":[0.9701443,0.00018935412,0.028539432,0.0002325188,0.000036941383,0.0006959632,0.000026363887,0.00003308074,0.00010206789],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9976468,0.0006925988,0.0007626022,0.00023176633,0.000283955,0.00038229534],"domain_scores_gemma":[0.98102105,0.01658435,0.00013438813,0.0020935945,0.00010459105,0.000062042964],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.001823064,0.000207048,0.00053403387,0.000033115473,0.00024452395,0.00015544718,0.0010905984,0.00011823112,0.000011504935],"category_scores_gemma":[0.0022197159,0.000118795775,0.00015949496,0.00039776682,0.001029623,0.00008840416,0.000428211,0.00052105245,0.000008411107],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000013868569,0.00071694853,0.000021382863,0.00023293095,0.000021011072,0.0000019696977,0.0034893076,0.00003847452,0.000011424124,0.9942241,0.000120196266,0.0011083937],"study_design_scores_gemma":[0.0006295322,0.000008261385,0.00004465207,0.00015681254,0.000037601065,0.00001625181,0.0038168977,0.36214036,0.0000030292786,0.63290614,0.00014404432,0.00009639706],"about_ca_topic_score_codex":0.000012962037,"about_ca_topic_score_gemma":0.00008406064,"teacher_disagreement_score":0.9467946,"about_ca_system_score_codex":0.00006282385,"about_ca_system_score_gemma":0.00005984467,"threshold_uncertainty_score":0.4844351},"labels":[],"label_agreement":null},{"id":"W3096202469","doi":"10.1007/s00220-021-04104-z","title":"Intermittent Synchronization in Finite-State Random Networks Under Markov Perturbations","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Dynamics and Pattern Formation","field":"Computer Science","cited_by":2,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; National Natural Science Foundation of China; Pacific Institute for the Mathematical Sciences; National Science Foundation","keywords":"Ergodicity; Randomness; Mathematics; Markov chain; Perturbation (astronomy); Statistical physics; Uniqueness; Markov process; Probability distribution; Discrete mathematics; Applied mathematics; Mathematical analysis; Physics; Statistics; Quantum mechanics","score_opus":0.027782563657496102,"score_gpt":0.2820645556284096,"score_spread":0.2542819919709135,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3096202469","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.002782271,0.0001357132,0.99249333,0.0017971471,0.00006132817,0.00017014763,0.000003349072,0.000041574574,0.0025151125],"genre_scores_gemma":[0.9224003,0.00024305146,0.07671668,0.00032931953,0.000017700184,0.00004896769,0.0001160463,0.000011304699,0.000116657655],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9988452,0.00021677607,0.00044526535,0.00017507534,0.0001407715,0.00017691961],"domain_scores_gemma":[0.9975331,0.0007743955,0.00009535841,0.0014425484,0.000116725925,0.000037887745],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00031729965,0.00011043095,0.00018073745,0.00007369027,0.00009419314,0.00014390564,0.0009030291,0.00005055193,0.000013229859],"category_scores_gemma":[0.00013496813,0.000112790716,0.000055932003,0.000774931,0.000051396517,0.00039815926,0.00059978914,0.00029407852,0.00004037653],"study_design_candidate":"simulation_or_modeling","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000046422933,0.0010328975,0.0008085014,0.000068532194,0.000020157473,0.000008361297,0.002579825,0.18084517,0.000022616772,0.7307654,0.00006015787,0.083783746],"study_design_scores_gemma":[0.00036050205,0.000004847563,0.0007983406,0.000103321836,0.0000029207683,0.0000039552,0.000044219665,0.7962111,0.000008174731,0.20231564,0.000050517632,0.000096432654],"about_ca_topic_score_codex":0.0000044494136,"about_ca_topic_score_gemma":0.000076263124,"teacher_disagreement_score":0.919618,"about_ca_system_score_codex":0.000117215524,"about_ca_system_score_gemma":0.0000682577,"threshold_uncertainty_score":0.45994717},"labels":[],"label_agreement":null},{"id":"W3101849162","doi":"10.1007/s00220-015-2501-y","title":"Conductance and Absolutely Continuous Spectrum of 1D Samples","year":2015,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":4,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Agence Nationale de la Recherche","keywords":"Conductance; Conjecture; Absolute continuity; Limit (mathematics); Spectrum (functional analysis); Interval (graph theory); Limiting; Quantum; Charge (physics)","score_opus":0.26113996907412135,"score_gpt":0.3975797572361809,"score_spread":0.13643978816205954,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3101849162","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6613691,0.0011776886,0.17468004,0.0030511566,0.00015874539,0.0022063006,0.00008064665,0.00046761974,0.1568087],"genre_scores_gemma":[0.78436357,0.00005322957,0.21529998,0.000042679836,0.000046630106,0.000052593354,0.0000055022683,0.0000463802,0.000089438574],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.997932,0.00024103819,0.0008608238,0.00025968996,0.00036844675,0.00033796785],"domain_scores_gemma":[0.99351794,0.0036129663,0.00031739307,0.002240165,0.00015237635,0.00015914776],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0010281526,0.0002652877,0.00078032597,0.000070202856,0.000069926384,0.000036849306,0.0010845903,0.00010373955,0.00003346555],"category_scores_gemma":[0.0022989651,0.0002455845,0.000100589015,0.00046614313,0.0010178766,0.00022303323,0.0005546384,0.00041108768,0.00005500365],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000012521875,0.0007689507,0.00016098753,0.00021225266,0.00003148239,0.0000011021625,0.0018991239,0.0000048096676,0.00037400896,0.99570155,0.00022523773,0.0006079778],"study_design_scores_gemma":[0.00053623674,0.000064525324,0.00008594064,0.00023630803,0.000046889858,0.000010864292,0.0008865496,0.0025977234,0.0013350727,0.99383813,0.000115965966,0.00024579422],"about_ca_topic_score_codex":0.000008660701,"about_ca_topic_score_gemma":0.000011950055,"teacher_disagreement_score":0.15671927,"about_ca_system_score_codex":0.000085918626,"about_ca_system_score_gemma":0.00006887407,"threshold_uncertainty_score":0.99999964},"labels":[],"label_agreement":null},{"id":"W3105094658","doi":"10.1007/s00220-022-04486-8","title":"An Inverse Problem for the Relativistic Boltzmann Equation","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Gas Dynamics and Kinetic Theory","field":"Mathematics","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Calgary","funders":"Academy of Finland; Helsingin Yliopisto","keywords":"Complex system; Boltzmann equation; Physics; Inverse; Boltzmann constant; Mathematical physics; Mathematics; Classical mechanics; Applied mathematics; Quantum mechanics; Computer science","score_opus":0.1296412090662323,"score_gpt":0.36911148854743603,"score_spread":0.23947027948120372,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3105094658","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0064863977,0.000084950414,0.9795254,0.0023305567,0.000065657594,0.0019076423,0.000047881527,0.00011610188,0.009435433],"genre_scores_gemma":[0.7922987,0.000014531507,0.20548967,0.00012492803,0.00003235435,0.0015320219,0.000054240278,0.000042523963,0.00041106672],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998679,0.0003286921,0.000412431,0.00016336262,0.00022078482,0.00019573013],"domain_scores_gemma":[0.99330294,0.0043157786,0.00017072233,0.002102754,0.00007007976,0.00003773422],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0014914556,0.00012665514,0.00019549337,0.00004279402,0.0006277387,0.00004037297,0.0013066501,0.000032462387,0.00005695283],"category_scores_gemma":[0.00046941367,0.00010418495,0.000083057435,0.00030228958,0.00019611602,0.0000929288,0.00045471665,0.0003959896,0.000012231104],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008534815,0.0007387732,0.000015197792,0.00005359057,0.000016604117,1.4547298e-7,0.0022335881,0.0021554644,0.000039854796,0.9919226,0.00032613202,0.0024895186],"study_design_scores_gemma":[0.00018754732,0.000042055308,0.000016284346,0.0000147735645,0.000033754175,0.0000013374213,0.00068881555,0.39625382,0.000002758563,0.60217726,0.0005054296,0.00007615756],"about_ca_topic_score_codex":0.000003291368,"about_ca_topic_score_gemma":0.000010085714,"teacher_disagreement_score":0.78581226,"about_ca_system_score_codex":0.00011904719,"about_ca_system_score_gemma":0.000047362086,"threshold_uncertainty_score":0.48281223},"labels":[],"label_agreement":null},{"id":"W3112417171","doi":"10.1007/s00220-021-04191-y","title":"Boundary Topological Entanglement Entropy in Two and Three Dimensions","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum many-body systems","field":"Physics and Astronomy","cited_by":4,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Engineering and Physical Sciences Research Council; Institut Périmètre de physique théorique; Industry Canada; Australian Research Council; Ministry of Colleges and Universities; University of Sydney; Government of Canada","keywords":"Topological entropy in physics; Quantum entanglement; Topological entropy; Mathematical proof; Topological algebra; Topological quantum number; Conjecture; Symmetry protected topological order; Entropy (arrow of time); Joint quantum entropy","score_opus":0.04832991043377481,"score_gpt":0.3483420815572744,"score_spread":0.3000121711234996,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3112417171","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9521127,0.00061384373,0.021804826,0.0019340677,0.000070469105,0.0004894444,0.000024672143,0.000039278784,0.022910744],"genre_scores_gemma":[0.98888934,0.000018313274,0.010770596,0.00005395357,0.000051759187,0.000108428125,0.00004118388,0.000013037931,0.000053411564],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988358,0.00018614667,0.0004104446,0.00020586788,0.00013714831,0.00022461053],"domain_scores_gemma":[0.99813026,0.0004898852,0.00007044709,0.0012057404,0.000044294273,0.000059378275],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00023732091,0.00013433985,0.00028315734,0.000033294084,0.00013204887,0.000063275074,0.00036850446,0.00002439652,0.00018823687],"category_scores_gemma":[0.000034461136,0.0001272723,0.000057539994,0.00027175885,0.00025789914,0.00009672122,0.00068447465,0.0003137019,0.000069801594],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000015242223,0.0007115523,0.027788177,0.000015694079,0.000015538175,0.000002461891,0.0004200138,0.00001677527,0.0005042357,0.96920854,0.000034914832,0.0012805577],"study_design_scores_gemma":[0.0005470401,0.000010957465,0.0041286857,0.00011056073,0.000014368025,0.00000215061,0.0009111248,0.024709297,0.00019017071,0.9686204,0.0006071597,0.00014806677],"about_ca_topic_score_codex":0.000050421422,"about_ca_topic_score_gemma":0.00006801485,"teacher_disagreement_score":0.036776666,"about_ca_system_score_codex":0.0000545612,"about_ca_system_score_gemma":0.00005766154,"threshold_uncertainty_score":0.5190014},"labels":[],"label_agreement":null},{"id":"W3119569868","doi":"10.1007/s00220-020-03904-z","title":"Correction to: The Dependence on the Monodromy Data of the Isomonodromic Tau Function","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Concordia University","funders":"","keywords":"Monodromy; Complex system; Function (biology); Mathematics; Pure mathematics; Statistical physics; Physics; Computer science; Artificial intelligence; Biology; Evolutionary biology","score_opus":0.16873485000634217,"score_gpt":0.37540641071950304,"score_spread":0.20667156071316087,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3119569868","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.1571411,0.00082710374,0.6126699,0.1155011,0.0016237267,0.006966588,0.00025895494,0.00027463443,0.10473687],"genre_scores_gemma":[0.99129623,0.000100206635,0.007210281,0.00036807632,0.00006181035,0.00024038745,0.000019037654,0.000022857434,0.00068112],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985448,0.0003550589,0.0004516522,0.00021657805,0.00028467592,0.00014724689],"domain_scores_gemma":[0.98649037,0.0061457898,0.0002116726,0.0070058163,0.0001193317,0.000026992533],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0008177875,0.00012759645,0.00020158546,0.000019414449,0.00042923156,0.000059037207,0.0029291718,0.000042767297,0.00004480599],"category_scores_gemma":[0.0020620811,0.00006755199,0.000093692535,0.0008780133,0.00017716108,0.00009633613,0.0013038829,0.00045462756,0.00010772169],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008878959,0.0006294034,0.000052157924,0.00003751837,0.00003157894,8.786622e-8,0.00067376863,0.00025451538,0.00035141307,0.9706641,0.02381804,0.003478529],"study_design_scores_gemma":[0.00022784356,0.000017153856,0.00067564007,0.00025853975,0.00010659918,0.0000063921425,0.0010558172,0.054994028,0.0011366963,0.9371273,0.004269133,0.00012484705],"about_ca_topic_score_codex":0.000018685107,"about_ca_topic_score_gemma":0.00016861406,"teacher_disagreement_score":0.83415514,"about_ca_system_score_codex":0.00004794828,"about_ca_system_score_gemma":0.00009517938,"threshold_uncertainty_score":0.5443179},"labels":[],"label_agreement":null},{"id":"W3122608403","doi":"10.1007/s00220-021-04148-1","title":"Dimerization in Quantum Spin Chains with O(n) Symmetry","year":2021,"lang":"lv","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum many-body systems","field":"Physics and Astronomy","cited_by":3,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Division of Mathematical Sciences; Vetenskapsrådet; Centre de Recherches Mathématiques; Simons Foundation; National Science Foundation","keywords":"Phase diagram; Algorithm; Phase (matter); Physics; Computer science; Quantum mechanics","score_opus":0.03869297613662313,"score_gpt":0.3129117869581084,"score_spread":0.27421881082148525,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3122608403","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6423264,0.002216859,0.29144776,0.0056282524,0.00037143694,0.0024714726,0.00018308261,0.0001545233,0.05520023],"genre_scores_gemma":[0.99217993,0.00009229412,0.006500779,0.0000672095,0.00015406724,0.00020230323,0.0003151626,0.00008524302,0.00040299914],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99686736,0.00066908513,0.0010500589,0.0004944374,0.00038370595,0.0005353575],"domain_scores_gemma":[0.99498737,0.00076156575,0.00035409757,0.0035711632,0.00020394669,0.000121850244],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0005093208,0.0004045808,0.00078450056,0.00013954543,0.00019854074,0.00018149696,0.0011449464,0.00014204509,0.00009536186],"category_scores_gemma":[0.0001109019,0.00041347355,0.00014154054,0.0019964601,0.00039950444,0.00032408955,0.0007018242,0.00091984356,0.00047780457],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009163201,0.0026817154,0.00743945,0.00030388276,0.000074864016,0.0000074732156,0.0019530306,0.00039109407,0.0004989246,0.98429704,0.000054295957,0.0022890752],"study_design_scores_gemma":[0.0014723551,0.000082153034,0.0038160188,0.0027488475,0.0001030594,0.000005996225,0.0058441553,0.6483875,0.00064663106,0.3351968,0.00091736164,0.00077911123],"about_ca_topic_score_codex":0.000081903345,"about_ca_topic_score_gemma":0.00006779484,"teacher_disagreement_score":0.64910024,"about_ca_system_score_codex":0.00019611933,"about_ca_system_score_gemma":0.00037214058,"threshold_uncertainty_score":0.99983174},"labels":[],"label_agreement":null},{"id":"W3134208151","doi":"10.1007/s00220-025-05467-3","title":"Entropy of Logarithmic Modes","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Dalhousie University","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Semiclassical physics; Logarithm; Ergodic theory; Geodesic; Riemannian manifold; Entropy (arrow of time); Upper and lower bounds; Mathematics; Laplace operator; Lambda; Laplace transform; Mathematical physics; Combinatorics; Physics; Pure mathematics; Mathematical analysis; Quantum mechanics; Quantum","score_opus":0.08237109399816858,"score_gpt":0.3966801314885861,"score_spread":0.3143090374904175,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3134208151","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.040789813,0.00023337142,0.6878772,0.0015540626,0.000044327277,0.0009604559,0.000026830005,0.00012889926,0.26838505],"genre_scores_gemma":[0.79521203,0.000063512314,0.20412783,0.000049014638,0.000007990507,0.00007669442,0.000006424625,0.000016733029,0.00043978536],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985417,0.00012281867,0.0007734996,0.0001619676,0.00018925496,0.00021075674],"domain_scores_gemma":[0.99495417,0.0026189743,0.00017311891,0.0020960616,0.000118341406,0.00003935462],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005105637,0.00016172104,0.0005079012,0.000112067195,0.00007009353,0.00002226055,0.0010946383,0.000098607765,0.000060586415],"category_scores_gemma":[0.0010690824,0.0001454392,0.00013468403,0.00052925304,0.00036694793,0.00008784458,0.00051546417,0.00029700482,0.00002811628],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004251535,0.0011194524,0.00008645255,0.0004548724,0.00003224651,3.0803818e-7,0.00019804692,0.000012798168,0.00052064925,0.9953386,0.00019631612,0.0020359596],"study_design_scores_gemma":[0.0002465488,0.000010201678,0.000041933337,0.000350532,0.00003555703,6.404229e-7,0.0001233641,0.115945205,0.00044198395,0.8825829,0.00011891557,0.000102204234],"about_ca_topic_score_codex":0.0000038846624,"about_ca_topic_score_gemma":0.000004987592,"teacher_disagreement_score":0.7544222,"about_ca_system_score_codex":0.000059712682,"about_ca_system_score_gemma":0.000053201482,"threshold_uncertainty_score":0.59308386},"labels":[],"label_agreement":null},{"id":"W3147886342","doi":"10.1007/s00220-021-04014-0","title":"Correction to: Thermalization and Canonical Typicality in Translation-Invariant Quantum Lattice Systems","year":2021,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum many-body systems","field":"Physics and Astronomy","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Quantum; Translation (biology); Complex system; Invariant (physics); Lattice (music); Thermalisation; Mathematics; Pure mathematics; Theoretical physics; Physics; Mathematical physics; Quantum mechanics; Computer science; Artificial intelligence","score_opus":0.054462611586069486,"score_gpt":0.32320434176784996,"score_spread":0.2687417301817805,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3147886342","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.3247818,0.0006997172,0.6224178,0.0026815545,0.0007348336,0.001618491,0.000054234028,0.00011620714,0.046895377],"genre_scores_gemma":[0.9962898,0.000010499455,0.0032799237,0.00003439375,0.000072326424,0.00013640885,0.000059572783,0.000020239739,0.00009687125],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9983455,0.00048364056,0.00056524784,0.00024404311,0.00016276365,0.00019883593],"domain_scores_gemma":[0.9976211,0.0010848764,0.00009345209,0.00102076,0.00010255228,0.000077238336],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004858246,0.00014130276,0.0003110143,0.00005078546,0.00010600971,0.00009720407,0.00029569893,0.000052230997,0.00003474798],"category_scores_gemma":[0.00012049214,0.00014647211,0.000045788984,0.00059498264,0.00008975846,0.00015827968,0.0001515462,0.000306589,0.000054228283],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000055607898,0.00050030375,0.008224041,0.00006530644,0.00001661964,8.6687567e-7,0.0012741046,0.000805563,0.00033660472,0.9866435,0.000093300194,0.0020342532],"study_design_scores_gemma":[0.00045217676,0.000015604066,0.0071226987,0.0004365913,0.000026504062,0.0000036928711,0.0013382798,0.8654929,0.00011625323,0.12413236,0.0006202417,0.00024273056],"about_ca_topic_score_codex":0.00031799453,"about_ca_topic_score_gemma":0.00011276602,"teacher_disagreement_score":0.8646873,"about_ca_system_score_codex":0.000069878406,"about_ca_system_score_gemma":0.000112825954,"threshold_uncertainty_score":0.59729594},"labels":[],"label_agreement":null},{"id":"W3177726380","doi":"10.1007/s00220-023-04800-y","title":"Characteristic Gluing to the Kerr Family and Application to Spacelike Gluing","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Corollary; Spacetime; Angular momentum; Einstein; Mathematical physics; Physics; Series (stratigraphy); Kerr metric; Classical mechanics; Mathematics; Mathematical analysis; Quantum mechanics; Pure mathematics; Schwarzschild radius","score_opus":0.025168662613123987,"score_gpt":0.30616545304837917,"score_spread":0.28099679043525516,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3177726380","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.2874472,0.000033712928,0.6821708,0.009367031,0.00005547769,0.0012105735,0.000050476003,0.00014546799,0.019519202],"genre_scores_gemma":[0.9951737,0.000009036544,0.0038804223,0.00032246864,0.00013401677,0.00032920402,0.000045240038,0.00003021967,0.00007566992],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989722,0.000078147394,0.00028744532,0.00022764689,0.00015433751,0.00028026587],"domain_scores_gemma":[0.99780303,0.0005193903,0.00007131706,0.0014326045,0.00005509132,0.00011856266],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.00035000592,0.00015573794,0.00022130358,0.000046417805,0.00025960332,0.000095739044,0.00072936603,0.000028182232,0.0000098439305],"category_scores_gemma":[0.000050265407,0.00012748002,0.000054123862,0.00084799854,0.00013985949,0.000074967946,0.0008070717,0.0002664274,0.0009795391],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000002802367,0.000101444915,0.00018909124,0.000016598293,0.00001055568,8.3966476e-8,0.0014259234,0.0001804791,0.0005112424,0.96977293,0.00025103366,0.027537819],"study_design_scores_gemma":[0.000111192174,0.000015139962,0.0034484447,0.00008767897,0.000018639701,1.7127142e-7,0.0009433531,0.027740754,0.0001007471,0.9648218,0.0025332663,0.00017880349],"about_ca_topic_score_codex":0.000018939196,"about_ca_topic_score_gemma":0.000002033826,"teacher_disagreement_score":0.7077265,"about_ca_system_score_codex":0.000024891122,"about_ca_system_score_gemma":0.00001563581,"threshold_uncertainty_score":0.9997983},"labels":[],"label_agreement":null},{"id":"W3188425136","doi":"10.1007/s00220-022-04515-6","title":"Quiver Symmetries and Wall-Crossing Invariance","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Concordia University","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; National Centres of Competence in Research SwissMAP","keywords":"Quiver; Homogeneous space; Invariant (physics); Affine transformation; Coulomb; Physics; Pure mathematics; Lattice (music); Spectrum (functional analysis); Mathematical physics; Mathematics; Geometry; Quantum mechanics","score_opus":0.03283706580078881,"score_gpt":0.29657217488856613,"score_spread":0.2637351090877773,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3188425136","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.33824036,0.00090224214,0.28987387,0.0071805995,0.00015436436,0.0013267639,0.0001782154,0.00019340847,0.3619502],"genre_scores_gemma":[0.99336344,0.0000054318994,0.00617999,0.00017229811,0.000034628858,0.00006973171,0.000026843827,0.000019292007,0.0001283339],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99910915,0.00013233251,0.00024325316,0.00016690203,0.00015169263,0.00019667386],"domain_scores_gemma":[0.99847865,0.00043887427,0.000073637144,0.0009182238,0.000039136925,0.00005148596],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002465548,0.000119954064,0.000205241,0.000028601093,0.00057776005,0.000105274295,0.00057682494,0.000015294878,0.0002042971],"category_scores_gemma":[0.00002001024,0.00012409053,0.000054065225,0.0003877056,0.0005949083,0.00013065449,0.0011040026,0.0004360347,0.0000358006],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000031956845,0.0003712589,0.0008670172,0.000013359968,0.000014862158,2.0296886e-7,0.0009122256,0.000053658303,0.000019725967,0.9918061,0.00008955061,0.0058488604],"study_design_scores_gemma":[0.00023823856,0.000014796275,0.00020880475,0.000020391406,0.000014813825,6.136187e-7,0.000790637,0.008783334,0.000062199615,0.98822916,0.0014951836,0.00014185302],"about_ca_topic_score_codex":0.000023461289,"about_ca_topic_score_gemma":5.6095314e-7,"teacher_disagreement_score":0.6551231,"about_ca_system_score_codex":0.000036309208,"about_ca_system_score_gemma":0.00003949414,"threshold_uncertainty_score":0.50602645},"labels":[],"label_agreement":null},{"id":"W3194259926","doi":"10.1007/s00220-022-04357-2","title":"Approximate Petz Recovery from the Geometry of Density Operators","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Air Force Office of Scientific Research; Canadian Institute for Advanced Research; Simons Foundation","keywords":"Mathematics; Hilbert space; Quantum relative entropy; Hermitian matrix; Quadratic equation; Upper and lower bounds; Inverse; Entropy (arrow of time); Dimension (graph theory); Quantum; Pure mathematics; Mathematical analysis; Geometry; Quantum entanglement; Quantum mechanics; Quantum discord; Physics","score_opus":0.035296050221159905,"score_gpt":0.2732877988761574,"score_spread":0.2379917486549975,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3194259926","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.1532194,0.00023447078,0.8349088,0.0022303767,0.000104858686,0.0003517197,0.000035749214,0.000097520395,0.008817148],"genre_scores_gemma":[0.9302556,0.000040957624,0.06909865,0.0004908358,0.000007644509,0.00007381013,0.000019210302,0.0000055062483,0.0000077918885],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99890065,0.00023196342,0.00036641763,0.000108406646,0.00027359178,0.00011898633],"domain_scores_gemma":[0.99656564,0.00077899883,0.000142048,0.0024315726,0.000055201792,0.000026564705],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005598346,0.00008092572,0.00016027871,0.000056481516,0.00032812412,0.00005735616,0.003051159,0.000019102386,0.00004747002],"category_scores_gemma":[0.000084412655,0.00006527665,0.000088618304,0.0010776379,0.00015868622,0.0002942643,0.00196124,0.00032373698,0.000026926158],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000017732033,0.00026564463,0.00035302294,0.000009614872,0.000013729044,1.4098241e-7,0.0020304148,0.00026786566,0.000049855138,0.9917301,0.00039312278,0.004884699],"study_design_scores_gemma":[0.00015878049,0.000021554748,0.0009414889,0.000017088898,0.000006716431,0.0000018325519,0.0008958517,0.19155473,0.00028201102,0.8051279,0.00088279106,0.00010922399],"about_ca_topic_score_codex":0.00001622441,"about_ca_topic_score_gemma":0.000002315825,"teacher_disagreement_score":0.7770362,"about_ca_system_score_codex":0.000035005138,"about_ca_system_score_gemma":0.00004379872,"threshold_uncertainty_score":0.5669863},"labels":[],"label_agreement":null},{"id":"W3198122084","doi":"10.1007/s00220-022-04416-8","title":"On Lieb–Robinson Bounds for the Bose–Hubbard Model","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Cold Atom Physics and Bose-Einstein Condensates","field":"Physics and Astronomy","cited_by":29,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Bose–Hubbard model; Mathematical proof; Physics; Observable; Upper and lower bounds; Scattering; Hubbard model; Range (aeronautics); Bound state; Mathematical physics; Quantum mechanics; Mathematics; Superconductivity; Mathematical analysis; Geometry","score_opus":0.059034913624758004,"score_gpt":0.3244027160834787,"score_spread":0.2653678024587207,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3198122084","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.21094331,0.0007139624,0.593598,0.017221423,0.00046389143,0.005955827,0.0010441154,0.00031294185,0.1697465],"genre_scores_gemma":[0.9941777,0.0000055586233,0.003434676,0.00026616437,0.00007978668,0.0013734744,0.000070937,0.00003448769,0.0005571964],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99892765,0.00008311491,0.0003087651,0.00020474468,0.00022427163,0.00025147537],"domain_scores_gemma":[0.99633133,0.0016537097,0.00011427427,0.0018115265,0.000050119997,0.000039059243],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00034815242,0.00017042732,0.00022712426,0.00003149448,0.00092856376,0.00008616209,0.0013634854,0.0000184179,0.00012458052],"category_scores_gemma":[0.000017888286,0.00014045749,0.00018838095,0.00029373227,0.000148732,0.00007649784,0.0007299129,0.00045436335,0.000033072585],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009196697,0.00078839605,0.000038366816,0.000011185619,0.00003752515,5.076387e-8,0.0005770585,0.021758888,0.00011911227,0.9655518,0.0016392181,0.009469215],"study_design_scores_gemma":[0.00025521097,0.000028212515,0.0000072786997,0.000012688313,0.00002229397,1.0058747e-7,0.0003250668,0.34041193,0.00010439568,0.65446335,0.0042518177,0.00011767198],"about_ca_topic_score_codex":0.000012331033,"about_ca_topic_score_gemma":0.000002195967,"teacher_disagreement_score":0.7832344,"about_ca_system_score_codex":0.00007938214,"about_ca_system_score_gemma":0.00007830254,"threshold_uncertainty_score":0.71418554},"labels":[],"label_agreement":null},{"id":"W3201040871","doi":"10.1007/s00220-022-04540-5","title":"Gradient Flows, Adjoint Orbits, and the Topology of Totally Nonnegative Flag Varieties","year":2022,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Air Force Office of Scientific Research; Natural Sciences and Engineering Research Council of Canada; National Science Foundation","keywords":"Flag (linear algebra); Mathematics; Orbit (dynamics); Isospectral; Context (archaeology); Blowing up; Generalized flag variety; Type (biology); Geodesic; Combinatorics; Pure mathematics; Metric (unit); Topology (electrical circuits); Lie group; Mathematical analysis; Algebra over a field","score_opus":0.034650725470998546,"score_gpt":0.31724363963063973,"score_spread":0.28259291415964116,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3201040871","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.28057456,0.0043042344,0.16165659,0.01760208,0.0009152827,0.0066209915,0.0018372594,0.00014833518,0.52634066],"genre_scores_gemma":[0.9785184,0.00013146202,0.020487877,0.00003846399,0.000095059564,0.00032296762,0.00017681289,0.00002553,0.00020341069],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984288,0.00043634468,0.00056689914,0.00022594733,0.00015686617,0.00018511177],"domain_scores_gemma":[0.9962604,0.0012533143,0.00028642072,0.0020752891,0.000083764004,0.000040782634],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004895843,0.00021460635,0.0005917205,0.000037519487,0.00022248313,0.000038329454,0.001084979,0.00006511039,0.00021552469],"category_scores_gemma":[0.000055482462,0.0001642198,0.00019947666,0.0001454531,0.0010634817,0.000034901313,0.0040200986,0.0010737568,0.000006238057],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000011472581,0.00042883458,0.00007365221,0.00008847874,0.000105875966,1.5222533e-7,0.005456354,0.00062670355,0.0000045716447,0.99196005,0.000047057485,0.0011967777],"study_design_scores_gemma":[0.0004107151,0.000018297678,0.0001046465,0.00007621613,0.00007236556,4.992177e-7,0.0029138736,0.05107752,0.000025403302,0.94475836,0.00039322692,0.00014889958],"about_ca_topic_score_codex":0.00019618118,"about_ca_topic_score_gemma":0.000013287768,"teacher_disagreement_score":0.69794387,"about_ca_system_score_codex":0.000037489684,"about_ca_system_score_gemma":0.000116162606,"threshold_uncertainty_score":0.6696689},"labels":[],"label_agreement":null},{"id":"W3204190854","doi":"10.1007/s00220-022-04596-3","title":"The Missing Label of $$\\mathfrak {su}_3$$ and Its Symmetry","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Combinatorial Mathematics","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Espace pour la vie","funders":"Agence Nationale de la Recherche","keywords":"Diagonal; Tridiagonal matrix; Mathematics; Tensor product; Symmetry (geometry); Pure mathematics; Homogeneous space; Symmetry group; Weyl group; Irreducible representation; Representation theory; Combinatorics; Group (periodic table); Tensor (intrinsic definition); Type (biology); One-dimensional symmetry group; Algebra over a field; Group theory; Physics; Quantum mechanics","score_opus":0.15482421832019586,"score_gpt":0.41346968271683165,"score_spread":0.2586454643966358,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3204190854","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.71473,0.008217438,0.12189032,0.022303298,0.0012356074,0.0080250595,0.00012714296,0.0028102044,0.12066091],"genre_scores_gemma":[0.88325286,0.000908429,0.11495844,0.000040318144,0.000061390485,0.0001885195,0.00000811385,0.00010787702,0.00047403356],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.998092,0.00020583552,0.0008122318,0.00019065868,0.0003554337,0.00034385486],"domain_scores_gemma":[0.98752636,0.009776149,0.00031876448,0.002136999,0.00016663763,0.000075088356],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0011929659,0.00021241502,0.00046565404,0.00008707863,0.00035351052,0.00006263942,0.0012409653,0.000102666796,0.000004765777],"category_scores_gemma":[0.004220818,0.00016748822,0.00007283467,0.0010827854,0.0003936536,0.00015893785,0.0010082395,0.00041113718,0.00006937119],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000003813376,0.0003027935,0.000014174959,0.00037893883,0.000024634744,7.431392e-7,0.00094222557,0.000002868912,0.00049599784,0.99265605,0.00023164092,0.004946112],"study_design_scores_gemma":[0.00036187997,0.000021458103,0.000019059438,0.00033417638,0.000033467597,0.0000034130621,0.00056448026,0.04035442,0.000738797,0.9571159,0.00029437893,0.00015856182],"about_ca_topic_score_codex":7.270796e-7,"about_ca_topic_score_gemma":0.0000016992742,"teacher_disagreement_score":0.16852285,"about_ca_system_score_codex":0.000056732908,"about_ca_system_score_gemma":0.000046642836,"threshold_uncertainty_score":0.68299717},"labels":[],"label_agreement":null},{"id":"W3211330968","doi":"10.1007/s00220-023-04745-2","title":"Twisted Eleven-Dimensional Supergravity","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":12,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Supergravity; Holomorphic function; Physics; Pure mathematics; Calabi–Yau manifold; Moduli space; Context (archaeology); Theoretical physics; Algebra over a field; Supersymmetry; Mathematical physics; Mathematics","score_opus":0.04039119153589326,"score_gpt":0.31863072119387253,"score_spread":0.27823952965797927,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3211330968","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.684199,0.00009452635,0.07660448,0.004889688,0.00021590541,0.0012376084,0.00022067162,0.0007132436,0.2318249],"genre_scores_gemma":[0.99582326,0.0000047452304,0.0035158915,0.00005595988,0.000086344546,0.0000714538,0.00018320618,0.000028691587,0.00023045459],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99885976,0.00011229439,0.00032755767,0.00019543218,0.00019674323,0.00030820083],"domain_scores_gemma":[0.99778444,0.00057947007,0.000054614175,0.0014303983,0.0000670587,0.00008400451],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.00027355555,0.00015912231,0.00025666447,0.00004459566,0.00015687675,0.00003621911,0.0007187609,0.000041864354,0.00018387129],"category_scores_gemma":[0.000026499549,0.00015085533,0.00012592491,0.000797854,0.00034371403,0.00010695833,0.00055332796,0.00036749954,0.0015613429],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000024199974,0.0004354406,0.0008164597,0.000013231963,0.00001826953,4.1550143e-7,0.00017184757,0.00009131305,0.00008630672,0.9921873,0.00047077684,0.0057062176],"study_design_scores_gemma":[0.00024745576,0.000009601804,0.0008955207,0.000049027818,0.000013588003,2.1863174e-7,0.00011323507,0.020732146,0.00020331611,0.9771268,0.00044280576,0.00016627996],"about_ca_topic_score_codex":0.000012308992,"about_ca_topic_score_gemma":9.490958e-7,"teacher_disagreement_score":0.3116243,"about_ca_system_score_codex":0.000024353641,"about_ca_system_score_gemma":0.000036917885,"threshold_uncertainty_score":0.9992161},"labels":[],"label_agreement":null},{"id":"W3215183963","doi":"10.1007/s00220-024-04958-z","title":"Random Quantum Circuits Transform Local Noise into Global White Noise","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":45,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Institute for Quantum Information and Matter, California Institute of Technology; Ministry of Colleges and Universities; National Science Foundation; Government of Canada; Aspen Center for Physics; Stanford University; Institut Périmètre de physique théorique; Innovation, Science and Economic Development Canada","keywords":"Algorithm; Artificial intelligence; Computer science","score_opus":0.021160986938615896,"score_gpt":0.2967149638686152,"score_spread":0.2755539769299993,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3215183963","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0021027627,0.0009046912,0.98321956,0.00678477,0.00017833775,0.00029957943,0.000007869131,0.0004319799,0.0060704486],"genre_scores_gemma":[0.89131266,0.00006505257,0.1082541,0.0001840159,0.00006952762,0.000054377277,0.000009828815,0.000020097415,0.000030361582],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9982161,0.0001690242,0.0005133602,0.00040494953,0.00033343295,0.0003631498],"domain_scores_gemma":[0.9968967,0.0006308471,0.00004914435,0.0022325087,0.00006419657,0.00012659929],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005258057,0.00024712,0.00035008407,0.000075725686,0.0002295943,0.0003304907,0.002825506,0.00009310933,0.000008034211],"category_scores_gemma":[0.000058423426,0.00021487563,0.00018698229,0.0012940331,0.0003378248,0.000340158,0.00072490843,0.00057759316,0.00022662002],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000023323066,0.0003013913,0.000013325868,0.00017326152,0.00002290911,0.000009262419,0.0031379978,0.0037401349,0.000034169007,0.7113155,0.0002030343,0.28104666],"study_design_scores_gemma":[0.00021238165,0.000017912771,0.000038518298,0.00021447487,0.0000084019985,0.000013799215,0.000030732797,0.5476593,0.000020690073,0.45095566,0.0006871071,0.00014101923],"about_ca_topic_score_codex":0.000011321085,"about_ca_topic_score_gemma":0.000010365838,"teacher_disagreement_score":0.88920987,"about_ca_system_score_codex":0.00014583304,"about_ca_system_score_gemma":0.00014086236,"threshold_uncertainty_score":0.8762374},"labels":[],"label_agreement":null},{"id":"W3217663190","doi":"10.1007/s00220-023-04655-3","title":"Special Lagrangian Cycles and Calabi-Yau Transitions","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia Hospital","funders":"U.S. Department of Energy; High Energy Physics; Office of Science; National Science Foundation","keywords":"Calabi–Yau manifold; Conifold; Holomorphic function; Lagrangian; Mathematics; SPHERES; Pure mathematics; Physics; Mathematical physics; Gauge theory","score_opus":0.1318658091066035,"score_gpt":0.36568780900295783,"score_spread":0.23382199989635433,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3217663190","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.46640784,0.00022716093,0.06786665,0.019920483,0.0003696157,0.0022377332,0.0001881061,0.0016992827,0.44108313],"genre_scores_gemma":[0.94567215,0.00012891885,0.052612524,0.0000971749,0.00047398705,0.0001459479,0.000052650386,0.000049186197,0.00076745497],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989039,0.00012782769,0.00036353598,0.00017251575,0.0001798247,0.00025240364],"domain_scores_gemma":[0.99740016,0.0011700421,0.00005750958,0.0012536596,0.00004553156,0.00007310537],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00039330835,0.00014850232,0.00027763026,0.000121864054,0.00024611256,0.00005190284,0.0005802482,0.00007508123,0.00010802778],"category_scores_gemma":[0.000243504,0.00014728936,0.00007969776,0.0009320421,0.0002720176,0.00012454829,0.00029946552,0.00027305202,0.0003103221],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000002270407,0.00032492535,0.00008584121,0.00010815425,0.000015921241,0.0000020690463,0.0019791925,0.0000071429868,0.00007154008,0.99148816,0.0025312025,0.003383558],"study_design_scores_gemma":[0.00024141114,0.000014589758,0.0012559997,0.00008482988,0.00003104491,0.000005267941,0.00091705826,0.005603071,0.000029581526,0.98956066,0.002092829,0.000163681],"about_ca_topic_score_codex":0.000003585985,"about_ca_topic_score_gemma":0.000043242795,"teacher_disagreement_score":0.47926432,"about_ca_system_score_codex":0.000027610093,"about_ca_system_score_gemma":0.000019587747,"threshold_uncertainty_score":0.60062855},"labels":[],"label_agreement":null},{"id":"W4206512930","doi":"10.1007/s00220-021-04293-7","title":"Stokes Manifolds and Cluster Algebras","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic Geometry and Number Theory","field":"Mathematics","cited_by":4,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada","keywords":"Mathematics; Poisson bracket; Poisson manifold; Poisson algebra; Pure mathematics; Symplectic geometry; Manifold (fluid mechanics); Connection (principal bundle); Hierarchy; Vertex (graph theory); Combinatorics; Geometry; Lie algebra","score_opus":0.06254140994098113,"score_gpt":0.33148082823285374,"score_spread":0.2689394182918726,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4206512930","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.77632195,0.0011775489,0.06622528,0.0064614806,0.00018007834,0.0016495395,0.00005897494,0.0004421363,0.14748304],"genre_scores_gemma":[0.9678239,0.00003395316,0.030903377,0.00030512898,0.000026282256,0.0001950345,0.000014556374,0.000032623084,0.00066510146],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985655,0.00041880127,0.00037787546,0.0001824216,0.0002408607,0.00021453109],"domain_scores_gemma":[0.99608934,0.002141983,0.00010673375,0.0015777274,0.00002755434,0.000056649264],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0009990268,0.00014656856,0.00026829043,0.00007344356,0.00041514635,0.00002971479,0.0008804366,0.000040795287,0.00035966176],"category_scores_gemma":[0.00028609685,0.00014930274,0.0000618499,0.0004020722,0.00024761737,0.00012227712,0.0016939848,0.00049826776,0.000049777034],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000007449101,0.0005565705,0.00014647258,0.00006539782,0.00001928639,0.0000011346626,0.0018168903,0.000008463495,0.000023526783,0.9947903,0.00080322515,0.001761264],"study_design_scores_gemma":[0.00032368486,0.000027523103,0.000114351795,0.000020572286,0.000026946554,0.000022909713,0.0013053024,0.003157781,0.00004327449,0.9934554,0.0013350344,0.00016720429],"about_ca_topic_score_codex":0.000002570734,"about_ca_topic_score_gemma":0.0000021827439,"teacher_disagreement_score":0.191502,"about_ca_system_score_codex":0.00006907481,"about_ca_system_score_gemma":0.000022005239,"threshold_uncertainty_score":0.60883886},"labels":[],"label_agreement":null},{"id":"W4210345658","doi":"10.1007/s00220-021-04302-9","title":"Representations of the Planar Galilean Conformal Algebra","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":21,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"York University","funders":"","keywords":"Galilean; Conformal map; Mathematics; Simple (philosophy); Pure mathematics; Primary field; Extension (predicate logic); Planar; Space (punctuation); Lie algebra; Algebra over a field; Virasoro algebra; Conformal field theory; Algebra representation; Mathematical physics; Mathematical analysis; Cellular algebra; Computer science","score_opus":0.07160132356288418,"score_gpt":0.34548641251561996,"score_spread":0.2738850889527358,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4210345658","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.80738634,0.0003584589,0.02267028,0.0072372863,0.00097286666,0.0032954018,0.00016779233,0.00026708288,0.15764447],"genre_scores_gemma":[0.9927369,0.000006223694,0.0067879325,0.000095317344,0.000021617112,0.00015981824,0.000009457585,0.000018866416,0.00016389735],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99859715,0.0002557,0.00050067104,0.00011813612,0.0003695902,0.00015877959],"domain_scores_gemma":[0.99636775,0.0010165123,0.00023338574,0.0022975716,0.000055198074,0.000029575738],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00034143773,0.000108598375,0.0002378119,0.000035273588,0.00038860147,0.000014146959,0.0016979936,0.000031995853,0.00016040265],"category_scores_gemma":[0.00030128882,0.00008751355,0.00012958194,0.0004809754,0.00026338454,0.00007664353,0.0010169126,0.00043673447,0.00000450169],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004510187,0.00028210838,0.00018366144,0.00003149436,0.000018212648,1.4705604e-7,0.0017783634,0.00009028721,0.00003584652,0.9966627,0.0006899902,0.00022267303],"study_design_scores_gemma":[0.00026978663,0.00001718247,0.00022303799,0.000020155763,0.000025991783,0.000004373167,0.0011826974,0.0029169142,0.00016322275,0.9947263,0.0003582067,0.000092110415],"about_ca_topic_score_codex":0.000013554804,"about_ca_topic_score_gemma":0.0000045569,"teacher_disagreement_score":0.18535051,"about_ca_system_score_codex":0.00006752,"about_ca_system_score_gemma":0.000069562724,"threshold_uncertainty_score":0.3568699},"labels":[],"label_agreement":null},{"id":"W4210515265","doi":"10.1007/s00220-021-04299-1","title":"Melonic Large N Limit of 5-Index Irreducible Random Tensors","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":11,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"H2020 European Research Council; Ministry of Colleges and Universities; Institut Périmètre de physique théorique; Innovation, Science and Economic Development Canada; Radboud Universiteit; Deutsche Forschungsgemeinschaft; European Commission; Government of Canada","keywords":"Rank (graph theory); Quartic function; Limit (mathematics); Tensor (intrinsic definition); Simplex; Irreducible representation; Combinatorics; Tensor product; Mathematics; Mathematical physics; Pure mathematics; Mathematical analysis","score_opus":0.025812258718498095,"score_gpt":0.2939241819495524,"score_spread":0.2681119232310543,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4210515265","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.23208106,0.00045113923,0.3414761,0.0023115186,0.0001683631,0.0017658464,0.00049358245,0.0001494515,0.4211029],"genre_scores_gemma":[0.9972094,0.0000068379504,0.0022544449,0.000043074277,0.000043678036,0.0001795666,0.000067276975,0.000030475197,0.000165199],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985212,0.00024168537,0.0004792428,0.0002009371,0.00026480216,0.00029210933],"domain_scores_gemma":[0.99726874,0.000613621,0.0001611616,0.0018310931,0.000065714186,0.000059702386],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005013658,0.00015705053,0.0003960027,0.000048319227,0.0002714664,0.00001880227,0.0011333127,0.000023923909,0.000778159],"category_scores_gemma":[0.00002423311,0.00015708558,0.0001930248,0.00057051267,0.0002732621,0.00008859937,0.001109278,0.00054508325,0.000055737582],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000017387396,0.0018924436,0.0011478845,0.000024201048,0.000041392803,1.6711812e-7,0.0005942458,0.0007091191,0.000030415913,0.9934886,0.00015318967,0.0019009177],"study_design_scores_gemma":[0.0010253146,0.000028941795,0.00014518786,0.000026860485,0.000030512385,3.7380843e-7,0.0012148109,0.026721189,0.00020256297,0.96923184,0.0012114905,0.00016093247],"about_ca_topic_score_codex":0.000015629597,"about_ca_topic_score_gemma":7.3381653e-7,"teacher_disagreement_score":0.7651284,"about_ca_system_score_codex":0.000041651823,"about_ca_system_score_gemma":0.000060423714,"threshold_uncertainty_score":0.85202956},"labels":[],"label_agreement":null},{"id":"W4214797950","doi":"10.1007/s00220-023-04653-5","title":"The Tensor Harish-Chandra–Itzykson–Zuber Integral II: Detecting Entanglement in Large Quantum Systems","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Japan Society for the Promotion of Science; European Research Council; Nederlandse Organisatie voor Wetenschappelijk Onderzoek","keywords":"Quantum entanglement; Scaling; Context (archaeology); Tensor (intrinsic definition); Quantum; Generalization; Domain (mathematical analysis); Mathematics; Multipartite entanglement; Multipartite; Pure mathematics; Physics; Theoretical physics; Algebra over a field; Statistical physics; Squashed entanglement; Quantum mechanics; Mathematical analysis; Geometry","score_opus":0.05324919612132943,"score_gpt":0.31841834257151463,"score_spread":0.2651691464501852,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4214797950","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.108948596,0.0008168257,0.8527945,0.009373506,0.00079574727,0.0021761386,0.000024960142,0.0011029682,0.023966733],"genre_scores_gemma":[0.99323535,0.00017267259,0.0060313456,0.00011337813,0.000020263777,0.00031066322,0.000012258571,0.000013293419,0.00009076512],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99815935,0.00021783824,0.00068693963,0.0001775259,0.00032775637,0.00043060668],"domain_scores_gemma":[0.9967047,0.00091963593,0.00016101646,0.0020668805,0.00008914556,0.000058626094],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.001505134,0.00015488363,0.00022156225,0.00017534586,0.00069619995,0.00028970782,0.0023772565,0.000060127728,0.0000059670347],"category_scores_gemma":[0.00022522315,0.00011629693,0.00009743734,0.0018853351,0.0001384135,0.0004415539,0.0014000124,0.00045619952,0.00030981723],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000014889555,0.00018160205,0.00028817408,0.000032209624,0.000009644093,8.600082e-7,0.0042435457,0.00008279007,0.00001749993,0.99083716,0.00052639365,0.0037786218],"study_design_scores_gemma":[0.00029489154,0.000023926004,0.0005052718,0.00013805497,0.0000033806796,0.0000026802154,0.003153437,0.79085654,0.00003426291,0.20082393,0.0040189577,0.00014463442],"about_ca_topic_score_codex":0.000015784412,"about_ca_topic_score_gemma":0.000043939224,"teacher_disagreement_score":0.88428676,"about_ca_system_score_codex":0.00008296433,"about_ca_system_score_gemma":0.000036780948,"threshold_uncertainty_score":0.53546774},"labels":[],"label_agreement":null},{"id":"W4221144304","doi":"10.1007/s00220-023-04927-y","title":"Constructing Number Field Isomorphisms from *-Isomorphisms of Certain Crossed Product C*-Algebras","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"HORIZON EUROPE European Research Council; H2020 Marie Skłodowska-Curie Actions; Japan Society for the Promotion of Science London; European Commission; Natural Sciences and Engineering Research Council of Canada; Japan Society for the Promotion of Science","keywords":"Isomorphism (crystallography); Mathematics; Crossed product; Multiplicative function; Pure mathematics; Product (mathematics); Class (philosophy); Field (mathematics); Ring (chemistry); Group (periodic table); Multiplicative group; Algebraic number field; Action (physics); Discrete mathematics; Algebra over a field; Computer science; Mathematical analysis; Geometry; Physics","score_opus":0.1026573998867327,"score_gpt":0.41508084943182866,"score_spread":0.31242344954509593,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4221144304","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5901901,0.0018619515,0.34662288,0.007860183,0.0004223008,0.0028741888,0.00030785997,0.0008276114,0.0490329],"genre_scores_gemma":[0.77870196,0.000050834555,0.22064869,0.00004422629,0.000080862665,0.00012725202,0.000036970363,0.00006937567,0.00023985868],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99749506,0.00028153154,0.0009456059,0.00041469687,0.00047288183,0.00039021188],"domain_scores_gemma":[0.98926324,0.007471048,0.00015178605,0.0028167132,0.0002027609,0.00009445922],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00065892126,0.00027692044,0.0006050704,0.00009171364,0.00014547337,0.0001214882,0.0013996242,0.00012786596,0.000615243],"category_scores_gemma":[0.0025039553,0.0002601203,0.00015965904,0.0009146259,0.0007306606,0.00033507094,0.00075945037,0.0009265303,0.0002760315],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000011830312,0.0004775033,0.0006551048,0.0004183128,0.00007646917,0.000007387415,0.0016040903,0.000006777675,0.0023743089,0.98222226,0.0006634438,0.011482512],"study_design_scores_gemma":[0.00028569947,0.000024332921,0.000021059122,0.00072007184,0.00004272027,0.000010398507,0.0007640944,0.012363204,0.017522458,0.9677431,0.00024505222,0.00025780068],"about_ca_topic_score_codex":0.000040373376,"about_ca_topic_score_gemma":0.000034491673,"teacher_disagreement_score":0.18851183,"about_ca_system_score_codex":0.0001699705,"about_ca_system_score_gemma":0.0001685123,"threshold_uncertainty_score":0.9999851},"labels":[],"label_agreement":null},{"id":"W4225611135","doi":"10.1007/s00220-022-04602-8","title":"A Kazhdan–Lusztig Correspondence for $$L_{-\\frac{3}{2}}(\\mathfrak {sl}_3)$$","year":2023,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"Natural Sciences and Engineering Research Council of Canada; Australian Research Council; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada","keywords":"Vertex operator algebra; Mathematics; Representation theory; Conjecture; Tensor product; Combinatorics; Vertex (graph theory); Abelian category; Abelian group; Pure mathematics; Affine Lie algebra; Algebra over a field; Current algebra","score_opus":0.3182232471917289,"score_gpt":0.44820836729270574,"score_spread":0.12998512010097685,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4225611135","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.076162204,0.0014992359,0.878127,0.005976271,0.005204301,0.0136729125,0.00074762676,0.002765746,0.015844733],"genre_scores_gemma":[0.68152714,0.00045952445,0.30748802,0.0002586035,0.0007786967,0.005332634,0.00031533604,0.0005294576,0.003310575],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9959912,0.00033832938,0.0015034883,0.0008106749,0.0006550462,0.0007013023],"domain_scores_gemma":[0.9839912,0.007946322,0.0006458093,0.006858254,0.00038729538,0.00017112863],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0012480723,0.0007097832,0.0013598003,0.00019806744,0.000365679,0.00023221459,0.004603105,0.00072073523,0.000059192476],"category_scores_gemma":[0.0033857152,0.00070576667,0.0005879019,0.0005849222,0.0005053685,0.00014960735,0.0049841134,0.0018659339,0.00021473307],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000030976124,0.00057483144,0.000025629057,0.0012122003,0.000103748804,0.0000020195394,0.0014173051,0.00019550913,0.000014854824,0.99108756,0.0042178966,0.0011174927],"study_design_scores_gemma":[0.0005708754,0.000041124007,0.000028009934,0.0011646941,0.00016141693,0.0000031827683,0.0002789032,0.042939857,0.00007872646,0.95327663,0.0007974096,0.0006591656],"about_ca_topic_score_codex":0.000023730183,"about_ca_topic_score_gemma":0.000031951287,"teacher_disagreement_score":0.6053649,"about_ca_system_score_codex":0.00033237427,"about_ca_system_score_gemma":0.00035397615,"threshold_uncertainty_score":0.9995394},"labels":[],"label_agreement":null},{"id":"W4226067509","doi":"10.1007/s00220-022-04321-0","title":"On the Point Spectrum in the Ekman Boundary Layer Problem","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Spectral Theory in Mathematical Physics","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Queen's University; Eidgenössische Technische Hochschule Zürich; Queen's University Belfast","keywords":"Eigenvalues and eigenvectors; Mathematics; Spectrum (functional analysis); Operator (biology); Mathematical analysis; Boundary (topology); Point (geometry); Boundary value problem; Boundary layer; Physics; Geometry; Quantum mechanics; Mechanics","score_opus":0.114259841482748,"score_gpt":0.3620255845136138,"score_spread":0.2477657430308658,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4226067509","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.24577868,0.00025043063,0.0241442,0.09990875,0.00019492368,0.007896059,0.00008081635,0.0004971414,0.621249],"genre_scores_gemma":[0.9837919,0.000013622676,0.01267875,0.0016681022,0.00005883844,0.0015346735,0.000011785598,0.000074826115,0.00016750884],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9956699,0.0017447337,0.0008700189,0.00032759845,0.00085832976,0.00052941625],"domain_scores_gemma":[0.98168176,0.01344104,0.00024651515,0.004552043,0.000029930829,0.0000487016],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0039032695,0.0003320601,0.00047150106,0.00009655447,0.00084375375,0.0001319148,0.0043164673,0.000057804213,0.0005633339],"category_scores_gemma":[0.0009519281,0.00021268023,0.00021551918,0.0013093946,0.00062419433,0.00014427696,0.0012597858,0.0020666858,0.00023769248],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000014666543,0.002589371,0.000014736948,0.00006741525,0.000020984045,0.0000045753286,0.0059866016,0.00012724931,0.00003903339,0.98861176,0.0023083019,0.0002153174],"study_design_scores_gemma":[0.00030398677,0.00009260955,0.00004357528,0.00009947173,0.000027094431,0.000015652515,0.0028598623,0.005640772,0.00008055175,0.98985624,0.0007259525,0.00025423034],"about_ca_topic_score_codex":0.000007583501,"about_ca_topic_score_gemma":0.000026468626,"teacher_disagreement_score":0.7380132,"about_ca_system_score_codex":0.00034981588,"about_ca_system_score_gemma":0.000066475994,"threshold_uncertainty_score":0.8978836},"labels":[],"label_agreement":null},{"id":"W4226338050","doi":"10.1007/s00220-022-04434-6","title":"A Gauge-Invariant Unique Continuation Criterion for Waves in Asymptotically Anti-de Sitter Spacetimes","year":2022,"lang":"lv","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":true,"ca_institutions":"","funders":"Engineering and Physical Sciences Research Council; Westfälische Wilhelms-Universität Münster; European Commission","keywords":"Algorithm; Physics; Artificial intelligence; Computer science","score_opus":0.06858739664488848,"score_gpt":0.3618467875906549,"score_spread":0.2932593909457664,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4226338050","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.044383265,0.0005423486,0.9178431,0.014500538,0.00019299824,0.007605245,0.00048708037,0.000300113,0.014145324],"genre_scores_gemma":[0.61748135,0.00014142455,0.37832278,0.00052836124,0.000100607846,0.0024816494,0.0001894799,0.00022062926,0.00053368974],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9937067,0.0014246112,0.0021939445,0.00077469734,0.00074521167,0.0011548235],"domain_scores_gemma":[0.98621374,0.008800128,0.000753742,0.0037325232,0.00029203872,0.00020784282],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0034833874,0.00070140825,0.0015235598,0.00030661034,0.0006091158,0.00019166742,0.0024064037,0.0002771979,0.00027971267],"category_scores_gemma":[0.0026747952,0.00079485425,0.00040568266,0.0012546816,0.00065582426,0.0004984961,0.0023269374,0.0018899093,0.00008967943],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00006188724,0.0060425093,0.00007555514,0.0016323545,0.0000804228,0.000007935058,0.008735433,0.0012507903,0.0031408246,0.9765412,0.0007372564,0.001693824],"study_design_scores_gemma":[0.0014971948,0.00017696233,0.00007359828,0.00079356495,0.00013603644,0.00001408733,0.001634965,0.20389013,0.00045053897,0.7900761,0.0006163441,0.0006404992],"about_ca_topic_score_codex":0.00002161493,"about_ca_topic_score_gemma":0.000026733755,"teacher_disagreement_score":0.5730981,"about_ca_system_score_codex":0.0011549173,"about_ca_system_score_gemma":0.00038949278,"threshold_uncertainty_score":0.9994502},"labels":[],"label_agreement":null},{"id":"W4281760202","doi":"10.1007/s00220-021-04297-3","title":"Correspondences of Categories for Subregular $${{\\mathcal {W}}}$$-Algebras and Principal $${\\mathcal {W}}$$-Superalgebras","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"Japan Society for the Promotion of Science; Natural Sciences and Engineering Research Council of Canada; Ministry of Education, Culture, Sports, Science and Technology","keywords":"Mathematics; Functor; Coset; Pure mathematics; Simple (philosophy); Discrete mathematics","score_opus":0.0837262591309234,"score_gpt":0.35015805745325,"score_spread":0.2664317983223266,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4281760202","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9788845,0.00060528907,0.017385913,0.0007680944,0.00020692105,0.0011807587,0.000055542878,0.00009262299,0.0008203342],"genre_scores_gemma":[0.96901613,0.000031499127,0.030043405,0.00005014981,0.00005376266,0.0006148348,0.000023395885,0.00004703862,0.000119804514],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9977797,0.0002964259,0.00080246234,0.00031630805,0.0004672498,0.00033783953],"domain_scores_gemma":[0.9953467,0.002623213,0.00026256364,0.001547221,0.00013273096,0.000087552],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00084221945,0.00026014194,0.0006302438,0.00010387503,0.0004663525,0.00004292409,0.0012914094,0.00009683661,0.000078923236],"category_scores_gemma":[0.0006290546,0.0002515413,0.00015885862,0.0004387144,0.0005997924,0.00016533292,0.0013000469,0.00045206843,0.0000020885805],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000057428737,0.00048380933,0.0003406425,0.00022370639,0.000039204795,7.4397195e-7,0.0027806712,0.000020808071,0.00012575938,0.9949195,0.00011023573,0.0008975085],"study_design_scores_gemma":[0.0006864724,0.0001479277,0.0001707074,0.000046373527,0.000060519815,0.000014610537,0.0014647848,0.0073381714,0.00029615656,0.989162,0.00035644203,0.00025583417],"about_ca_topic_score_codex":0.000014024224,"about_ca_topic_score_gemma":0.000007225733,"teacher_disagreement_score":0.0126574915,"about_ca_system_score_codex":0.00009657589,"about_ca_system_score_gemma":0.00013037241,"threshold_uncertainty_score":0.9999937},"labels":[],"label_agreement":null},{"id":"W4310081354","doi":"10.1007/s00220-022-04564-x","title":"Classifying Minimum Energy States for Interacting Particles: Regular Simplices","year":2022,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Biology Tumor Growth","field":"Mathematics","cited_by":12,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Canada Research Chairs","keywords":"Physics; Simplex; Combinatorics; BETA (programming language); Limit (mathematics); Energy (signal processing); Space (punctuation); Exponent; Alpha (finance); Mathematical physics; Mathematics; Quantum mechanics; Mathematical analysis","score_opus":0.15126855651824642,"score_gpt":0.3926789914676372,"score_spread":0.24141043494939077,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4310081354","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.1903328,0.00055394677,0.7749665,0.009017072,0.00028212392,0.002753504,0.00020637877,0.00083663454,0.02105109],"genre_scores_gemma":[0.82622176,0.000018824221,0.17137435,0.0002588409,0.000047586662,0.0017250641,0.00006430945,0.000068600384,0.0002206454],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99747527,0.00047244463,0.0009400387,0.0003422786,0.0002874161,0.0004825445],"domain_scores_gemma":[0.9860935,0.011317962,0.0003734071,0.0020284716,0.00009593853,0.00009069393],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0012466515,0.00025438317,0.00054500176,0.00009559053,0.00059323374,0.000057766876,0.0015977927,0.00006352135,0.00013122412],"category_scores_gemma":[0.0017908701,0.00024779397,0.00018229094,0.00046560456,0.00030741392,0.00016506776,0.0014133028,0.00047591983,0.000016396818],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000021506765,0.001143472,0.000065697524,0.00025447222,0.000045875568,0.0000013739617,0.0020005216,0.00005389265,0.0007134389,0.9919092,0.0014044365,0.0023861285],"study_design_scores_gemma":[0.0003983204,0.00006984176,0.0000040420705,0.00008584326,0.000043691714,0.000010260331,0.0032607473,0.13653855,0.00062641123,0.8560993,0.002626396,0.00023657466],"about_ca_topic_score_codex":0.0000048407505,"about_ca_topic_score_gemma":0.000009205161,"teacher_disagreement_score":0.635889,"about_ca_system_score_codex":0.00019592627,"about_ca_system_score_gemma":0.000051432362,"threshold_uncertainty_score":0.99999744},"labels":[],"label_agreement":null},{"id":"W4317716254","doi":"10.1007/s00220-022-04623-3","title":"The Green Tensor of the Nonstationary Stokes System in the Half Space","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Navier-Stokes equation solutions","field":"Mathematics","cited_by":12,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"National Research Foundation of Korea; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; National Natural Science Foundation of China","keywords":"Pointwise; Solenoidal vector field; Tensor (intrinsic definition); Mathematics; Vector field; Space (punctuation); Mathematical analysis; Tensor field; Mathematical physics; Pure mathematics; Geometry; Exact solutions in general relativity","score_opus":0.1634708715780347,"score_gpt":0.3897854603530323,"score_spread":0.2263145887749976,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4317716254","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.31295186,0.0024384914,0.12361567,0.2668743,0.001041975,0.019566959,0.0005328262,0.0016221043,0.2713558],"genre_scores_gemma":[0.9893582,0.00006977424,0.009338329,0.00006463466,0.000033458615,0.0005015633,0.000013817906,0.000031008607,0.0005892223],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99733734,0.00095049903,0.0007675279,0.00014326948,0.0005358223,0.00026556264],"domain_scores_gemma":[0.98488235,0.011267155,0.00030754306,0.003356075,0.00016329027,0.000023600041],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.002178613,0.0001547923,0.00026452853,0.00007824357,0.0005801727,0.000044010387,0.0025610721,0.00006899323,0.0000048552665],"category_scores_gemma":[0.0014656287,0.000085624815,0.00014271641,0.00196629,0.00069415715,0.00011987596,0.00058441533,0.000500795,0.00013907299],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000024506733,0.00022401668,0.00022310215,0.00012966924,0.000015812608,4.5553256e-7,0.0051692515,0.00012538837,0.000047625654,0.992118,0.0012794795,0.00066471775],"study_design_scores_gemma":[0.00026603177,0.000009697905,0.002367623,0.00033916824,0.00004340061,0.000005374828,0.011509751,0.0562433,0.000042081385,0.9275082,0.0015415456,0.00012382261],"about_ca_topic_score_codex":0.00003676302,"about_ca_topic_score_gemma":0.00015644045,"teacher_disagreement_score":0.6764063,"about_ca_system_score_codex":0.00013026866,"about_ca_system_score_gemma":0.00009901934,"threshold_uncertainty_score":0.47591516},"labels":[],"label_agreement":null},{"id":"W4318619707","doi":"10.1007/s00220-023-04641-9","title":"Historical Lattice Trees","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia; Université de Montréal","funders":"Natural Sciences and Engineering Research Council of Canada; Australian Research Council; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada","keywords":"Brownian motion; Random walk; Lattice (music); Mathematics; Statistical physics; Combinatorics; Physics; Statistics","score_opus":0.19855693769880067,"score_gpt":0.40092979016388763,"score_spread":0.20237285246508696,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4318619707","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00302852,0.00013563268,0.9629152,0.0043101925,0.00014282527,0.00048168603,0.000016005468,0.00065562304,0.02831434],"genre_scores_gemma":[0.55533373,0.0001996023,0.4411771,0.0001846548,0.00014243429,0.00041855223,0.000022154944,0.00010664986,0.0024151413],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99853295,0.00009090139,0.00053664384,0.00021060093,0.0002986993,0.00033018916],"domain_scores_gemma":[0.99320006,0.0049595125,0.00009914615,0.0015579711,0.00008840663,0.00009489661],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005319209,0.00016626697,0.00037855297,0.00009178394,0.00014407962,0.00003232731,0.0009765521,0.00008986335,0.00004576284],"category_scores_gemma":[0.0036472732,0.00015410826,0.000084883286,0.0010395701,0.00010511757,0.00009152835,0.00048479857,0.00035492628,0.00056573626],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000028935788,0.00035079502,0.000020239568,0.00012051521,0.000010238814,0.0000034234008,0.00040464097,0.0000058857236,0.000028771039,0.98957705,0.0041545797,0.0053209793],"study_design_scores_gemma":[0.00020057432,0.000024715078,0.00006427108,0.000096962576,0.000027691189,0.0000028814643,0.00012605281,0.058509298,0.000019752939,0.93879247,0.0019720932,0.00016323551],"about_ca_topic_score_codex":0.00000432358,"about_ca_topic_score_gemma":0.0000113735005,"teacher_disagreement_score":0.55230516,"about_ca_system_score_codex":0.0002017266,"about_ca_system_score_gemma":0.000041101026,"threshold_uncertainty_score":0.72715837},"labels":[],"label_agreement":null},{"id":"W4320036520","doi":"10.1007/s00220-023-04656-2","title":"A Gromov–Witten Theory for Simple Normal-Crossing Pairs Without Log Geometry","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic Geometry and Number Theory","field":"Mathematics","cited_by":4,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Division of Mathematical Sciences; Natural Sciences and Engineering Research Council of Canada; Universitetet i Oslo; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; University of Alberta; Simons Foundation","keywords":"Quantum cohomology; Mirror symmetry; Mathematics; Cohomology; Conjecture; Pure mathematics; Zero (linguistics); Formalism (music); Simple (philosophy); Quantum field theory; Motivic cohomology; Algebra over a field; De Rham cohomology; Equivariant cohomology; Mathematical physics","score_opus":0.10142516926394583,"score_gpt":0.3784637456626602,"score_spread":0.2770385763987144,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4320036520","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.36029813,0.00018705535,0.60755354,0.0011725551,0.00014899377,0.00200236,0.000092196984,0.0011302545,0.027414942],"genre_scores_gemma":[0.93273956,0.000026704398,0.06520576,0.00015738414,0.000100916615,0.00042720715,0.00010580461,0.00009583475,0.0011408174],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99778855,0.00034225453,0.0007182632,0.00031123555,0.00027178627,0.0005679334],"domain_scores_gemma":[0.98975945,0.007190577,0.0002225646,0.0025988277,0.000121400015,0.00010717344],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0029099071,0.00028281493,0.0005503201,0.00020688247,0.000624217,0.0001247535,0.0013996032,0.00016123574,0.00010688777],"category_scores_gemma":[0.002700671,0.00026743443,0.00022833119,0.001426466,0.00071243,0.00026343614,0.00078633457,0.0004613233,0.0003624652],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00002555701,0.00049881544,0.00038024582,0.0003786341,0.0000636492,0.000001306231,0.0023222927,0.000020806687,0.00010054334,0.99050444,0.0012308863,0.0044727908],"study_design_scores_gemma":[0.0005596487,0.00003263791,0.00020859312,0.00013382846,0.00006628255,0.0000062948334,0.0016691523,0.010804031,0.00033600163,0.9850145,0.00085992605,0.00030910695],"about_ca_topic_score_codex":0.000002294198,"about_ca_topic_score_gemma":0.000003915133,"teacher_disagreement_score":0.57244146,"about_ca_system_score_codex":0.0000858412,"about_ca_system_score_gemma":0.00007103809,"threshold_uncertainty_score":0.99997777},"labels":[],"label_agreement":null},{"id":"W4320036539","doi":"10.1007/s00220-023-04661-5","title":"Lower Bounds for Eigenfunction Restrictions in Lacunary Regions","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Natural Sciences and Engineering Research Council of Canada; Alfred P. Sloan Foundation; Agence Nationale de la Recherche; National Science Foundation","keywords":"Eigenfunction; Hypersurface; Lacunary function; Combinatorics; Mathematics; Riemannian manifold; Projection (relational algebra); Mathematical physics; Physics; Mathematical analysis; Quantum mechanics; Eigenvalues and eigenvectors","score_opus":0.210679722368526,"score_gpt":0.4205031188523058,"score_spread":0.2098233964837798,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4320036539","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.019176492,0.00010454691,0.9204073,0.00526726,0.0002575576,0.0035839125,0.00006237911,0.0011083293,0.050032217],"genre_scores_gemma":[0.6740568,0.00023428448,0.31986243,0.00015387348,0.00015218486,0.0034718504,0.00013956631,0.00019996233,0.0017290413],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.997695,0.00016545708,0.00093201344,0.00037199233,0.00029365337,0.0005418589],"domain_scores_gemma":[0.99096394,0.006068522,0.00020189195,0.002530387,0.00014039596,0.00009487809],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00095381396,0.00027816836,0.0005245801,0.00028483287,0.00026916937,0.00005054197,0.00096337876,0.00017214385,0.000019960913],"category_scores_gemma":[0.002049765,0.00028432684,0.00019814023,0.0023002776,0.00033313286,0.00036916978,0.0004859798,0.0006045848,0.00026244854],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001351884,0.0012232125,0.000034646426,0.00023983566,0.000017871032,0.0000016539085,0.0006680356,0.0002969481,0.00015660268,0.9919856,0.0041183014,0.0012437776],"study_design_scores_gemma":[0.00057200535,0.000048675585,0.00008529498,0.0002429076,0.000031568183,0.0000023130742,0.000367952,0.040743303,0.000043697073,0.95629114,0.0012985455,0.0002726014],"about_ca_topic_score_codex":0.0000060666384,"about_ca_topic_score_gemma":0.000050677983,"teacher_disagreement_score":0.65488034,"about_ca_system_score_codex":0.00024317545,"about_ca_system_score_gemma":0.000077340745,"threshold_uncertainty_score":0.9999609},"labels":[],"label_agreement":null},{"id":"W4320728789","doi":"10.1007/s00220-023-04669-x","title":"Upper Tail Bounds for Stationary KPZ Models","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":9,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Simons Foundation; National Science Foundation","keywords":"Complex system; Mathematics; Statistical physics; Nonlinear system; Upper and lower bounds; Pure mathematics; Physics; Mathematical analysis; Computer science; Quantum mechanics; Artificial intelligence","score_opus":0.22788985453621358,"score_gpt":0.4266504402804492,"score_spread":0.1987605857442356,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4320728789","genre_codex":"methods","genre_gemma":"methods","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":"methods","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.021473397,0.00019574203,0.90775055,0.007127239,0.000070968454,0.0028987345,0.00021028149,0.0007929074,0.059480175],"genre_scores_gemma":[0.47435784,0.00034711618,0.51705194,0.0001890951,0.00013248048,0.004109168,0.00037173813,0.00012472931,0.0033159065],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99863523,0.000073534655,0.00055731233,0.000215898,0.00021932312,0.00029869645],"domain_scores_gemma":[0.9941406,0.0036906342,0.00013934108,0.0018232468,0.00014249083,0.00006365033],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00062456616,0.00016409022,0.0003129296,0.00010910056,0.00031214205,0.00006468557,0.0009414738,0.00008082177,0.000027070853],"category_scores_gemma":[0.0003458519,0.0001568854,0.00014934824,0.00087135617,0.00016769407,0.00023987271,0.0003019714,0.00020032098,0.00022310426],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006411616,0.00037915076,0.000013893691,0.00015070595,0.00001863047,1.5306482e-7,0.0008714848,0.0003088217,0.00004487789,0.9888851,0.0074597904,0.0018609955],"study_design_scores_gemma":[0.00046726956,0.000009659077,0.000023471905,0.000044453012,0.000026211022,7.990096e-7,0.00035757947,0.2376535,0.000021738175,0.7581055,0.0031556159,0.00013419832],"about_ca_topic_score_codex":0.000003371178,"about_ca_topic_score_gemma":0.0000051095985,"teacher_disagreement_score":0.45288444,"about_ca_system_score_codex":0.00006224204,"about_ca_system_score_gemma":0.000057231082,"threshold_uncertainty_score":0.63976014},"labels":[],"label_agreement":null},{"id":"W4322726068","doi":"10.1007/s00220-023-04650-8","title":"Isomonodromic Deformations: Confluence, Reduction and Quantisation","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":9,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"H2020 Marie Skłodowska-Curie Actions; Engineering and Physical Sciences Research Council","keywords":"Confluence; Hamiltonian (control theory); Order (exchange); Meromorphic function; Riemann sphere; Mathematics; Singularity; Morphism; Pure mathematics; Algebra over a field; Mathematical physics; Algorithm; Mathematical analysis; Computer science","score_opus":0.05714219192145211,"score_gpt":0.3480569737877044,"score_spread":0.2909147818662523,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4322726068","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9280492,0.000075710246,0.035149626,0.0017336573,0.00008472325,0.0005932999,0.00005227666,0.00018292392,0.034078598],"genre_scores_gemma":[0.99178225,0.000048801776,0.0077611385,0.000011486104,0.00005574869,0.000056230947,0.00012916746,0.00001106774,0.00014413484],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99938416,0.000053216645,0.00025391387,0.00010076071,0.000074410826,0.00013354472],"domain_scores_gemma":[0.9990971,0.00015523087,0.000063176005,0.00061587937,0.00003402248,0.000034609282],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00018618663,0.00007979806,0.00012597033,0.00006142734,0.00016571516,0.000045226556,0.0002164688,0.000025389738,0.000026790236],"category_scores_gemma":[0.000015649219,0.00007913054,0.000034685152,0.00038150154,0.00014905009,0.00021204406,0.00015248066,0.0001523527,0.00025494266],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[9.947964e-7,0.00012087635,0.0013963623,0.000018411727,0.0000107331725,5.920116e-8,0.0011040224,0.00015224703,0.00030705132,0.9874415,0.00013445885,0.00931333],"study_design_scores_gemma":[0.00020322822,0.000007950307,0.0022107863,0.000053887023,0.000012117975,0.0000011731169,0.00160561,0.13266763,0.00016580887,0.86241114,0.00054274435,0.00011789769],"about_ca_topic_score_codex":0.000020185613,"about_ca_topic_score_gemma":0.000001200646,"teacher_disagreement_score":0.13251539,"about_ca_system_score_codex":0.00001618178,"about_ca_system_score_gemma":0.000021630427,"threshold_uncertainty_score":0.3276857},"labels":[],"label_agreement":null},{"id":"W4327989000","doi":"10.1007/s00220-023-04680-2","title":"The Toda Flow as a Porous Medium Equation","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":2,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"Toda lattice; Integrable system; Mathematics; Invariant (physics); Hamiltonian system; Flow (mathematics); Inertia; Pure mathematics; Bracket; Mathematical analysis; Mathematical physics; Classical mechanics; Physics; Geometry","score_opus":0.06308317415358966,"score_gpt":0.3527143975767221,"score_spread":0.28963122342313247,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4327989000","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.13991012,0.00039391083,0.15613279,0.044012554,0.00069027743,0.0026098585,0.00017922214,0.0007358193,0.6553354],"genre_scores_gemma":[0.989399,0.000050353974,0.008437058,0.00006037657,0.00022648709,0.0001472726,0.00016272503,0.000025373314,0.0014913474],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991505,0.00009647686,0.00027127823,0.000105741405,0.00015785922,0.00021810147],"domain_scores_gemma":[0.9974837,0.0010398468,0.00006310479,0.0013195155,0.000049782637,0.00004405869],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.00036698775,0.00009570959,0.00013063416,0.00002317893,0.00035451524,0.00007188338,0.0007135306,0.00002594984,0.00005525373],"category_scores_gemma":[0.0000718873,0.00007197624,0.00006907741,0.00044004736,0.00016743387,0.000077708835,0.00034209026,0.00024182883,0.0011656907],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000015543125,0.0001654303,0.00021510434,0.000006739499,0.000018102312,2.4455184e-7,0.00080016913,0.00018577253,0.00003537902,0.97631735,0.00082217215,0.021431994],"study_design_scores_gemma":[0.00012154686,0.000007702325,0.00021459216,0.000025376336,0.000008872872,2.1982191e-7,0.0008567757,0.13619715,0.00006717046,0.8586497,0.0037692203,0.000081692335],"about_ca_topic_score_codex":0.00002346703,"about_ca_topic_score_gemma":0.0000056836784,"teacher_disagreement_score":0.8494889,"about_ca_system_score_codex":0.000021165244,"about_ca_system_score_gemma":0.00005951796,"threshold_uncertainty_score":0.99961203},"labels":[],"label_agreement":null},{"id":"W4360981001","doi":"10.1007/s00220-023-04670-4","title":"Lagrangian Grassmannians, CKP Hierarchy and Hyperdeterminantal Relations","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University; Université de Montréal; Concordia University","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Grassmannian; Linear subspace; Mathematics; Symplectic geometry; Symplectic vector space; Projection (relational algebra); Combinatorics; Symplectic manifold; Pure mathematics; Symplectic representation","score_opus":0.07928121037031513,"score_gpt":0.354375575988924,"score_spread":0.2750943656186089,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4360981001","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.98980904,0.000107346845,0.002150729,0.0012120836,0.000089720146,0.00072208984,0.0000066972925,0.00027403905,0.0056282287],"genre_scores_gemma":[0.99025345,0.00006083049,0.0091785295,0.000021579395,0.000041872387,0.000129423,0.000008705873,0.000034065084,0.00027153836],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987711,0.00016663656,0.0004020974,0.0002074944,0.00021000348,0.00024267928],"domain_scores_gemma":[0.9965019,0.0019288834,0.00008059878,0.001369906,0.00004602003,0.0000726491],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004065093,0.0001620946,0.00028694735,0.000107420456,0.00025890337,0.000053915388,0.0006194306,0.0000842755,0.00002079769],"category_scores_gemma":[0.0005413407,0.00014935617,0.000066960434,0.00068171276,0.0002224787,0.00016866969,0.00054124685,0.00033442077,0.00010227239],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000035804767,0.00026806514,0.0011208096,0.00004762407,0.000016625158,0.000002586776,0.0028586606,0.000004056341,0.000030162642,0.99316,0.00025599508,0.002231804],"study_design_scores_gemma":[0.0003148501,0.000036995287,0.0025003862,0.00010154756,0.000037501388,0.0000041412995,0.0007954983,0.008249254,0.000013851508,0.98768187,0.00010259595,0.00016151053],"about_ca_topic_score_codex":0.000008262927,"about_ca_topic_score_gemma":0.000015810905,"teacher_disagreement_score":0.008245197,"about_ca_system_score_codex":0.00004359977,"about_ca_system_score_gemma":0.000028435426,"threshold_uncertainty_score":0.60905683},"labels":[],"label_agreement":null},{"id":"W4361197154","doi":"10.1007/s00220-024-04988-7","title":"Jánossy Densities and Darboux Transformations for the Stark and Cylindrical KdV Equations","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University","funders":"Fundação para a Ciência e a Tecnologia; Fonds De La Recherche Scientifique - FNRS","keywords":"Korteweg–de Vries equation; Mathematics; Superposition principle; Airy function; Mathematical analysis; Mathematical physics; Differential equation; Kernel (algebra); Point (geometry); Nonlinear system; Pure mathematics; Physics; Quantum mechanics; Geometry","score_opus":0.1208767021512096,"score_gpt":0.3927126900280314,"score_spread":0.2718359878768218,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4361197154","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.008632503,0.003311074,0.96751386,0.0135974195,0.000040235132,0.0016401651,0.000101676145,0.00016780176,0.004995285],"genre_scores_gemma":[0.93678254,0.001011897,0.060858876,0.00007804831,0.000063611464,0.001018106,0.000023398563,0.00003255052,0.0001310019],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99898255,0.00006744009,0.00045047072,0.00017244426,0.0001416623,0.00018545285],"domain_scores_gemma":[0.9869406,0.011997608,0.000051789066,0.0008866389,0.00006951847,0.000053843516],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00056216546,0.0001493147,0.00023144326,0.00006434494,0.0005135729,0.00023637069,0.00039452437,0.00006543475,0.000010896356],"category_scores_gemma":[0.00037110396,0.000108277716,0.000080017984,0.00036537342,0.0004099343,0.00021547744,0.00015060235,0.0002784135,0.000012825385],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000033250917,0.00011272311,0.000004531504,0.0002571605,0.000034654757,1.10642056e-7,0.0027395613,0.000012647056,0.000026751297,0.98655283,0.0003726268,0.009883045],"study_design_scores_gemma":[0.00022217786,0.000011280455,0.000041231368,0.00008842987,0.00011540846,0.0000050319886,0.0008236124,0.2511161,0.00001266094,0.7443535,0.0031098812,0.000100733574],"about_ca_topic_score_codex":0.0000058747087,"about_ca_topic_score_gemma":0.000026603662,"teacher_disagreement_score":0.92815,"about_ca_system_score_codex":0.000032705757,"about_ca_system_score_gemma":0.000046848054,"threshold_uncertainty_score":0.4415437},"labels":[],"label_agreement":null},{"id":"W4362600104","doi":"10.1007/s00220-023-04688-8","title":"Twisted Self-Similarity and the Einstein Vacuum Equations","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":4,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Alfred P. Sloan Foundation; National Science Foundation","keywords":"Homothetic transformation; Einstein; Naked singularity; Gravitational singularity; Uniqueness; Killing vector field; Hypersurface; Singularity; Mathematical physics; Vector field; Physics; Einstein field equations; Mathematics; Pure mathematics; Mathematical analysis; Quantum mechanics; Geometry","score_opus":0.038161868033130195,"score_gpt":0.3076867468735088,"score_spread":0.26952487884037857,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4362600104","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.13110894,0.00026332494,0.42762876,0.026605897,0.0001670066,0.0029593182,0.00015170575,0.0008969818,0.41021806],"genre_scores_gemma":[0.99644816,0.000025499414,0.0030405547,0.00008625241,0.000066376124,0.0001483905,0.000055072567,0.00002117075,0.000108538654],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988965,0.00022604677,0.00032499337,0.00016426171,0.00015348774,0.00023472268],"domain_scores_gemma":[0.9964493,0.0019700483,0.0000748543,0.0013891617,0.000058161895,0.000058456302],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005432219,0.000144658,0.00025871745,0.000031625805,0.0003063299,0.00007898744,0.0006759209,0.00003725189,0.000039174392],"category_scores_gemma":[0.000050697137,0.00010639442,0.00009721551,0.00068759,0.0006934228,0.00010599987,0.0006466559,0.00038983984,0.00025915465],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000036900583,0.00025020845,0.00015348998,0.000017829045,0.000032685228,1.09215634e-7,0.0010549137,0.000019706074,0.0000054646207,0.99603605,0.000104667226,0.0023211816],"study_design_scores_gemma":[0.0006480045,0.000005427456,0.00021260098,0.000030648214,0.00003870028,1.3606973e-7,0.00044160322,0.09329958,0.000026382435,0.9048962,0.0002880592,0.00011267392],"about_ca_topic_score_codex":0.00001438461,"about_ca_topic_score_gemma":0.0000016288385,"teacher_disagreement_score":0.8653392,"about_ca_system_score_codex":0.000017473347,"about_ca_system_score_gemma":0.000029657393,"threshold_uncertainty_score":0.43386385},"labels":[],"label_agreement":null},{"id":"W4379209221","doi":"10.1007/s00220-023-04754-1","title":"Affine Laumon Spaces and Iterated $${\\mathcal W}$$-Algebras","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"National Science Foundation","keywords":"Mathematics; Iterated function; Vertex operator algebra; Pure mathematics; Affine transformation; Vertex (graph theory); Conjecture; Cohomology; Hamiltonian (control theory); Discrete mathematics; Algebra over a field; Algebra representation; Jordan algebra; Mathematical analysis; Graph","score_opus":0.10119359312585537,"score_gpt":0.3680961551617854,"score_spread":0.26690256203593005,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4379209221","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9824411,0.00019812943,0.0032043774,0.0023627363,0.00012783089,0.00056081236,0.00000937363,0.00049839,0.010597246],"genre_scores_gemma":[0.9873459,0.00012985221,0.011937877,0.000052219108,0.000068705216,0.000087718916,0.000020957992,0.000041736555,0.00031506873],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99870694,0.00013437978,0.0004245495,0.00022332068,0.0002279573,0.00028286342],"domain_scores_gemma":[0.9969212,0.0014345708,0.0001026633,0.0013957977,0.000066680026,0.00007907958],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00037512658,0.00019858166,0.00036839172,0.00009230207,0.00017379427,0.00009743555,0.00066159613,0.00011272158,0.000042381507],"category_scores_gemma":[0.0005020467,0.00017697811,0.00006360547,0.0007941749,0.00024250399,0.00014687913,0.0006727734,0.0003359945,0.00009624414],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004674748,0.00014156282,0.00012225281,0.00008808515,0.000017817263,0.000001694149,0.001221914,0.0000062834238,0.00007851537,0.99598175,0.00048161732,0.0018538536],"study_design_scores_gemma":[0.00035024295,0.000021598531,0.00034761563,0.00011677635,0.000021930757,0.000003772643,0.0002797095,0.0167564,0.00009676758,0.98150915,0.00030979415,0.00018626048],"about_ca_topic_score_codex":0.0000060101574,"about_ca_topic_score_gemma":0.00000848697,"teacher_disagreement_score":0.016750116,"about_ca_system_score_codex":0.00003892011,"about_ca_system_score_gemma":0.00002644814,"threshold_uncertainty_score":0.7216958},"labels":[],"label_agreement":null},{"id":"W4383535997","doi":"10.1007/s00220-023-04779-6","title":"Phase Transition Threshold and Stability of Magnetic Skyrmions","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Magnetic properties of thin films","field":"Physics and Astronomy","cited_by":2,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Victoria","funders":"Natural Sciences and Engineering Research Council of Canada; Japan Society for the Promotion of Science London","keywords":"Skyrmion; Infimum and supremum; Counterexample; Physics; Condensed matter physics; Phase transition; Ground state; Bounded function; Phase (matter); Vortex; Magnetic field; Energy functional; Quantum mechanics; Mathematics; Mathematical analysis; Combinatorics","score_opus":0.0666964872990859,"score_gpt":0.32427739037583525,"score_spread":0.25758090307674936,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4383535997","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.95244336,0.00018256989,0.009944132,0.0017560668,0.000025865245,0.0005752179,0.00008483929,0.0000811102,0.03490682],"genre_scores_gemma":[0.99400496,0.000021881322,0.0057708486,0.000014440051,0.000014070077,0.00007862965,0.00004496641,0.000011416739,0.000038772137],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9992368,0.000066599925,0.00032240895,0.00012322758,0.000110726905,0.0001401863],"domain_scores_gemma":[0.9984883,0.00025703703,0.00005421846,0.0011142759,0.0000442639,0.00004190113],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00027227975,0.00009340768,0.00019884572,0.00003973828,0.00007479986,0.000016056974,0.00040737976,0.000025111543,0.0002366622],"category_scores_gemma":[0.000025978687,0.000088808774,0.000051631436,0.0003200288,0.00036777186,0.00008859339,0.00025314197,0.00017101664,0.00004343907],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001636609,0.0033644056,0.0010422933,0.0002477869,0.00002506375,2.6027905e-7,0.005372049,0.000044305754,0.005887631,0.94588083,0.00031003525,0.03780898],"study_design_scores_gemma":[0.00091977144,0.00010371158,0.00031437585,0.00009178926,0.0000323314,2.3974343e-7,0.0011232612,0.111416735,0.0022634156,0.88349515,0.00009799261,0.00014122685],"about_ca_topic_score_codex":0.000017416436,"about_ca_topic_score_gemma":0.0000014932383,"teacher_disagreement_score":0.111372426,"about_ca_system_score_codex":0.000008820327,"about_ca_system_score_gemma":0.000020498654,"threshold_uncertainty_score":0.36215168},"labels":[],"label_agreement":null},{"id":"W4385368452","doi":"10.1007/s00220-023-04762-1","title":"Quantization of ($$-1$$)-Shifted Derived Poisson Manifolds","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Homotopy and Cohomology in Algebraic Topology","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"National Science Foundation","keywords":"Poisson manifold; Mathematics; Poisson distribution; Pure mathematics; Lie algebroid; Cohomology; Poisson bracket; Poisson algebra; Manifold (fluid mechanics); Canonical quantization; Quantization (signal processing); Differential geometry; Mathematical analysis; Lie algebra; Symplectic geometry; Quantum; Physics; Quantum mechanics","score_opus":0.12214844169551047,"score_gpt":0.3906500141345189,"score_spread":0.2685015724390084,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4385368452","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.92525584,0.00008106346,0.04937272,0.0027098197,0.00009877563,0.0006763656,0.000015905758,0.0004295325,0.021359978],"genre_scores_gemma":[0.9574686,0.00009587333,0.042026076,0.00004436061,0.000020517502,0.00008861212,0.000042046508,0.000029728872,0.00018417896],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99848247,0.00030568827,0.0006182837,0.00017089077,0.00017156694,0.00025110753],"domain_scores_gemma":[0.99595284,0.0020125716,0.0001990008,0.0017038393,0.00009093095,0.000040789513],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00061704544,0.00014343298,0.00039626495,0.00013561203,0.00010005844,0.000009448418,0.0009049637,0.00015702179,0.00008866139],"category_scores_gemma":[0.0009242671,0.00014359916,0.00008975716,0.00096500246,0.00042576555,0.00008798357,0.0004054488,0.0002621741,0.00021643139],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000005674052,0.00040717467,0.00043376256,0.000127603,0.000026986121,0.0000021081703,0.0014350367,0.0000059876215,0.00097534724,0.99512297,0.00023499009,0.0012223893],"study_design_scores_gemma":[0.00028753784,0.000030248353,0.0012100843,0.00009235214,0.000029521516,0.0000044653816,0.0003807378,0.008768882,0.0019288879,0.9870717,0.000067800065,0.0001277729],"about_ca_topic_score_codex":0.000006398414,"about_ca_topic_score_gemma":0.000017476834,"teacher_disagreement_score":0.032212764,"about_ca_system_score_codex":0.000034953257,"about_ca_system_score_gemma":0.00004055694,"threshold_uncertainty_score":0.58558035},"labels":[],"label_agreement":null},{"id":"W4385582204","doi":"10.1007/s00220-023-04812-8","title":"Gravitational Blocks, Spindles and GK Geometry","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":32,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Science and Technology Facilities Council; Institut Périmètre de physique théorique","keywords":"Algorithm; Supergravity; Physics; Geometry; Mathematical physics; Computer science; Supersymmetry; Mathematics","score_opus":0.03259584008978783,"score_gpt":0.31677267119311453,"score_spread":0.2841768311033267,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4385582204","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.74439085,0.00020819574,0.09618692,0.0034883919,0.00010180631,0.00081709697,0.00016613136,0.0003106003,0.15432999],"genre_scores_gemma":[0.9929032,0.000018354995,0.006607478,0.000039762013,0.00007728195,0.000057866317,0.00011279014,0.000020050546,0.00016326152],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991585,0.00005477834,0.0002571238,0.00016478471,0.00014592258,0.00021888119],"domain_scores_gemma":[0.9985295,0.00050776405,0.00005398325,0.00079255673,0.000047010748,0.000069172165],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00021381155,0.00012896681,0.00020032754,0.000059749942,0.00015064701,0.0000507628,0.0004273985,0.000033288306,0.00008302068],"category_scores_gemma":[0.000027173945,0.00012378026,0.00006281874,0.0006484859,0.00038932747,0.00010329933,0.00043369576,0.00026107935,0.00029955758],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000012477694,0.00021444442,0.0015786134,0.000018181012,0.000017046026,1.9010282e-7,0.00025517386,0.000027377091,0.000034037803,0.99093324,0.00022753091,0.006692906],"study_design_scores_gemma":[0.00019969296,0.000009150472,0.0016301946,0.000047540012,0.00001392867,2.535383e-7,0.0004107871,0.009020659,0.00010209819,0.98813444,0.00029453984,0.0001366911],"about_ca_topic_score_codex":0.000006308792,"about_ca_topic_score_gemma":4.8445787e-7,"teacher_disagreement_score":0.24851228,"about_ca_system_score_codex":0.000012063903,"about_ca_system_score_gemma":0.000021395143,"threshold_uncertainty_score":0.5047613},"labels":[],"label_agreement":null},{"id":"W4386543865","doi":"10.1007/s00220-023-04828-0","title":"Quantizing the Non-linear Graviton","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":22,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Mathematical Institute, University of Oxford; European Research Council; Science and Technology Facilities Council; Institut Périmètre de physique théorique","keywords":"Twistor theory; Twistor space; Graviton; Holomorphic function; Anomaly (physics); Mathematical physics; Physics; Quantum gravity; Quantum field theory; Space (punctuation); Quantum mechanics; Quantum; Mathematics; Gravitation; Pure mathematics","score_opus":0.055139345957147895,"score_gpt":0.3452345132983585,"score_spread":0.29009516734121066,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4386543865","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.2345506,0.00007947031,0.39419183,0.008603641,0.0003654865,0.0015891208,0.00007369137,0.00043696168,0.3601092],"genre_scores_gemma":[0.9969405,0.000011177789,0.002453396,0.000058605212,0.00014747774,0.000085402135,0.000053904736,0.000027905291,0.00022164705],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.999021,0.0000920164,0.00029660235,0.00015177739,0.00016032535,0.00027825596],"domain_scores_gemma":[0.9975804,0.00058691466,0.00006826965,0.0016707812,0.000046325506,0.00004732114],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.00036589574,0.00013923267,0.00020471227,0.000028805005,0.0002634428,0.000046516474,0.0010347848,0.0000303529,0.000044935307],"category_scores_gemma":[0.00002266371,0.00010182135,0.000120607736,0.0008150195,0.0003883563,0.00008950463,0.00056414236,0.0004181787,0.001270282],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000012763358,0.00018964782,0.0005736037,0.000012765137,0.000015341653,1.9280725e-7,0.00051396544,0.000084461084,0.000041787574,0.99377805,0.00030825092,0.004480641],"study_design_scores_gemma":[0.00014500898,0.000006941602,0.00034216445,0.00005079496,0.000015356374,8.51653e-8,0.00065746193,0.06361212,0.00019365028,0.9341947,0.0006635643,0.00011816457],"about_ca_topic_score_codex":0.000014623722,"about_ca_topic_score_gemma":8.514418e-7,"teacher_disagreement_score":0.7623899,"about_ca_system_score_codex":0.000014008196,"about_ca_system_score_gemma":0.000023363187,"threshold_uncertainty_score":0.99950737},"labels":[],"label_agreement":null},{"id":"W4386739169","doi":"10.1007/s00220-023-04832-4","title":"Critical Measures on Higher Genus Riemann Surfaces","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical functions and polynomials","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Concordia University","funders":"Vlaamse regering; Natural Sciences and Engineering Research Council of Canada; Fonds Wetenschappelijk Onderzoek","keywords":"Riemann surface; Mathematics; Meromorphic function; Measure (data warehouse); Random matrix; Riemann sphere; Pure mathematics; Mathematical analysis; Orthogonality; Orthogonal polynomials; Quantum mechanics; Geometry; Eigenvalues and eigenvectors; Physics","score_opus":0.24762366925655563,"score_gpt":0.42261858631112825,"score_spread":0.17499491705457262,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4386739169","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.1181123,0.0005221126,0.051009208,0.02812095,0.001200101,0.0031331272,0.00019650966,0.0033094033,0.7943963],"genre_scores_gemma":[0.9431022,0.00013909237,0.05132414,0.00032515416,0.00021607657,0.00045207478,0.000031899825,0.000120181096,0.0042892294],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9974751,0.0003620481,0.000806079,0.00032855634,0.0005172795,0.00051094603],"domain_scores_gemma":[0.9861625,0.010597434,0.000108295564,0.0028314271,0.00014862398,0.00015172084],"candidate_categories":["metaepi_narrow","insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0012542537,0.00030216735,0.0005826673,0.00015961284,0.00032212533,0.00011004573,0.0011294156,0.00016816215,0.00045790806],"category_scores_gemma":[0.0037528912,0.0002596751,0.00018819752,0.001039399,0.0004696454,0.00017320592,0.00045946063,0.0005475294,0.003330808],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009333356,0.00083419506,0.000032024738,0.00021129369,0.000028723445,0.0000034619877,0.00041652826,0.000034171364,0.00008771648,0.9838826,0.0121913375,0.0022685938],"study_design_scores_gemma":[0.00024635487,0.000046736546,0.0001614575,0.00025887322,0.000044893153,0.0000025138086,0.00014974191,0.0073054107,0.00017021436,0.981456,0.009870681,0.00028712014],"about_ca_topic_score_codex":0.0000043173304,"about_ca_topic_score_gemma":0.000005707298,"teacher_disagreement_score":0.82498986,"about_ca_system_score_codex":0.00008325644,"about_ca_system_score_gemma":0.00004489207,"threshold_uncertainty_score":0.9999856},"labels":[],"label_agreement":null},{"id":"W4386991623","doi":"10.1007/s00220-023-04843-1","title":"Rigid Tensor Structure on Big Module Categories for Some W-(super)algebras in Type A","year":2023,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":7,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Vertex operator algebra; Mathematics; Vertex (graph theory); Superalgebra; Simple module; Tensor product; Pure mathematics; Indecomposable module; Algebraic structure; Combinatorics; Simple (philosophy); Algebra over a field; Algebra representation; Jordan algebra; Graph","score_opus":0.1127162953010739,"score_gpt":0.3611857854346366,"score_spread":0.24846949013356268,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4386991623","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9903833,0.00017412317,0.002530386,0.0019577777,0.00074080145,0.0017960988,0.00006837048,0.000360608,0.0019884952],"genre_scores_gemma":[0.9905246,0.00006299965,0.008568262,0.00011727136,0.00020106813,0.00022301996,0.000055928773,0.00006620508,0.00018066718],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99843097,0.000108138134,0.00053356413,0.00028361942,0.00025792726,0.00038575663],"domain_scores_gemma":[0.9958404,0.0019553073,0.00010946835,0.0019310152,0.00010158295,0.00006225379],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002860515,0.00025315073,0.00048182817,0.00015601818,0.00016871853,0.000053778505,0.0010409459,0.00014718687,0.000020620764],"category_scores_gemma":[0.0009965629,0.00022132552,0.00010609312,0.0009200181,0.00018643169,0.00012530271,0.00034137885,0.00043442452,0.00005841175],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000023646866,0.00023282145,0.000059750928,0.00014808436,0.000020177995,7.465356e-7,0.0010071242,0.00012987283,0.00007057146,0.9961103,0.0006576854,0.001539189],"study_design_scores_gemma":[0.0005989645,0.00006490849,0.00017437711,0.000114917944,0.000020144365,0.0000012278161,0.00027961182,0.01166287,0.00027868332,0.98625845,0.00030839266,0.00023745243],"about_ca_topic_score_codex":0.00000923661,"about_ca_topic_score_gemma":0.000024794723,"teacher_disagreement_score":0.011532997,"about_ca_system_score_codex":0.00011541921,"about_ca_system_score_gemma":0.00007552935,"threshold_uncertainty_score":0.9025393},"labels":[],"label_agreement":null},{"id":"W4387391775","doi":"10.1007/s00220-024-05179-0","title":"Estimating Rank-One Matrices with Mismatched Prior and Noise: Universality and Large Deviations","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Random Matrices and Applications","field":"Mathematics","cited_by":10,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"HORIZON EUROPE European Research Council; Schweizerischer Nationalfonds zur Förderung der Wissenschaftlichen Forschung","keywords":"Universality (dynamical systems); Mathematics; Rank (graph theory); Statistical physics; Statistics; Combinatorics; Physics; Quantum mechanics","score_opus":0.05623545316605232,"score_gpt":0.35390427562625765,"score_spread":0.2976688224602053,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4387391775","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.19303706,0.003236202,0.7909553,0.0037477673,0.000024499503,0.0013606705,0.000066550565,0.00041132479,0.0071606333],"genre_scores_gemma":[0.6906933,0.00043267864,0.30854228,0.000025358566,0.000033030177,0.00013620479,0.000015011376,0.000032529446,0.00008960801],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988185,0.00010130707,0.0004136504,0.000265326,0.00018361464,0.00021757571],"domain_scores_gemma":[0.9962749,0.002467696,0.00010888256,0.000996469,0.000069934664,0.00008211928],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005622416,0.00018200227,0.0003384211,0.0000863877,0.00031879023,0.000193512,0.00037045556,0.00007045155,0.00001941905],"category_scores_gemma":[0.00018695496,0.00015505104,0.000042006966,0.00063594925,0.00023650467,0.00028389262,0.00030266924,0.0003123531,0.000020204174],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000065550394,0.0003680124,0.00017466521,0.0009146497,0.00005148032,0.000001087132,0.002424135,0.000007897389,0.00009704916,0.9923863,0.00012173902,0.0034464363],"study_design_scores_gemma":[0.0006742467,0.000016502005,0.00023950517,0.0005462033,0.00018483351,0.000011850588,0.0006473107,0.141681,0.00003022617,0.8550546,0.00070124614,0.0002124801],"about_ca_topic_score_codex":0.00001003951,"about_ca_topic_score_gemma":0.00001954327,"teacher_disagreement_score":0.49765623,"about_ca_system_score_codex":0.00004716383,"about_ca_system_score_gemma":0.000049986364,"threshold_uncertainty_score":0.63227975},"labels":[],"label_agreement":null},{"id":"W4390920401","doi":"10.1007/s00220-023-04900-9","title":"Eigenvectors of the Square Grid Plus GUE","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Stochastic processes and statistical mechanics","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"The Scarborough Hospital; University of Toronto","funders":"","keywords":"Torus; Eigenvalues and eigenvectors; Mathematics; Square (algebra); Gaussian; Mathematical analysis; Complex system; Physics; Statistical physics; Geometry; Quantum mechanics; Computer science","score_opus":0.12266280100304751,"score_gpt":0.3901841707567396,"score_spread":0.2675213697536921,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4390920401","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0025432755,0.00066000834,0.9808276,0.0014552579,0.00026332054,0.00061260734,0.00009812422,0.00013511202,0.013404678],"genre_scores_gemma":[0.92732173,0.00004996549,0.072237834,0.000047089117,0.00006277074,0.000094401636,0.00000784823,0.00003771425,0.00014066516],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987676,0.0000927753,0.000511122,0.00016112649,0.00027847255,0.00018888358],"domain_scores_gemma":[0.9950662,0.0030392476,0.000081632665,0.0016858123,0.00008407126,0.00004300912],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00033364864,0.00014641257,0.00029772523,0.000039154023,0.000095816984,0.000035907284,0.0011528161,0.000071796305,0.000065197084],"category_scores_gemma":[0.0015270476,0.000100276826,0.00013037909,0.00067267986,0.0002558384,0.00006992856,0.00052350806,0.00039263972,0.000054495216],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000019193646,0.00016988639,0.0000047087997,0.00071823684,0.000019787396,6.6152637e-7,0.00093091436,0.000016551154,0.000046639558,0.9949892,0.00082833297,0.0022731668],"study_design_scores_gemma":[0.00008578684,0.00001545056,0.000016937756,0.0005536658,0.000049391754,0.000003614958,0.00019215712,0.099928364,0.00023702542,0.89844567,0.00037147268,0.00010044585],"about_ca_topic_score_codex":0.0000043108603,"about_ca_topic_score_gemma":0.000009340487,"teacher_disagreement_score":0.92477846,"about_ca_system_score_codex":0.00008589962,"about_ca_system_score_gemma":0.00011184051,"threshold_uncertainty_score":0.40891704},"labels":[],"label_agreement":null},{"id":"W4391287995","doi":"10.1007/s00220-023-04917-0","title":"Twisted Holography and Celestial Holography from Boundary Chiral Algebra","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Black Holes and Theoretical Physics","field":"Physics and Astronomy","cited_by":11,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"","keywords":"Holography; Complex system; Algebra over a field; Boundary (topology); Physics; Theoretical physics; Pure mathematics; Mathematics; Optics; Computer science; Mathematical analysis; Artificial intelligence","score_opus":0.019477969139790233,"score_gpt":0.2897355128854673,"score_spread":0.27025754374567706,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4391287995","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6436367,0.0031987685,0.22292536,0.0020900785,0.00027178598,0.0008387429,0.00044514373,0.0004487766,0.12614462],"genre_scores_gemma":[0.9894601,0.00004275898,0.009909753,0.0000759274,0.0001919912,0.00006831232,0.00018678237,0.000038852915,0.000025519133],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99875146,0.00012645569,0.0003622433,0.00033251522,0.00014419918,0.000283113],"domain_scores_gemma":[0.9979594,0.0006728713,0.000049695667,0.0011826361,0.00003410469,0.000101327874],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00015983525,0.00023441868,0.00032503554,0.00006279301,0.00016507915,0.00021432705,0.00061895046,0.00007338301,0.00010821667],"category_scores_gemma":[0.000010261965,0.00021407167,0.00018538408,0.0006199087,0.0011545194,0.00019011363,0.00046213806,0.00062791596,0.000109502515],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000042715315,0.0003668486,0.0013202372,0.00003154378,0.000076174976,0.0000013916626,0.0005332344,0.0000021505562,0.00005914186,0.97787154,0.000159593,0.019573903],"study_design_scores_gemma":[0.00021915471,0.000024216477,0.001192714,0.00014703406,0.00006752555,6.6060346e-7,0.0001818626,0.0051489896,0.000096785494,0.9916744,0.001012932,0.00023370939],"about_ca_topic_score_codex":0.00002747833,"about_ca_topic_score_gemma":0.00000131299,"teacher_disagreement_score":0.34582338,"about_ca_system_score_codex":0.000013100731,"about_ca_system_score_gemma":0.000035031724,"threshold_uncertainty_score":0.8729589},"labels":[],"label_agreement":null},{"id":"W4391566643","doi":"10.1007/s00220-023-04894-4","title":"On the 1d Cubic NLS with a Non-generic Potential","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Mathematical Physics Problems","field":"Mathematics","cited_by":4,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Complex system; NLS; Cubic crystal system; Mathematics; Physics; Statistical physics; Mathematical physics; Computer science; Condensed matter physics; Artificial intelligence; Psychology; Neuroscience","score_opus":0.08752449657584427,"score_gpt":0.35859613600417367,"score_spread":0.2710716394283294,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4391566643","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.017377613,0.00020289866,0.915872,0.004903531,0.00008218112,0.001560949,0.000017295362,0.00043892712,0.059544653],"genre_scores_gemma":[0.8874304,0.0000405843,0.11104287,0.000232471,0.00007741785,0.00058604614,0.000009961048,0.000121744895,0.0004585047],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99788404,0.00017358985,0.00061252865,0.0003793522,0.0005176631,0.00043280347],"domain_scores_gemma":[0.9911415,0.00523674,0.00012275115,0.003316472,0.00009225785,0.000090301655],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00063391944,0.0003626345,0.00046811783,0.00008652989,0.00025165887,0.00017253486,0.0015805851,0.000092158254,0.000116012256],"category_scores_gemma":[0.00041148823,0.00022330874,0.00016928073,0.0010309708,0.0005850105,0.0002457128,0.0005030854,0.00093936775,0.00070635154],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008047649,0.00074349716,5.203732e-7,0.00034811738,0.000060806393,0.0000067962837,0.0007751397,0.00020106146,0.00062912545,0.9943955,0.0011808494,0.001650556],"study_design_scores_gemma":[0.00018581128,0.00006434162,0.0000022257132,0.0007623676,0.000071905604,0.00001144734,0.00015877718,0.09852869,0.00038779055,0.89939994,0.00016460459,0.00026208564],"about_ca_topic_score_codex":0.0000015273722,"about_ca_topic_score_gemma":0.0000028863678,"teacher_disagreement_score":0.8700528,"about_ca_system_score_codex":0.00013988565,"about_ca_system_score_gemma":0.00008894909,"threshold_uncertainty_score":0.91062665},"labels":[],"label_agreement":null},{"id":"W4391676783","doi":"10.1007/s00220-023-04908-1","title":"A Synthetic Null Energy Condition","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometric Analysis and Curvature Flows","field":"Mathematics","cited_by":9,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Canada Research Chairs; Fields Institute for Research in Mathematical Sciences; Simons Foundation","keywords":"Complex system; Mathematics; Physics; Computer science; Artificial intelligence","score_opus":0.07362574837362798,"score_gpt":0.366288517279974,"score_spread":0.292662768906346,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4391676783","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00478448,0.002967507,0.8656591,0.0024577505,0.00013210201,0.0003119257,0.000022176928,0.00046205713,0.123202875],"genre_scores_gemma":[0.96958613,0.00017946048,0.029123586,0.00007272265,0.000054331285,0.00012299948,0.00003280799,0.000034990488,0.0007929382],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987146,0.00014433436,0.00045916814,0.00022365748,0.00025100846,0.00020718008],"domain_scores_gemma":[0.9960641,0.0020284452,0.00006179296,0.0017239929,0.0000652541,0.00005635999],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00047933837,0.00016194115,0.00031755626,0.00018101365,0.00009482642,0.00012885226,0.0006933345,0.00009387158,0.00026677846],"category_scores_gemma":[0.00045327624,0.00013850481,0.0001753559,0.001362466,0.0001643153,0.00018379446,0.00022758034,0.00032421885,0.00028667564],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[8.228741e-7,0.00036198364,0.0000047381163,0.00012741766,0.000043841548,0.0000024781496,0.00032504252,0.000007833717,0.00004828606,0.9831661,0.0018172304,0.014094243],"study_design_scores_gemma":[0.00007046445,0.00001065595,0.0000068641507,0.00026286798,0.00008389505,0.000006004064,0.00014839295,0.07801397,0.00007069239,0.91309214,0.008091378,0.00014267552],"about_ca_topic_score_codex":0.0000056009394,"about_ca_topic_score_gemma":0.00000862261,"teacher_disagreement_score":0.96480167,"about_ca_system_score_codex":0.00008328861,"about_ca_system_score_gemma":0.000038740178,"threshold_uncertainty_score":0.5648062},"labels":[],"label_agreement":null},{"id":"W4391716568","doi":"10.1007/s00220-023-04889-1","title":"3-Manifolds and VOA Characters","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":19,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Nederlandse Organisatie voor Wetenschappelijk Onderzoek; Office of Science; National Research University Higher School of Economics; American Institute of Mathematics; Canada Research Chairs; High Energy Physics; U.S. Department of Energy; National Science Foundation","keywords":"Vertex (graph theory); Mathematics; Pure mathematics; Algorithm; Combinatorics","score_opus":0.07522090315007286,"score_gpt":0.3591694740481568,"score_spread":0.28394857089808395,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4391716568","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8529266,0.004786404,0.059177022,0.008464456,0.0009905972,0.0017674025,0.000026918759,0.0012071239,0.07065345],"genre_scores_gemma":[0.9882903,0.00014274097,0.011197315,0.000054344473,0.00007104543,0.000050045128,0.000005055615,0.000030444899,0.00015867574],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991592,0.00006402876,0.00029637545,0.0001737533,0.00014365066,0.00016296045],"domain_scores_gemma":[0.9977046,0.0011130896,0.000035638852,0.0010695345,0.000026280195,0.000050820978],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00023858102,0.00013630776,0.00022137664,0.000048439702,0.000083193765,0.000104409715,0.0004785454,0.000073408766,0.00002906167],"category_scores_gemma":[0.00014685837,0.00011822476,0.00005905611,0.00024422986,0.00016413798,0.0001531871,0.00034721039,0.0003065109,0.000043355045],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000001254606,0.00008009877,0.0000135985865,0.00014297872,0.000018454251,0.0000013036722,0.0009645417,4.791672e-7,0.000030618627,0.9949375,0.00016970206,0.003639481],"study_design_scores_gemma":[0.00009870128,0.000011385084,0.00007005989,0.00020674363,0.000026744132,0.000006039953,0.00008587084,0.00868358,0.000038546546,0.99014956,0.00049437914,0.00012838584],"about_ca_topic_score_codex":0.000002909986,"about_ca_topic_score_gemma":0.0000018212594,"teacher_disagreement_score":0.13536371,"about_ca_system_score_codex":0.000044974753,"about_ca_system_score_gemma":0.000026823735,"threshold_uncertainty_score":0.48210657},"labels":[],"label_agreement":null},{"id":"W4391981304","doi":"10.1007/s00220-023-04877-5","title":"Exactly Solvable Anharmonic Oscillator, Degenerate Orthogonal Polynomials and Painlevé II","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Non-Hermitian Physics","field":"Physics and Astronomy","cited_by":0,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal; Concordia University; Université du Québec à Montréal","funders":"H2020 Marie Skłodowska-Curie Actions; Horizon 2020 Framework Programme; Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Natural Sciences and Engineering Research Council of Canada; European Commission; Scuola Internazionale Superiore di Studi Avanzati; Gruppo Nazionale per la Fisica Matematica; Istituto Nazionale di Alta Matematica \"Francesco Severi\"","keywords":"Algorithm; Physics; Computer science","score_opus":0.040116879725052845,"score_gpt":0.30495581912391206,"score_spread":0.2648389393988592,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4391981304","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.79752845,0.0044986308,0.12609044,0.002339527,0.0003802351,0.0011389222,0.0002888319,0.0003321515,0.067402795],"genre_scores_gemma":[0.9932177,0.000109628425,0.0057906443,0.00006751205,0.00020011447,0.00009841519,0.000060242077,0.000049587088,0.00040613263],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9986394,0.00011837076,0.00042891715,0.00031512257,0.00016645114,0.00033176242],"domain_scores_gemma":[0.99817747,0.00044117993,0.00007100858,0.0011489701,0.00005013576,0.00011124206],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00045560132,0.00023946768,0.00033545797,0.000058946378,0.00031384523,0.00017802413,0.00052882213,0.00005785259,0.00015405657],"category_scores_gemma":[0.000013480833,0.0002283324,0.000121716424,0.00036671778,0.00017148361,0.0002571268,0.0005935459,0.00042220094,0.00016996195],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000002366489,0.00027987733,0.00013590971,0.000063819716,0.000051747662,9.756567e-7,0.0003953073,0.000015644291,0.0020136484,0.9824729,0.00055046537,0.014017327],"study_design_scores_gemma":[0.00019404608,0.00003115959,0.000048416037,0.00020153524,0.000041227144,0.0000016332012,0.00011548738,0.11269017,0.0017888851,0.88131136,0.003297252,0.00027885404],"about_ca_topic_score_codex":0.000012104433,"about_ca_topic_score_gemma":0.0000024958758,"teacher_disagreement_score":0.19568925,"about_ca_system_score_codex":0.000041222433,"about_ca_system_score_gemma":0.00013152925,"threshold_uncertainty_score":0.9311125},"labels":[],"label_agreement":null},{"id":"W4392137892","doi":"10.1007/s00220-023-04895-3","title":"Multifractal Analysis of Measures Arising from Random Substitutions","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Engineering and Physical Sciences Research Council; Natural Sciences and Engineering Research Council of Canada; Universität Bielefeld; University of Birmingham","keywords":"Multifractal system; Statistics; Statistical physics; Mathematics; Econometrics; Physics; Fractal; Mathematical analysis","score_opus":0.1165011603508242,"score_gpt":0.3950006852034421,"score_spread":0.2784995248526179,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4392137892","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.11106847,0.00071703136,0.8706819,0.00045495498,0.00006325264,0.00044344933,0.00014196133,0.00017424308,0.016254757],"genre_scores_gemma":[0.9103455,0.00013295878,0.08925067,0.000014034597,0.00002686037,0.000064678505,0.00008593743,0.000030618638,0.00004877169],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9979281,0.00019071231,0.001003555,0.00026763286,0.00038171076,0.00022831204],"domain_scores_gemma":[0.98969406,0.007965352,0.00015852482,0.0019860931,0.00011894739,0.00007705147],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0008249727,0.00021643833,0.00081774144,0.00030727877,0.00010659442,0.00010110613,0.00084154774,0.00012539013,0.00016487381],"category_scores_gemma":[0.0014417128,0.00018663904,0.00044020708,0.0017697274,0.00039627426,0.00020165878,0.0002878654,0.00044198346,0.000056367964],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006277517,0.0008207077,0.00010256769,0.00017969807,0.00081128685,0.0000023800803,0.0016866095,0.00017260446,0.0006006486,0.9893353,0.000056474582,0.006225447],"study_design_scores_gemma":[0.00014175747,0.000004083672,0.00007791547,0.00023818134,0.0007490101,4.6197107e-7,0.00010893098,0.42899615,0.00009260456,0.5693948,0.00008416656,0.000111891684],"about_ca_topic_score_codex":0.000044909368,"about_ca_topic_score_gemma":0.00009180298,"teacher_disagreement_score":0.799277,"about_ca_system_score_codex":0.00008238533,"about_ca_system_score_gemma":0.000058437243,"threshold_uncertainty_score":0.76109195},"labels":[],"label_agreement":null},{"id":"W4392811127","doi":"10.1007/s00220-024-04969-w","title":"K-theoretic Classification of Inductive Limit Actions of Fusion Categories on AF-algebras","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":8,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"Directorate for Mathematical and Physical Sciences","keywords":"Limit (mathematics); Mathematics; Complex system; Pure mathematics; Fusion; Direct limit; Algebra over a field; Computer science; Artificial intelligence; Mathematical analysis; Linguistics","score_opus":0.20445144679695124,"score_gpt":0.43873638941938475,"score_spread":0.23428494262243352,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4392811127","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.76037425,0.00064970605,0.1699831,0.0028969438,0.00018551336,0.0021215747,0.00009092678,0.00032870803,0.06336926],"genre_scores_gemma":[0.9620812,0.00017787625,0.037371352,0.000007447076,0.000027210794,0.0001589313,0.000016840928,0.000046353867,0.00011278796],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99816585,0.00027360336,0.00070293865,0.00023883648,0.0004157205,0.0002030443],"domain_scores_gemma":[0.99346733,0.0039734305,0.00016299813,0.0020745047,0.0002684585,0.000053297732],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005683675,0.0001802411,0.00039400184,0.00022107294,0.00010510261,0.000029634053,0.0008432136,0.000118773205,0.0000743942],"category_scores_gemma":[0.0013537725,0.00015824496,0.00011765768,0.0011174303,0.00085149036,0.0002392539,0.00033950005,0.0006250094,0.0000709278],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000014930807,0.00086630386,0.000039101644,0.00055923563,0.000036998612,4.7437965e-7,0.0026931867,0.00001868788,0.0065293657,0.9832039,0.00007870539,0.0059591155],"study_design_scores_gemma":[0.00014203235,0.00008236985,0.00018654185,0.0005653963,0.000041354797,0.00000156656,0.0014596806,0.010801172,0.010770627,0.9757153,0.0001034536,0.00013054103],"about_ca_topic_score_codex":0.0000041809903,"about_ca_topic_score_gemma":0.000007805888,"teacher_disagreement_score":0.20170693,"about_ca_system_score_codex":0.00016387951,"about_ca_system_score_gemma":0.00013357768,"threshold_uncertainty_score":0.6453042},"labels":[],"label_agreement":null},{"id":"W4395446154","doi":"10.1007/s00220-024-04973-0","title":"A Q-Operator for Open Spin Chains II: Boundary Factorization","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Engineering and Physical Sciences Research Council; Centre de Recherches Mathématiques; Simons Foundation","keywords":"Factorization; Operator (biology); Diagonal; Mathematics; Pure mathematics; Affine transformation; Yang–Baxter equation; Operator algebra; Boundary (topology); Mathematical physics; Quantum mechanics; Physics; Quantum; Mathematical analysis; Algorithm; Chemistry; Geometry","score_opus":0.1374368740669798,"score_gpt":0.4258399459154599,"score_spread":0.28840307184848013,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4395446154","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.03397966,0.0013088654,0.9388859,0.0040846677,0.0009301326,0.004291103,0.00009497442,0.00049968733,0.01592496],"genre_scores_gemma":[0.933681,0.000048478334,0.064583935,0.0000973909,0.00017080053,0.00065524795,0.000050622148,0.000067069355,0.0006454712],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987384,0.00008421364,0.0004892367,0.00026788487,0.00018137805,0.00023889654],"domain_scores_gemma":[0.99714774,0.0010742573,0.00007069262,0.0015484103,0.00009643235,0.000062441206],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004184687,0.00019636693,0.00034900257,0.000058864996,0.0003775857,0.00036293172,0.0016315035,0.00011302795,0.000055194316],"category_scores_gemma":[0.00045010922,0.00017371472,0.00011392971,0.00041812932,0.00014229555,0.0003483115,0.0010702605,0.0002908153,0.000023117798],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000058626542,0.00027232667,0.0000054818033,0.0002267934,0.000033718574,3.2749705e-7,0.0017636529,0.000005141228,0.000063984364,0.9935051,0.0010718887,0.003045699],"study_design_scores_gemma":[0.00030425715,0.000051936815,0.000006458058,0.0002766665,0.00003683742,0.0000015436436,0.00013404951,0.032213297,0.00016245541,0.9610305,0.005583282,0.00019874291],"about_ca_topic_score_codex":0.0000052843925,"about_ca_topic_score_gemma":0.0000072363164,"teacher_disagreement_score":0.8997013,"about_ca_system_score_codex":0.000143753,"about_ca_system_score_gemma":0.00016735352,"threshold_uncertainty_score":0.7083881},"labels":[],"label_agreement":null},{"id":"W4398222830","doi":"10.1007/s00220-024-04995-8","title":"Large Deviations of Return Times and Related Entropy Estimators on Shift Spaces","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Fonds Québécois de la Recherche sur la Nature et les Technologies; Agence Nationale de la Recherche; Centre de Recherches Mathématiques; Natural Sciences and Engineering Research Council of Canada; McGill University","keywords":"Mathematics; Ergodicity; Estimator; Large deviations theory; Rate function; Markov chain; Entropy rate; Statistical physics; Entropy (arrow of time); Conditional entropy; Min entropy; Applied mathematics; Binary entropy function; Principle of maximum entropy; Statistics; Quantum mechanics; Physics","score_opus":0.0405325982764297,"score_gpt":0.3528321392442081,"score_spread":0.3122995409677784,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4398222830","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.31910834,0.0042038145,0.3711939,0.014677934,0.00032402176,0.0033691144,0.00039090434,0.0011112049,0.28562078],"genre_scores_gemma":[0.9698716,0.0002972098,0.02943524,0.00002269239,0.000013446049,0.00005631764,0.000020908768,0.000043480217,0.00023910461],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984424,0.00013428721,0.00071288686,0.00022207685,0.00025574802,0.00023256002],"domain_scores_gemma":[0.9943209,0.0041028718,0.00014180511,0.0013078932,0.00005021895,0.00007629888],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006750039,0.00020383556,0.00044895828,0.00012824428,0.00010555167,0.00008451063,0.0004833892,0.00012254475,0.00016480467],"category_scores_gemma":[0.00092112424,0.0001698269,0.000115908035,0.0004918938,0.00027997428,0.00017639577,0.00030589188,0.00043817892,0.00008896414],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000024856242,0.00062740577,0.000060957515,0.00060258876,0.000052845724,0.000002001945,0.0021318935,0.0000034432983,0.0000491943,0.9959221,0.00027274768,0.00027235056],"study_design_scores_gemma":[0.00014235065,0.000028850207,0.000069773116,0.0007787033,0.00005795364,0.0000036157091,0.00016680504,0.16763791,0.000058849706,0.8306915,0.00022721993,0.00013645549],"about_ca_topic_score_codex":0.0000013352452,"about_ca_topic_score_gemma":0.00000293642,"teacher_disagreement_score":0.6507633,"about_ca_system_score_codex":0.000046585898,"about_ca_system_score_gemma":0.000038561542,"threshold_uncertainty_score":0.692534},"labels":[],"label_agreement":null},{"id":"W4399115085","doi":"10.1007/s00220-025-05321-6","title":"The Torus Plateau for the High-Dimensional Ising Model","year":2025,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"Natural Sciences and Engineering Research Council of Canada; European Commission; Université de Genève; National Centres of Competence in Research SwissMAP; Schweizerischer Nationalfonds zur Förderung der Wissenschaftlichen Forschung; National Science Foundation","keywords":"Torus; Plateau (mathematics); Ising model; Statistical physics; Physics; Mathematics; Geometry; Mathematical analysis","score_opus":0.04549711092892771,"score_gpt":0.337590633720074,"score_spread":0.29209352279114625,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4399115085","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0014480638,0.00033246048,0.9799896,0.0061059687,0.00020443574,0.0011340401,0.0003427539,0.00004488937,0.010397817],"genre_scores_gemma":[0.95764375,0.000021149173,0.04002453,0.00017721814,0.00026712264,0.00094368565,0.00023717903,0.00002837346,0.0006569976],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99858266,0.00011421973,0.00051880436,0.0002661722,0.00024054134,0.0002776042],"domain_scores_gemma":[0.99107486,0.0063214945,0.00018914949,0.0021696356,0.00020330383,0.000041561078],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00041541638,0.00026777716,0.0003290423,0.000020129173,0.0008259457,0.0001726635,0.002116492,0.00008332712,0.000011150368],"category_scores_gemma":[0.000056433484,0.00016902406,0.0002762248,0.0001636577,0.0005524942,0.000050301038,0.0022691616,0.00091037527,0.000020827785],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000009887421,0.00022957686,0.0000038156195,0.000034139648,0.00008730443,1.6934276e-8,0.00016392731,0.15218893,0.0000027263611,0.82967013,0.00051805336,0.017091466],"study_design_scores_gemma":[0.00010953144,0.0000027319206,0.0000062033987,0.000097670934,0.00004879426,3.2283918e-8,0.000044579396,0.4746786,0.00001931188,0.5247196,0.00017511605,0.00009783144],"about_ca_topic_score_codex":0.00002241379,"about_ca_topic_score_gemma":0.0000021395122,"teacher_disagreement_score":0.95619565,"about_ca_system_score_codex":0.00005987134,"about_ca_system_score_gemma":0.00025346054,"threshold_uncertainty_score":0.68926007},"labels":[],"label_agreement":null},{"id":"W4399932359","doi":"10.1007/s00220-024-05010-w","title":"A Classification of G-Charge Thouless Pumps in 1D Invertible States","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum, superfluid, helium dynamics","field":"Physics and Astronomy","cited_by":12,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"Directorate for Mathematical and Physical Sciences; Natural Sciences and Engineering Research Council of Canada; Fonds Wetenschappelijk Onderzoek; National Science Foundation","keywords":"Invertible matrix; Charge (physics); Condensed matter physics; Physics; Mathematical physics; Materials science; Quantum mechanics","score_opus":0.04963012683890191,"score_gpt":0.33736173416061005,"score_spread":0.28773160732170816,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4399932359","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.81797427,0.00073860533,0.14565073,0.0018453118,0.00009336933,0.00084116316,0.00016739489,0.00013718886,0.032551993],"genre_scores_gemma":[0.99458176,0.000057285044,0.0049138623,0.0000156606,0.000030194564,0.00013862936,0.0001432347,0.00003295778,0.000086397115],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9986898,0.00013803964,0.0005876739,0.00020383752,0.00016662288,0.00021407873],"domain_scores_gemma":[0.9978362,0.0006658315,0.00006888034,0.0013297531,0.000057251582,0.000042085467],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00038018049,0.00015521004,0.0002914402,0.00012750676,0.00004824127,0.00005269125,0.00071951107,0.000051470302,0.000097342956],"category_scores_gemma":[0.000028340644,0.00015165743,0.0000874583,0.00076851156,0.00022105729,0.0002511349,0.00026701795,0.0004190581,0.00019248524],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000026636822,0.0006344569,0.006546932,0.00020761986,0.000020902964,3.3226962e-7,0.0018684302,0.00017609341,0.001638045,0.983928,0.000071315575,0.004905202],"study_design_scores_gemma":[0.00011010383,0.0000074264335,0.0006360291,0.0003186337,0.000010685267,1.8207014e-7,0.0004932365,0.50793266,0.00032615216,0.4899674,0.00009788721,0.00009956042],"about_ca_topic_score_codex":0.000117316704,"about_ca_topic_score_gemma":0.000020861407,"teacher_disagreement_score":0.5077566,"about_ca_system_score_codex":0.000075780634,"about_ca_system_score_gemma":0.00009218002,"threshold_uncertainty_score":0.61844105},"labels":[],"label_agreement":null},{"id":"W4401792352","doi":"10.1007/s00220-024-05050-2","title":"Characterising Semi-Clifford Gates Using Algebraic Sets","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Applications","field":"Physics and Astronomy","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Simon Fraser University","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Complex system; Algebraic number; Algebra over a field; Clifford algebra; Mathematics; Clifford analysis; Pure mathematics; Computer science; Mathematical analysis; Artificial intelligence; Dirac operator","score_opus":0.06737974790338397,"score_gpt":0.35650996154118536,"score_spread":0.2891302136378014,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4401792352","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.29199654,0.0005496538,0.68613493,0.0017105732,0.00013833007,0.000676831,0.000102462356,0.00024326141,0.018447386],"genre_scores_gemma":[0.9888932,0.000020862952,0.010685885,0.000037350364,0.00009703068,0.000098290475,0.00008649207,0.00003707152,0.00004383073],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990334,0.000051666342,0.00036388368,0.00020907349,0.00011644602,0.00022552814],"domain_scores_gemma":[0.9983706,0.00032380206,0.000061019025,0.0011480352,0.000039020266,0.000057515666],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00021506369,0.00015684417,0.00020847679,0.000057214886,0.0001898193,0.00016874108,0.00057206675,0.00003830785,0.0001650842],"category_scores_gemma":[0.000009452692,0.00015245039,0.00010518812,0.0004378883,0.00009421552,0.00020487713,0.00029350704,0.0003367318,0.00027283974],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[4.265443e-7,0.00020028134,0.000110387846,0.000045039047,0.000023352432,2.8636455e-7,0.00031864332,0.000014550058,0.0017209965,0.9894915,0.000035868845,0.008038634],"study_design_scores_gemma":[0.000047530222,0.0000032574462,0.000032570024,0.0001988411,0.00002098229,9.619438e-7,0.00012575249,0.31015274,0.00037236276,0.68804944,0.00087609654,0.000119475764],"about_ca_topic_score_codex":0.0000151554195,"about_ca_topic_score_gemma":5.7524886e-7,"teacher_disagreement_score":0.6968966,"about_ca_system_score_codex":0.00004446045,"about_ca_system_score_gemma":0.000055434033,"threshold_uncertainty_score":0.62167466},"labels":[],"label_agreement":null},{"id":"W4401811098","doi":"10.1007/s00220-024-05038-y","title":"Geometric Foundations for Classical U(1)-Gauge Theory on Noncommutative Manifolds","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Noncommutative and Quantum Gravity Theories","field":"Physics and Astronomy","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of New Brunswick","funders":"Natural Sciences and Engineering Research Council of Canada; Harrison McCain Foundation","keywords":"Noncommutative geometry; Complex system; Mathematics; Gauge theory; Pure mathematics; Mathematical physics; Gauge (firearms); Theoretical physics; Physics; Algebra over a field; Computer science","score_opus":0.06768845229988033,"score_gpt":0.3884799988842829,"score_spread":0.32079154658440256,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4401811098","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.004263201,0.00023443939,0.8126083,0.0016254847,0.000117220865,0.00072932703,0.00030371087,0.0001245096,0.1799938],"genre_scores_gemma":[0.97948986,0.000011878127,0.018191243,0.00008384036,0.00016287368,0.00060158357,0.00023724984,0.000048313086,0.0011731675],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99858046,0.00029511965,0.0004193881,0.00025275242,0.00016971065,0.00028254406],"domain_scores_gemma":[0.99074996,0.007767489,0.000072421935,0.0012493865,0.000094341485,0.00006639584],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00071546907,0.00022902177,0.0003259056,0.00018907324,0.0003335818,0.00017563342,0.0008219166,0.000053299642,0.00019745398],"category_scores_gemma":[0.00013005237,0.00020205158,0.00022603423,0.00091713417,0.00046060773,0.00024308635,0.00018722966,0.00050583994,0.0005540879],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000014059365,0.000729155,0.00004773316,0.000060656123,0.000087104105,4.2711108e-7,0.0012851558,0.000019160825,0.000037134465,0.9677047,0.00069412607,0.029320562],"study_design_scores_gemma":[0.00028346002,0.00008971845,0.00006749794,0.00019741086,0.00005959473,5.0360387e-7,0.0011052019,0.010622306,0.00036818336,0.9794675,0.0075177546,0.00022085222],"about_ca_topic_score_codex":0.0000053012636,"about_ca_topic_score_gemma":0.0000025078202,"teacher_disagreement_score":0.97522664,"about_ca_system_score_codex":0.000087428445,"about_ca_system_score_gemma":0.00008606681,"threshold_uncertainty_score":0.8239425},"labels":[],"label_agreement":null},{"id":"W4401820192","doi":"10.1007/s00220-024-05074-8","title":"Smooth Min-entropy Lower Bounds for Approximation Chains","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Algebra and Logic","field":"Computer Science","cited_by":2,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal","funders":"Natural Sciences and Engineering Research Council of Canada; Google","keywords":"Complex system; Mathematics; Nonlinear system; Statistical physics; Mathematical physics; Pure mathematics; Physics; Quantum mechanics; Computer science","score_opus":0.05207766242611702,"score_gpt":0.3321732494757961,"score_spread":0.2800955870496791,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4401820192","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0005174348,0.00042684135,0.9912201,0.0023549616,0.00011663727,0.00036120176,0.000004224721,0.00021644139,0.0047821323],"genre_scores_gemma":[0.5017411,0.000052491705,0.4974168,0.00015336479,0.000057465535,0.0002703191,0.000017871518,0.000015690455,0.00027489284],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991067,0.000049533,0.000275103,0.00022738268,0.00013553436,0.0002057568],"domain_scores_gemma":[0.99749076,0.00073783903,0.0000432735,0.0016356411,0.000051169554,0.000041306335],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00025965893,0.00011854549,0.00016086544,0.000060190683,0.00014146307,0.00020099906,0.0014224007,0.000047836806,0.0000060296297],"category_scores_gemma":[0.00010609309,0.000104657745,0.00009047417,0.0005051533,0.00012983174,0.0004682609,0.00037942542,0.00019311866,0.000095843374],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[9.1491086e-7,0.000207583,0.0000016846509,0.00008198211,0.0000056524223,5.034523e-7,0.0006258276,0.00006200177,0.0001502787,0.97015786,0.00020481467,0.028500909],"study_design_scores_gemma":[0.00006555871,0.000016614851,0.00000714551,0.000055957218,0.000003826838,9.240181e-7,0.00001942344,0.43388566,0.00006887605,0.56175834,0.004044141,0.00007354983],"about_ca_topic_score_codex":4.511975e-7,"about_ca_topic_score_gemma":0.000001120961,"teacher_disagreement_score":0.5012237,"about_ca_system_score_codex":0.000075592245,"about_ca_system_score_gemma":0.000046228943,"threshold_uncertainty_score":0.4267819},"labels":[],"label_agreement":null},{"id":"W4402509780","doi":"10.1007/s00220-024-05101-8","title":"Existence of the Free Energy for Heavy-Tailed Spin Glasses","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"Natural Sciences and Engineering Research Council of Canada; National Science Foundation","keywords":"Spin glass; Complex system; Energy (signal processing); Physics; Spin (aerodynamics); Statistical physics; Mathematics; Condensed matter physics; Quantum mechanics; Thermodynamics; Computer science","score_opus":0.031463282456500694,"score_gpt":0.31754878522561797,"score_spread":0.28608550276911726,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4402509780","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.009760539,0.00030944697,0.9426597,0.0025963848,0.00012139378,0.0003878932,0.00014811008,0.000054326792,0.043962233],"genre_scores_gemma":[0.98430574,0.000003698712,0.015210708,0.000040511797,0.00009523352,0.00014711707,0.00002113905,0.000016258155,0.00015956783],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99924004,0.00006262041,0.00030083625,0.0001308581,0.00013303633,0.00013262326],"domain_scores_gemma":[0.9974827,0.001199042,0.000056720517,0.0011600115,0.00007468999,0.00002679655],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00011627514,0.0001066979,0.00017841352,0.000017713532,0.00009071094,0.000038983235,0.0010863134,0.000022642278,0.000029460105],"category_scores_gemma":[0.00003796216,0.00007643842,0.00017405895,0.00034046418,0.0003444637,0.00008308085,0.00041596356,0.00014513561,0.000011785673],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000034094555,0.0002684916,0.0000529898,0.00006554541,0.000024483703,2.5690147e-8,0.0001531435,0.00010833422,0.00008494518,0.98939204,0.00022334245,0.009623254],"study_design_scores_gemma":[0.00012121798,0.000012409807,0.00004632658,0.00018655513,0.000022480814,1.4016034e-7,0.00008722999,0.060201302,0.0012965287,0.9369772,0.00096682017,0.00008179206],"about_ca_topic_score_codex":0.0000088615425,"about_ca_topic_score_gemma":0.0000013312102,"teacher_disagreement_score":0.97454524,"about_ca_system_score_codex":0.000018172268,"about_ca_system_score_gemma":0.000069461756,"threshold_uncertainty_score":0.3117068},"labels":[],"label_agreement":null},{"id":"W4402540469","doi":"10.1007/s00220-024-05075-7","title":"Symplectic Geometry of Teichmüller Spaces for Surfaces with Ideal Boundary","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometric and Algebraic Topology","field":"Mathematics","cited_by":2,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"Natural Sciences and Engineering Research Council of Canada; Université de Genève; Trinity College Dublin; National Centres of Competence in Research SwissMAP; Schweizerischer Nationalfonds zur Förderung der Wissenschaftlichen Forschung; National Science Foundation","keywords":"Symplectic geometry; Ideal (ethics); Mathematics; Geometry; Boundary (topology); Complex system; Pure mathematics; Mathematical analysis; Computer science","score_opus":0.08085832186041138,"score_gpt":0.3757270060822404,"score_spread":0.29486868422182905,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4402540469","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.49686804,0.0072425725,0.46223038,0.0055525866,0.0002028714,0.001995218,0.00009716718,0.0004275723,0.025383573],"genre_scores_gemma":[0.8540837,0.000083275445,0.14533712,0.00002120873,0.000030209627,0.00011496386,0.000011780649,0.000037133825,0.00028060502],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987896,0.00008514253,0.00046677707,0.00020345955,0.00020192085,0.00025311616],"domain_scores_gemma":[0.992173,0.0062062377,0.000109884226,0.001357208,0.000108515465,0.000045115663],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00057600683,0.000168358,0.0004330088,0.00021640163,0.00010880244,0.000061419996,0.000834216,0.00008624282,0.000060193932],"category_scores_gemma":[0.0009864094,0.00013094234,0.0001017769,0.001248198,0.00054992014,0.00012974943,0.00031505426,0.0002766637,0.00002675301],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000008879861,0.0003933637,0.00020178978,0.000987688,0.00009145878,8.5343845e-7,0.0007961443,0.000013569943,0.00005491491,0.9940637,0.0011739915,0.0022136797],"study_design_scores_gemma":[0.00024236672,0.000100910496,0.00009201573,0.00031429858,0.000084284664,0.000008632253,0.00055283954,0.008025572,0.00018303136,0.98898023,0.0012632963,0.00015254659],"about_ca_topic_score_codex":0.000007277105,"about_ca_topic_score_gemma":0.00001586875,"teacher_disagreement_score":0.35721564,"about_ca_system_score_codex":0.000051036477,"about_ca_system_score_gemma":0.000121957324,"threshold_uncertainty_score":0.5339674},"labels":[],"label_agreement":null},{"id":"W4402823318","doi":"10.1007/s00220-025-05360-z","title":"Entropic Fluctuations in Statistical Mechanics II. Quantum Dynamical Systems","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Thermodynamics and Statistical Mechanics","field":"Physics and Astronomy","cited_by":5,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Université de Toulon; Fonds de recherche du Québec – Nature et technologies; Centre National de la Recherche Scientifique; Agence Nationale de la Recherche; Natural Sciences and Engineering Research Council of Canada; McGill University","keywords":"Statistical mechanics; Statistical physics; Fluctuation theorem; Entropy production; Phase space; Quantum; Entropy (arrow of time); Quantum statistical mechanics; Physics; Quantum mechanics; Mathematics; Theoretical physics","score_opus":0.01789693282867314,"score_gpt":0.317382764311005,"score_spread":0.2994858314823318,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4402823318","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0038960131,0.000072971474,0.98579293,0.00037737322,0.0001063122,0.00048174104,0.00013880727,0.000035747697,0.009098095],"genre_scores_gemma":[0.96269536,0.000018853967,0.03665963,0.000034461435,0.000021923217,0.0002395249,0.00016032335,0.000022066355,0.00014782885],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99833566,0.00017889838,0.00068540935,0.00027345083,0.00017651744,0.00035007123],"domain_scores_gemma":[0.9974083,0.0011182152,0.00009279343,0.001229589,0.00008016008,0.00007097018],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00024089692,0.000207761,0.00042030343,0.000109870125,0.00020161438,0.000052437787,0.0007446914,0.000073856776,0.00007339144],"category_scores_gemma":[0.00014526509,0.00021033706,0.00006188942,0.00059791654,0.00012707202,0.000100912104,0.0005102369,0.00055791263,0.000043396158],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000050288877,0.00079952326,0.00010856569,0.000039657087,0.000021006836,7.3798583e-7,0.00009879937,0.0011862854,0.000104261,0.99226224,0.000022453702,0.0053514433],"study_design_scores_gemma":[0.00022684992,0.000011134314,0.000079894344,0.00008465036,0.000012672321,1.2327304e-7,0.00018858476,0.4889315,0.0000030783388,0.51029307,0.00007350598,0.00009493883],"about_ca_topic_score_codex":0.000042273656,"about_ca_topic_score_gemma":0.000015482481,"teacher_disagreement_score":0.95879936,"about_ca_system_score_codex":0.0001594919,"about_ca_system_score_gemma":0.00009572048,"threshold_uncertainty_score":0.8577297},"labels":[],"label_agreement":null},{"id":"W4403349328","doi":"10.1007/s00220-024-05140-1","title":"The Spin-Statistics Theorem for Topological Quantum Field Theories","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Topological and Geometric Data Analysis","field":"Computer Science","cited_by":2,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Dalhousie University","funders":"Atlantic Association for Research in the Mathematical Sciences; Simons Foundation","keywords":"Complex system; Quantum no-deleting theorem; Quantum; Spin (aerodynamics); Field (mathematics); Mathematics; Physics; Theoretical physics; Quantum mechanics; Pure mathematics; Quantum discord; Quantum entanglement; Computer science","score_opus":0.05439118232417729,"score_gpt":0.36503600163259126,"score_spread":0.310644819308414,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4403349328","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00007353488,0.0010050691,0.98066187,0.0133059425,0.00010374902,0.0001793419,0.000027430726,0.000114153954,0.004528927],"genre_scores_gemma":[0.7229769,0.0006817678,0.27507988,0.0005139985,0.00007513853,0.00021419178,0.000025671678,0.000009882339,0.0004225399],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989247,0.00013340381,0.00033607017,0.00021671131,0.00015467367,0.0002344528],"domain_scores_gemma":[0.98620313,0.011826124,0.00004282009,0.0018122005,0.00006397679,0.00005177303],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0007766033,0.00011287653,0.00018460437,0.000049293558,0.00035455832,0.00038832927,0.002802764,0.000059904884,0.000024303703],"category_scores_gemma":[0.0019691663,0.000063739266,0.000105232815,0.000911146,0.00042155842,0.00017104906,0.0008755198,0.00026890647,0.00009030816],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000016086229,0.00008665514,0.000004862634,0.000018273824,0.00001701055,9.3900854e-7,0.00014857725,0.0000060928414,0.000003087323,0.93592125,0.0012697112,0.062521935],"study_design_scores_gemma":[0.000034025965,0.00004205573,0.000014954943,0.00001777725,0.000011441325,0.0000014691038,0.00007314588,0.21831688,0.00002665766,0.7699167,0.011471662,0.000073230505],"about_ca_topic_score_codex":0.0000035815262,"about_ca_topic_score_gemma":0.0000052428427,"teacher_disagreement_score":0.7229034,"about_ca_system_score_codex":0.000024807887,"about_ca_system_score_gemma":0.000039010283,"threshold_uncertainty_score":0.52082795},"labels":[],"label_agreement":null},{"id":"W4404400008","doi":"10.1007/s00220-024-05123-2","title":"Spin-Bounded Correlations: Rotation Boxes Within and Beyond Quantum Theory","year":2024,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Applications","field":"Physics and Astronomy","cited_by":3,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Institut Périmètre de physique théorique; Austrian Science Fund","keywords":"Quantum entanglement; Hidden variable theory; Theoretical physics; Quantum mechanics; Mathematics; Quantum; Local hidden variable theory; Spin (aerodynamics); Physics; Bell's theorem; Multipartite","score_opus":0.03128372344277935,"score_gpt":0.32397262637645713,"score_spread":0.2926889029336778,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4404400008","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.042458195,0.0009776878,0.9311056,0.0017168925,0.000118909375,0.00069105456,0.000058635058,0.00015756467,0.022715453],"genre_scores_gemma":[0.98752934,0.000040503062,0.011770504,0.000047108846,0.00006679721,0.000286454,0.00009878723,0.00002874343,0.00013177685],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9989934,0.00010479503,0.00039937595,0.00022228196,0.00012449702,0.00015563336],"domain_scores_gemma":[0.9981302,0.0007813473,0.000075696604,0.0009075353,0.000049487437,0.00005572015],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00045544517,0.00015026842,0.00018147037,0.00006880386,0.00023964162,0.0001819686,0.00036768825,0.00004366373,0.00008590794],"category_scores_gemma":[0.00003275629,0.00014214836,0.00006338614,0.0004227063,0.00019487929,0.00022855258,0.00018975814,0.00034894,0.0001823743],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000014174047,0.0001965063,0.00006836172,0.000034558783,0.000026134301,1.4923867e-7,0.0011343051,0.000020456042,0.00015101048,0.9894193,0.00009073605,0.008857063],"study_design_scores_gemma":[0.00008426056,0.00000901385,0.000044528886,0.000092445705,0.000029483694,7.663017e-7,0.00078337034,0.27463642,0.00006813039,0.72372806,0.00040964675,0.000113877635],"about_ca_topic_score_codex":0.0000087997105,"about_ca_topic_score_gemma":0.0000023672098,"teacher_disagreement_score":0.94507116,"about_ca_system_score_codex":0.0000293314,"about_ca_system_score_gemma":0.00006315655,"threshold_uncertainty_score":0.5796642},"labels":[],"label_agreement":null},{"id":"W4405469960","doi":"10.1007/s00220-025-05342-1","title":"Generic Global Diffusion for Analytic a Priori Unstable Systems","year":2025,"lang":"en","type":"preprint","venue":"Communications in Mathematical Physics","topic":"Advanced Control Systems Optimization","field":"Engineering","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Toronto","funders":"","keywords":"A priori and a posteriori; Diffusion; Statistical physics; Applied mathematics; Mathematics; Computer science; Mathematical economics; Econometrics; Physics; Thermodynamics; Epistemology; Philosophy","score_opus":0.04231921539142213,"score_gpt":0.31756001055798894,"score_spread":0.2752407951665668,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4405469960","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00030052778,0.0027407948,0.9823125,0.00007165084,0.00035739076,0.001919692,0.00019966633,0.00033791814,0.011759842],"genre_scores_gemma":[0.6755567,0.0011163412,0.31798318,0.000028289867,0.00020648427,0.0039039922,0.0006004439,0.00009687275,0.0005076886],"study_design_codex":"simulation_or_modeling","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.998438,0.00009229603,0.0007523358,0.00026987775,0.00016718303,0.00028031354],"domain_scores_gemma":[0.9964271,0.00045319865,0.00015539666,0.0027500936,0.00016008822,0.00005410933],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00023568839,0.0003097929,0.00068214646,0.00007659805,0.00009564702,0.000099340454,0.0012253317,0.00025917258,0.0000016572087],"category_scores_gemma":[0.00015207911,0.00033567374,0.00014826891,0.0004756493,0.00006627774,0.000092153205,0.0007914716,0.00041033293,0.000012315865],"study_design_candidate":"simulation_or_modeling","study_design_consensus":"simulation_or_modeling","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000029261369,0.00012073577,0.000033878634,0.0020874972,0.000071605566,1.5737766e-7,0.0001113938,0.84343654,0.000024337865,0.15174416,0.00018469467,0.0021821016],"study_design_scores_gemma":[0.0002847882,0.0000048404463,0.00001066163,0.0008953606,0.00008131949,5.8242296e-7,0.000051732106,0.8595889,0.000004070899,0.13824487,0.00060078135,0.00023204801],"about_ca_topic_score_codex":0.0000132284495,"about_ca_topic_score_gemma":0.00001540406,"teacher_disagreement_score":0.6752562,"about_ca_system_score_codex":0.0008075809,"about_ca_system_score_gemma":0.00009067855,"threshold_uncertainty_score":0.9999095},"labels":[],"label_agreement":null},{"id":"W4406279647","doi":"10.1007/s00220-024-05166-5","title":"Magnetic Flatness and E. Hopf’s Theorem for Magnetic Systems","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Geometry and complex manifolds","field":"Mathematics","cited_by":5,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Natural Sciences and Engineering Research Council of Canada; Fundação de Amparo à Pesquisa do Estado de São Paulo; Deutsche Forschungsgemeinschaft; Instituto Serrapilheira; National Science Foundation","keywords":"Flatness (cosmology); Holomorphic function; Curvature; Mathematics; Mathematical analysis; Sectional curvature; Physics; Pure mathematics; Geometry; Scalar curvature; Quantum mechanics","score_opus":0.0776415015370549,"score_gpt":0.35303294962403947,"score_spread":0.27539144808698457,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4406279647","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.055622667,0.008441855,0.7468724,0.0033054892,0.0003356198,0.004869024,0.000059187547,0.00043116158,0.18006255],"genre_scores_gemma":[0.9035113,0.000115238785,0.09290307,0.0000842567,0.000035284414,0.00069456187,0.000011239804,0.000032647822,0.0026124434],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987116,0.00016473238,0.00051247916,0.00022262448,0.00012956157,0.000258992],"domain_scores_gemma":[0.9946205,0.00325628,0.00008615427,0.0018763674,0.000112079666,0.000048617192],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005837907,0.0001922638,0.00040898763,0.000114567614,0.00020119286,0.00010116406,0.00088934135,0.000096851814,0.00002516053],"category_scores_gemma":[0.00053946656,0.00018016803,0.000076629636,0.0005055007,0.00029306847,0.00008093486,0.00048293656,0.00021769879,0.000019418278],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006999949,0.0003699306,0.000068256086,0.0007667268,0.000013876646,2.48743e-7,0.0002692315,0.00000744345,0.000058528818,0.99197334,0.0004997499,0.005965673],"study_design_scores_gemma":[0.00046999773,0.00005274941,0.00016634783,0.0003105865,0.00007475633,0.0000035077232,0.0005007098,0.044202894,0.00002873551,0.9526661,0.0013567222,0.00016687614],"about_ca_topic_score_codex":0.000004019164,"about_ca_topic_score_gemma":0.0000057970083,"teacher_disagreement_score":0.8478886,"about_ca_system_score_codex":0.000041594052,"about_ca_system_score_gemma":0.000036475434,"threshold_uncertainty_score":0.7347039},"labels":[],"label_agreement":null},{"id":"W4406892644","doi":"10.1007/s00220-024-05220-2","title":"Determination of Stable Branches of Relative Equilibria of the N-Vortex Problem on the Sphere","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Gas Dynamics and Kinetic Theory","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"Ministero dell'Università e della Ricerca","keywords":"Complex system; Vortex; Mathematics; Physics; Pure mathematics; Classical mechanics; Mathematical analysis; Mathematical physics; Computer science; Mechanics; Artificial intelligence","score_opus":0.0523431320178749,"score_gpt":0.33331796879552233,"score_spread":0.28097483677764745,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4406892644","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.5881868,0.00022641619,0.16762295,0.0034925202,0.00006636581,0.0023062832,0.00005461268,0.000034948465,0.2380091],"genre_scores_gemma":[0.95472676,0.000015666792,0.04481349,0.000016801672,0.0000028386223,0.000039963474,0.000001426575,0.000011129315,0.0003718989],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987447,0.00028387734,0.000606501,0.000087452296,0.00017970875,0.000097710785],"domain_scores_gemma":[0.9933529,0.0041767694,0.00040126266,0.001908639,0.00015093,0.000009532855],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00069087377,0.00010146591,0.00029810623,0.000032553115,0.00005398795,0.0000059706617,0.0010629734,0.000058459053,0.000019539888],"category_scores_gemma":[0.0008544884,0.000062342624,0.00011319531,0.00047049375,0.00054487743,0.000050814284,0.0004210429,0.00023267439,0.0000014932496],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000006498713,0.00055105024,0.00010184813,0.00034376158,0.000024513341,1.46076875e-8,0.0013168855,0.000024022584,0.0012677419,0.9946777,0.00003238889,0.0016535753],"study_design_scores_gemma":[0.00015884003,0.000021515272,0.00029411938,0.00088401185,0.00004841699,1.545117e-7,0.00040570958,0.022029415,0.0037774441,0.97231144,0.000022118757,0.000046815043],"about_ca_topic_score_codex":0.000004621624,"about_ca_topic_score_gemma":0.000010689917,"teacher_disagreement_score":0.36653998,"about_ca_system_score_codex":0.000031174077,"about_ca_system_score_gemma":0.00006578949,"threshold_uncertainty_score":0.25422582},"labels":[],"label_agreement":null},{"id":"W4407190701","doi":"10.1007/s00220-024-05212-2","title":"Crystallization of $$\\hbox {C}^*$$-Algebras","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Operator Algebra Research","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Victoria","funders":"Norges Forskningsråd; Universitetet i Oslo","keywords":"Crystallization; Complex system; Pure mathematics; Mathematics; Physics; Materials science; Mathematical physics; Thermodynamics; Computer science","score_opus":0.10117607793408363,"score_gpt":0.43618935137705656,"score_spread":0.33501327344297294,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4407190701","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.037662778,0.0003133411,0.868852,0.0010725539,0.00003833721,0.00095821003,0.0000115954535,0.00013162602,0.090959564],"genre_scores_gemma":[0.77726394,0.00008434274,0.2220008,0.000044847213,0.000010174446,0.000111990244,0.000010947792,0.000024360417,0.00044861433],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9985266,0.00019846833,0.00063474587,0.00017174312,0.0002558628,0.00021263528],"domain_scores_gemma":[0.9953191,0.0020269426,0.000118004646,0.0022643378,0.0002336298,0.000037960395],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005063676,0.00013903016,0.0003574724,0.00014350381,0.00009875236,0.000022078168,0.0011674499,0.00008416018,0.000059143676],"category_scores_gemma":[0.001729063,0.00013571829,0.00007759792,0.0011222837,0.00037451138,0.00016740136,0.0006334966,0.00032592227,0.000026593172],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000057224074,0.00067131594,0.00023005693,0.00030807214,0.000021046653,2.587579e-7,0.0003559342,0.000037062706,0.0013799963,0.99435264,0.00024368655,0.002394215],"study_design_scores_gemma":[0.00030040988,0.000013755134,0.00010337757,0.00029334493,0.000018085964,4.3593573e-7,0.00022066946,0.009298438,0.0031664069,0.9862405,0.0002418155,0.0001027515],"about_ca_topic_score_codex":0.0000023662135,"about_ca_topic_score_gemma":0.000009848192,"teacher_disagreement_score":0.73960114,"about_ca_system_score_codex":0.00010652593,"about_ca_system_score_gemma":0.00010541468,"threshold_uncertainty_score":0.55344313},"labels":[],"label_agreement":null},{"id":"W4407630614","doi":"10.1007/s00220-025-05240-6","title":"Lower Bound for Simulation Cost of Open Quantum Systems: Lipschitz Continuity Approach","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":6,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo; University of Toronto","funders":"Canada First Research Excellence Fund","keywords":"Lipschitz continuity; Complex system; Quantum; Mathematics; Upper and lower bounds; Lipschitz domain; Pure mathematics; Statistical physics; Applied mathematics; Physics; Mathematical analysis; Computer science; Quantum mechanics; Artificial intelligence","score_opus":0.06344890296775468,"score_gpt":0.36492223226971854,"score_spread":0.30147332930196385,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4407630614","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0024037927,0.00015270947,0.9897494,0.00033879312,0.00009962272,0.0012448761,0.00000988332,0.00005173989,0.005949184],"genre_scores_gemma":[0.77511054,0.000004879192,0.22458543,0.00004607162,0.000015597527,0.00015127129,0.0000101186015,0.0000074640525,0.00006865665],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9987579,0.00017489515,0.0005058065,0.00024345983,0.00013506504,0.00018287447],"domain_scores_gemma":[0.9955824,0.0017960533,0.00018350649,0.002229218,0.00017632122,0.00003247643],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00076699484,0.00012810726,0.0003645653,0.00007429526,0.00019256466,0.00027028794,0.0037253532,0.00006144227,4.8033326e-7],"category_scores_gemma":[0.0002597472,0.00011690327,0.000079572375,0.0006244102,0.00016341101,0.0002236942,0.0017771799,0.00021545941,0.0000030007404],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004993791,0.00060477754,0.00002139313,0.00017785118,0.000016717437,5.996688e-8,0.000422311,0.067988075,0.000023959032,0.92085034,0.00008419528,0.009805328],"study_design_scores_gemma":[0.00026775003,0.000016758391,0.00006110097,0.00017576593,0.000007134214,3.2234252e-7,0.000037722737,0.66940904,0.00001878278,0.32928956,0.0006407231,0.000075352626],"about_ca_topic_score_codex":0.000013833654,"about_ca_topic_score_gemma":0.0000015369532,"teacher_disagreement_score":0.77270675,"about_ca_system_score_codex":0.0000428708,"about_ca_system_score_gemma":0.000097109674,"threshold_uncertainty_score":0.6922695},"labels":[],"label_agreement":null},{"id":"W4408611953","doi":"10.1007/s00220-025-05265-x","title":"Metastability in Glauber Dynamics for Heavy-Tailed Spin Glasses","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Theoretical and Computational Physics","field":"Physics and Astronomy","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Division of Mathematical Sciences; Natural Sciences and Engineering Research Council of Canada","keywords":"Glauber; Metastability; Statistical physics; Dynamics (music); Complex system; Spin glass; Physics; Spin (aerodynamics); Condensed matter physics; Thermodynamics; Quantum mechanics; Computer science","score_opus":0.022870506894668966,"score_gpt":0.3478532388460775,"score_spread":0.32498273195140853,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4408611953","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.076740816,0.00005890035,0.8771544,0.0023072935,0.000056547673,0.0008964615,0.000095825984,0.0000438302,0.042645942],"genre_scores_gemma":[0.97425383,0.0000016862576,0.025012447,0.00006670115,0.00003115067,0.00037047334,0.00013604562,0.000013737284,0.000113938346],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988222,0.0001255363,0.00048888935,0.00022092603,0.00010540913,0.00023702749],"domain_scores_gemma":[0.9971635,0.0016056009,0.00007098547,0.0010148612,0.00010673161,0.000038365666],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00031207185,0.00016438021,0.00034365206,0.00005590264,0.00010389078,0.000045614102,0.0006852773,0.000039283168,0.00003862793],"category_scores_gemma":[0.000077382654,0.00015875265,0.00014069727,0.00056796125,0.00027805814,0.00012210461,0.00031518665,0.0002767502,0.000025570796],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000167887,0.0012216264,0.0042605884,0.00006181221,0.000025919158,4.2980645e-8,0.00009735731,0.0005098441,0.000011064883,0.97908896,0.00004330622,0.014662708],"study_design_scores_gemma":[0.00045441856,0.000009013845,0.0013350945,0.00008137132,0.000020847194,3.5676585e-8,0.00020558776,0.147347,0.00009685439,0.8501658,0.00016112959,0.00012284372],"about_ca_topic_score_codex":0.00001760268,"about_ca_topic_score_gemma":0.000022348326,"teacher_disagreement_score":0.89751303,"about_ca_system_score_codex":0.00010361861,"about_ca_system_score_gemma":0.00009476446,"threshold_uncertainty_score":0.6473745},"labels":[],"label_agreement":null},{"id":"W4409188309","doi":"10.1007/s00220-024-05229-7","title":"The Membership Problem for Constant-Sized Quantum Correlations is Undecidable","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Applications","field":"Physics and Astronomy","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo; Concordia University","funders":"Canadian Network for Research and Innovation in Machining Technology, Natural Sciences and Engineering Research Council of Canada; Alfred P. Sloan Foundation","keywords":"Undecidable problem; Constant (computer programming); Complex system; Quantum; Mathematics; Statistical physics; Computer science; Pure mathematics; Discrete mathematics; Physics; Quantum mechanics; Artificial intelligence; Decidability","score_opus":0.051320123294997896,"score_gpt":0.34049841050422786,"score_spread":0.28917828720922995,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4409188309","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00044476285,0.00018425011,0.8773064,0.010473318,0.000060962422,0.0015435002,0.00008666791,0.0000515042,0.109848656],"genre_scores_gemma":[0.9782089,0.000039826427,0.01818866,0.00016607446,0.000034988832,0.0018184962,0.00006688646,0.000021550923,0.0014546158],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9988799,0.00007855803,0.0004843203,0.00018868336,0.0001062397,0.00026229338],"domain_scores_gemma":[0.9954775,0.0025469505,0.00013656261,0.001640379,0.00015684486,0.000041777534],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004893274,0.00014487325,0.00021881037,0.000036846053,0.0008664189,0.00012309931,0.0009755895,0.000045929628,0.000062835104],"category_scores_gemma":[0.000051806233,0.000117686955,0.00013429779,0.0005511346,0.00023581626,0.000067817935,0.00024050169,0.0002653657,0.00006663574],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004146559,0.0002621856,0.0000777852,0.000018991912,0.00004140893,7.895696e-9,0.0001746111,0.000016526401,0.00003455952,0.99110913,0.004147056,0.0041136006],"study_design_scores_gemma":[0.00036999074,0.0000060733546,0.000010766582,0.00008164926,0.00003947282,6.545357e-8,0.0005627255,0.13462722,0.00010572783,0.85058904,0.013504263,0.00010298335],"about_ca_topic_score_codex":0.000010814107,"about_ca_topic_score_gemma":0.0000065312247,"teacher_disagreement_score":0.9777641,"about_ca_system_score_codex":0.000047985537,"about_ca_system_score_gemma":0.00016837775,"threshold_uncertainty_score":0.66638815},"labels":[],"label_agreement":null},{"id":"W4409289430","doi":"10.1007/s00220-025-05272-y","title":"A Heterotic Hermitian–Yang–Mills Equivalence","year":2025,"lang":"lv","type":"article","venue":"Communications in Mathematical Physics","topic":"Advanced Algebra and Geometry","field":"Mathematics","cited_by":9,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Heterotic string theory; Hermitian matrix; Mathematics; Complex system; Equivalence (formal languages); Pure mathematics; Mathematical physics; Algebra over a field; Physics; Computer science","score_opus":0.07706656364271458,"score_gpt":0.39623530095716636,"score_spread":0.3191687373144518,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4409289430","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.041386694,0.010231025,0.6751258,0.00753658,0.0006445261,0.003496054,0.00014683184,0.0005220645,0.26091042],"genre_scores_gemma":[0.8955997,0.0014301747,0.09588824,0.0007443019,0.00010137366,0.00031426488,0.00003474272,0.000098710116,0.0057884413],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99633753,0.0004665058,0.0014385867,0.00055445574,0.00043293124,0.0007699603],"domain_scores_gemma":[0.9882,0.0049437406,0.00035453573,0.0061271503,0.00022483637,0.00014974462],"candidate_categories":["metaepi_narrow","insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0007448286,0.000548528,0.0010291671,0.00028073668,0.00039237,0.00015188656,0.0030724863,0.00031782343,0.00025655318],"category_scores_gemma":[0.002034459,0.0005709234,0.00034103842,0.002187642,0.0010198978,0.00035909232,0.0021694284,0.0012822632,0.0010285605],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00001063528,0.0024046435,0.00018443575,0.0018559763,0.00011273404,0.000005740084,0.0011768809,0.00006816162,0.000140715,0.97477394,0.00090577337,0.018360384],"study_design_scores_gemma":[0.00070160493,0.000039942894,0.00015370107,0.0033543413,0.00018305746,0.0000053009126,0.00078497024,0.018051827,0.00034297595,0.974818,0.0010860431,0.00047825085],"about_ca_topic_score_codex":0.0000031045795,"about_ca_topic_score_gemma":0.000013205978,"teacher_disagreement_score":0.85421306,"about_ca_system_score_codex":0.00032782336,"about_ca_system_score_gemma":0.00020488439,"threshold_uncertainty_score":0.99974924},"labels":[],"label_agreement":null},{"id":"W4410767529","doi":"10.1007/s00220-025-05330-5","title":"Commuting Line Defects At $$q^N$$ = 1","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Finite Group Theory Research","field":"Mathematics","cited_by":3,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Institut Périmètre de physique théorique; Krembil Foundation; U.S. Department of Energy; National Science Foundation","keywords":"Complex system; Line (geometry); Mathematics; Physics; Geometry; Computer science; Artificial intelligence","score_opus":0.20133513246694262,"score_gpt":0.4546248836601216,"score_spread":0.253289751193179,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4410767529","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.25223342,0.00072329055,0.11296651,0.0037176427,0.000103385864,0.0017461546,0.000022596929,0.00054185133,0.6279452],"genre_scores_gemma":[0.92003334,0.000055842804,0.077141695,0.000183464,0.00002514954,0.00018081647,0.000020518044,0.000040267543,0.0023189003],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9980546,0.00049173454,0.0006011722,0.00021796029,0.00025498544,0.00037954192],"domain_scores_gemma":[0.98772216,0.008378713,0.00010856922,0.0036025224,0.00012721198,0.00006080973],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0013947024,0.00019334354,0.00040367304,0.00014624695,0.0003465255,0.00004916184,0.0018328746,0.00011323869,0.00009582635],"category_scores_gemma":[0.0029631676,0.00018812885,0.00011869723,0.0009850351,0.00046561594,0.000103340455,0.0024174212,0.00066671544,0.00033058538],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000011293213,0.0007256484,0.0004855087,0.0002869091,0.000025448475,0.000001126657,0.0005705041,0.0000108247605,0.00045271448,0.9942741,0.0009722884,0.0021836683],"study_design_scores_gemma":[0.00040227253,0.000016487678,0.00009090538,0.00038208195,0.000026097876,0.0000020047312,0.00018186746,0.017124401,0.001029169,0.97974336,0.00084768207,0.00015365361],"about_ca_topic_score_codex":0.000002969261,"about_ca_topic_score_gemma":0.000030967072,"teacher_disagreement_score":0.66779995,"about_ca_system_score_codex":0.0002779284,"about_ca_system_score_gemma":0.00006209902,"threshold_uncertainty_score":0.76716715},"labels":[],"label_agreement":null},{"id":"W4411931815","doi":"10.1007/s00220-025-05344-z","title":"Bosonization and Anomaly Indicators of (2+1)-D Fermionic Topological Orders","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Topological Materials and Phenomena","field":"Physics and Astronomy","cited_by":3,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Bosonization; Anomaly (physics); Complex system; Physics; Mathematical physics; Theoretical physics; Fermion; Topology (electrical circuits); Mathematics; Quantum mechanics; Computer science; Combinatorics; Artificial intelligence","score_opus":0.01999056159890688,"score_gpt":0.3124171216309111,"score_spread":0.29242656003200423,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4411931815","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.91119486,0.0001420004,0.03557663,0.0009537246,0.000033164484,0.00027346873,0.000011973466,0.00002645283,0.05178772],"genre_scores_gemma":[0.9948755,0.000021472883,0.0049337847,0.000045356617,0.0000135035,0.000034953166,0.000013434352,0.000004891211,0.000057108835],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99928194,0.0001045181,0.00031848214,0.00012105791,0.000054905573,0.00011907937],"domain_scores_gemma":[0.99899447,0.0003044117,0.00008899962,0.0005572218,0.000027594991,0.000027330498],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00016274326,0.00009245882,0.00023479476,0.00005637554,0.00008381086,0.000020792077,0.00034994067,0.000042673902,0.00016913073],"category_scores_gemma":[0.0000368921,0.000077710414,0.000035593035,0.00038969624,0.0003764762,0.000056557124,0.0003091505,0.00012627842,0.000006763013],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000031916518,0.00029423824,0.019720806,0.0000292449,0.000013377418,3.0720006e-8,0.000117778916,0.000010143023,0.00012073927,0.9766751,0.0000069157472,0.003008443],"study_design_scores_gemma":[0.00020344593,0.000017079159,0.01066114,0.000046414607,0.000015086512,6.268603e-8,0.00018872497,0.00059113017,0.0003793323,0.9876961,0.00012795348,0.00007351246],"about_ca_topic_score_codex":0.000021713935,"about_ca_topic_score_gemma":9.990536e-7,"teacher_disagreement_score":0.08368063,"about_ca_system_score_codex":0.000013399971,"about_ca_system_score_gemma":0.000027023374,"threshold_uncertainty_score":0.31689388},"labels":[],"label_agreement":null},{"id":"W4411932352","doi":"10.1007/s00220-025-05358-7","title":"Quantum Differential Equation Solvers: Limitations and Fast-Forwarding","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":13,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"Advanced Scientific Computing Research; Army Research Office; Simons Foundation; U.S. Department of Defense; National Science Foundation","keywords":"Quantum; Complex system; Differential equation; Nonlinear system; Computer science; Mathematics; Applied mathematics; Physics; Mathematical analysis; Quantum mechanics; Artificial intelligence","score_opus":0.0622075130950493,"score_gpt":0.306902184257162,"score_spread":0.2446946711621127,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4411932352","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0118877515,0.000113667855,0.9815973,0.0026755834,0.00007131478,0.0001571717,0.0000012267145,0.00010620581,0.0033897934],"genre_scores_gemma":[0.80337954,0.000051670013,0.19639261,0.00008747314,0.00001652351,0.000026750397,0.000005436142,0.0000052626815,0.000034719622],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9990996,0.00011412738,0.00028221388,0.0002060904,0.00012545446,0.00017249533],"domain_scores_gemma":[0.9975201,0.0011159859,0.000065610126,0.0012067561,0.000055046843,0.00003652354],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00020772783,0.00011472178,0.00017678273,0.0001106657,0.0002785529,0.00016844523,0.0010591422,0.000045791614,0.0000012810251],"category_scores_gemma":[0.00019066228,0.00010876259,0.00005085628,0.0005540438,0.00013977352,0.00020168678,0.000978796,0.0002694536,0.000012250063],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[7.045777e-7,0.00013492546,0.00003501637,0.00002707192,0.000010430677,1.8903371e-7,0.0011437328,0.000645458,0.000086406646,0.918162,0.00003735455,0.07971675],"study_design_scores_gemma":[0.00010619372,0.000008852335,0.0003104899,0.000079873455,0.000005457607,6.083944e-7,0.000059974187,0.55997944,0.00002916881,0.439278,0.00008259357,0.000059320584],"about_ca_topic_score_codex":0.0000031307857,"about_ca_topic_score_gemma":0.0000028256989,"teacher_disagreement_score":0.7914918,"about_ca_system_score_codex":0.00003320402,"about_ca_system_score_gemma":0.000041869152,"threshold_uncertainty_score":0.443521},"labels":[],"label_agreement":null},{"id":"W4411958868","doi":"10.1007/s00220-025-05339-w","title":"Quantum Supersymmetric Pairs of Basic Types","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":2,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Ottawa","funders":"National Science Foundation; Jefferson Foundation","keywords":"Complex system; Quantum; Theoretical physics; Pure mathematics; Mathematics; Physics; Algebra over a field; Quantum mechanics; Mathematical physics; Computer science","score_opus":0.06901565054821485,"score_gpt":0.3532463178895095,"score_spread":0.28423066734129465,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4411958868","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.6257648,0.002428238,0.13513081,0.0031910767,0.0007183562,0.0018798448,0.000022029719,0.00035608863,0.23050877],"genre_scores_gemma":[0.984141,0.000058999325,0.015503878,0.000041121744,0.000016532189,0.00004155165,0.0000033195602,0.000015129505,0.00017845393],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99890685,0.00012270347,0.00049635995,0.00013827036,0.00017268676,0.0001631179],"domain_scores_gemma":[0.99593997,0.002039769,0.00010672363,0.0017780625,0.00010691363,0.000028560278],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00031575904,0.00013162768,0.0003742128,0.00013469308,0.00007603777,0.0000154319,0.0009801792,0.00008700903,0.00003342532],"category_scores_gemma":[0.0008957403,0.00011845772,0.00011016444,0.0010368929,0.00022085261,0.00007023854,0.00039504236,0.00024988316,0.00001200709],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000043096334,0.0003823622,0.0002010957,0.0001750726,0.000031603136,1.250681e-7,0.00033671438,0.0000066376524,0.000030387568,0.9962666,0.00027606322,0.0022890544],"study_design_scores_gemma":[0.0002762864,0.00001574879,0.00013800306,0.00017255513,0.00004310691,3.39875e-7,0.00026037986,0.0059670145,0.00032399906,0.9925544,0.00015029381,0.00009785067],"about_ca_topic_score_codex":0.000008958691,"about_ca_topic_score_gemma":0.0000029719072,"teacher_disagreement_score":0.35837623,"about_ca_system_score_codex":0.000055606593,"about_ca_system_score_gemma":0.000067052686,"threshold_uncertainty_score":0.48305658},"labels":[],"label_agreement":null},{"id":"W4412830674","doi":"10.1007/s00220-025-05379-2","title":"Twisted Traces on Abelian Quantum Higgs and Coulomb Branches","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"advanced mathematical theories","field":"Mathematics","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo; Perimeter Institute","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"Abelian group; Higgs boson; Coulomb; Physics; Quantum; Theoretical physics; Higgs field; Complex system; Particle physics; Quantum mechanics; Pure mathematics; Mathematics; Computer science; Electron","score_opus":0.09690175067450023,"score_gpt":0.41349697205324754,"score_spread":0.3165952213787473,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4412830674","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.18992783,0.0016104665,0.57299834,0.011659664,0.00021170084,0.002850359,0.000058312355,0.00102836,0.21965499],"genre_scores_gemma":[0.84395385,0.0001929538,0.15476729,0.0002738615,0.000023784727,0.00021695363,0.000007462319,0.000048291233,0.0005155437],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9981877,0.00021041479,0.00071697496,0.00031095496,0.00024712394,0.0003267878],"domain_scores_gemma":[0.990171,0.007144985,0.00015995574,0.0023494437,0.00009565426,0.00007894065],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.00062800903,0.00029956328,0.0006219104,0.00012873975,0.0002310925,0.00007294834,0.00094261527,0.00013387704,0.000026464988],"category_scores_gemma":[0.0024219782,0.00026513494,0.00009211938,0.0006426355,0.00086086144,0.00018412941,0.00046225736,0.0005293509,0.00006779024],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000015377174,0.00091115246,0.00006281866,0.000499274,0.000034938712,8.4611855e-7,0.000998453,0.000004559501,0.000106766,0.9925875,0.00029281332,0.0044855163],"study_design_scores_gemma":[0.0004722504,0.000036053156,0.00008906747,0.00082902313,0.000050594765,0.000002041392,0.00064617995,0.006622192,0.00072469586,0.98947835,0.00081177184,0.00023776371],"about_ca_topic_score_codex":0.0000015037715,"about_ca_topic_score_gemma":0.0000047257936,"teacher_disagreement_score":0.65402603,"about_ca_system_score_codex":0.00009040226,"about_ca_system_score_gemma":0.000044000088,"threshold_uncertainty_score":0.9999801},"labels":[],"label_agreement":null},{"id":"W4412830928","doi":"10.1007/s00220-025-05381-8","title":"On a Countable Sequence of Homoclinic Orbits Arising Near a Saddle–Center Point","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Nonlinear Waves and Solitons","field":"Physics and Astronomy","cited_by":0,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McMaster University","funders":"H2020 European Research Council; Agencia Estatal de Investigación; Universitat de Barcelona; European Regional Development Fund; Institució Catalana de Recerca i Estudis Avançats; European Commission","keywords":"Homoclinic orbit; Countable set; Saddle; Saddle point; Sequence (biology); Mathematics; Center (category theory); Homoclinic bifurcation; Point (geometry); Mathematical analysis; Pure mathematics; Geometry; Physics; Nonlinear system; Bifurcation; Quantum mechanics","score_opus":0.055160490428901775,"score_gpt":0.37960049434911325,"score_spread":0.3244400039202115,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4412830928","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.39753342,0.0001893917,0.15062249,0.0023616508,0.00016341184,0.0011357798,0.00035021227,0.00008439079,0.44755924],"genre_scores_gemma":[0.9795822,0.0000074967097,0.019899303,0.00011086991,0.000022306858,0.000028934615,0.00004859627,0.000011764073,0.00028855217],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.999085,0.00008094873,0.00041343234,0.00013841702,0.0001047137,0.00017748329],"domain_scores_gemma":[0.997735,0.0006816688,0.000105942476,0.0013728314,0.00007227725,0.00003225864],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00022309694,0.00011569646,0.0002763132,0.00003616854,0.00012580246,0.000040776027,0.00057220296,0.000033776738,0.00006988041],"category_scores_gemma":[0.000047631365,0.000108606466,0.00010383246,0.00033586266,0.000251103,0.00008097023,0.00027226133,0.00032217786,0.0000593647],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000044890903,0.0012388434,0.0016691525,0.00005181762,0.000035521716,1.446594e-7,0.0003655106,0.00013640944,0.00016062803,0.9927776,0.00022412778,0.0033357637],"study_design_scores_gemma":[0.0004322581,0.000022499606,0.00013653042,0.0005750322,0.000023580049,2.0491089e-7,0.00026552123,0.04614734,0.00039587775,0.9511019,0.0007823876,0.00011684886],"about_ca_topic_score_codex":0.00003797174,"about_ca_topic_score_gemma":0.0000028977004,"teacher_disagreement_score":0.5820488,"about_ca_system_score_codex":0.00003974232,"about_ca_system_score_gemma":0.00010799802,"threshold_uncertainty_score":0.44288433},"labels":[],"label_agreement":null},{"id":"W4412831195","doi":"10.1007/s00220-025-05390-7","title":"Many-Body Fu–Kane–Mele Index","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Topological Materials and Phenomena","field":"Physics and Astronomy","cited_by":1,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Complex system; Index (typography); Mathematics; Theoretical physics; Pure mathematics; Physics; Mathematical physics; Computer science; Artificial intelligence","score_opus":0.029362267708028928,"score_gpt":0.3276677277395836,"score_spread":0.29830546003155467,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4412831195","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.05575294,0.00020240012,0.40708622,0.0016342117,0.00011492329,0.0005189965,0.00003858088,0.000098109565,0.53455365],"genre_scores_gemma":[0.99338144,0.000013637596,0.0056152027,0.000119750766,0.00006425104,0.00012211382,0.000027327365,0.000010317284,0.00064594566],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99908906,0.00011471699,0.00034710474,0.0001574493,0.000081145525,0.000210521],"domain_scores_gemma":[0.99822557,0.0003298304,0.00006834193,0.0012988581,0.000036888763,0.0000404884],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00019291301,0.00013653198,0.0002649506,0.00003793356,0.00014188024,0.000062430474,0.00083177764,0.000043860557,0.00060083985],"category_scores_gemma":[0.00001996964,0.00012043201,0.00007293865,0.00030879193,0.00020602882,0.00008174312,0.0005108475,0.00024460032,0.0002119617],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000032375883,0.0005248813,0.0018644765,0.00003026709,0.000018174602,1.5157529e-7,0.000106787564,0.00001708596,0.00018997565,0.99171746,0.00014705927,0.0053804666],"study_design_scores_gemma":[0.00022606456,0.000008501058,0.0025410727,0.000058637048,0.00001384012,9.773803e-8,0.00014255352,0.009587506,0.00028596204,0.9848591,0.0021543715,0.00012230533],"about_ca_topic_score_codex":0.00003206318,"about_ca_topic_score_gemma":8.957359e-7,"teacher_disagreement_score":0.9376285,"about_ca_system_score_codex":0.000027226692,"about_ca_system_score_gemma":0.00003141282,"threshold_uncertainty_score":0.6578775},"labels":[],"label_agreement":null},{"id":"W4413866388","doi":"10.1007/s00220-025-05405-3","title":"A Higher Spin-Statistics Theorem for Invertible Quantum Field Theories","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Mechanics and Applications","field":"Physics and Astronomy","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute; Dalhousie University","funders":"National Science Foundation Graduate Research Fellowship Program","keywords":"Complex system; Invertible matrix; Spin (aerodynamics); Mathematics; Quantum; Quantum field theory; Physics; Theoretical physics; Quantum mechanics; Mathematical physics; Pure mathematics; Computer science","score_opus":0.03564566915360915,"score_gpt":0.3491261668878419,"score_spread":0.31348049773423275,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4413866388","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00067364256,0.00005747847,0.9618553,0.0024806072,0.00006493428,0.0004913767,0.00009220328,0.00003600149,0.03424848],"genre_scores_gemma":[0.95310277,0.000013772892,0.045078225,0.000375561,0.00005465235,0.0006947524,0.00009323619,0.000018642,0.0005684063],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991514,0.000049771734,0.00035262672,0.0001690485,0.00007577328,0.00020134175],"domain_scores_gemma":[0.99709827,0.0013436376,0.00008299666,0.0013306127,0.0001013563,0.00004313142],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00021926136,0.00013887847,0.00022864105,0.00004384512,0.00023258185,0.000059837574,0.0007510972,0.000043991982,0.00014942377],"category_scores_gemma":[0.000069947186,0.00013023082,0.00008334442,0.0003395353,0.00012643995,0.000068150664,0.00025324852,0.00020770307,0.000046544243],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000004859596,0.0003853154,0.00009484673,0.000043353823,0.00002784009,2.3772518e-8,0.00011400366,0.0000045959036,0.00010377394,0.99081165,0.0025853228,0.0058244313],"study_design_scores_gemma":[0.0002488483,0.000016865913,0.000023866638,0.000076472956,0.000031832515,3.516861e-8,0.00017595032,0.054595035,0.0006830289,0.93725824,0.0067673163,0.00012252574],"about_ca_topic_score_codex":0.000013747965,"about_ca_topic_score_gemma":0.0000025215195,"teacher_disagreement_score":0.9524291,"about_ca_system_score_codex":0.000022763435,"about_ca_system_score_gemma":0.00007898229,"threshold_uncertainty_score":0.5310659},"labels":[],"label_agreement":null},{"id":"W4414771390","doi":"10.1007/s00220-025-05431-1","title":"Entanglement Cost for Infinite-Dimensional Physical Systems","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":5,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute; University of Waterloo","funders":"Army Research Office; Japan Society for the Promotion of Science; European Research Council; Japan Science and Technology Agency; Scuola Normale Superiore","keywords":"Quantum entanglement; Converse; Multipartite entanglement; Squashed entanglement; Separable state; Quantum; Physical system; Entropy (arrow of time); Quantum system; Quantum capacity","score_opus":0.05097562093202493,"score_gpt":0.34864032008815127,"score_spread":0.29766469915612637,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4414771390","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.0011486525,0.00008626469,0.97790307,0.0016344226,0.00011004616,0.0007931946,0.000010238533,0.00010764536,0.018206473],"genre_scores_gemma":[0.8770497,0.0000161852,0.12114683,0.00066665636,0.000027168055,0.00094514503,0.00003943714,0.000008126284,0.000100796846],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99902016,0.00007207414,0.00039183645,0.0001447696,0.00018054727,0.00019062826],"domain_scores_gemma":[0.9971928,0.00093779416,0.00008961924,0.0016026367,0.0001334131,0.000043708937],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00030862747,0.00011701126,0.00020723823,0.00011962272,0.0001780532,0.00013290705,0.0015275707,0.00003762219,0.0000026268206],"category_scores_gemma":[0.00007935614,0.0001084324,0.00010459824,0.00072126003,0.000121336874,0.00030165754,0.0005423448,0.0001577214,0.00006160204],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000018125453,0.0004299389,0.000027189568,0.00006641019,0.000013983708,6.1526436e-8,0.00040943638,0.00032301055,0.000026619105,0.99030834,0.0012231948,0.0071699894],"study_design_scores_gemma":[0.00029169195,0.0000130419185,0.000040575622,0.00008171901,0.0000059326985,4.0888798e-7,0.000083256535,0.5796927,0.00008523189,0.41313377,0.0064903335,0.000081294784],"about_ca_topic_score_codex":0.000001846936,"about_ca_topic_score_gemma":9.2100095e-7,"teacher_disagreement_score":0.875901,"about_ca_system_score_codex":0.000059618862,"about_ca_system_score_gemma":0.00006524163,"threshold_uncertainty_score":0.44217452},"labels":[],"label_agreement":null},{"id":"W4414796573","doi":"10.1007/s00220-025-05448-6","title":"Highest Weight Vectors, Shifted Topological Recursion and Quantum Curves","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Graph theory and applications","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Saskatchewan; University of Alberta","funders":"Gruppo Nazionale per la Fisica Matematica; Istituto Nazionale di Fisica Nucleare; University of Alberta","keywords":"Recursion (computer science); Topological quantum number; WKB approximation; Partition (number theory); Topology (electrical circuits); Topological algebra; Generalization","score_opus":0.07906118362918163,"score_gpt":0.3841040680437077,"score_spread":0.3050428844145261,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4414796573","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.61002594,0.009958244,0.12035876,0.086886205,0.00030818736,0.004468043,0.000104942,0.001290939,0.16659877],"genre_scores_gemma":[0.9618173,0.0013347616,0.03586722,0.00035539005,0.0000196463,0.0002703394,0.00002668206,0.000018236788,0.00029039252],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9987224,0.0002699998,0.0004578857,0.00022744627,0.00012103382,0.00020123925],"domain_scores_gemma":[0.9953315,0.002772355,0.00007244598,0.0017035841,0.00006451353,0.000055592966],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005294841,0.00017075705,0.00033744093,0.000077130826,0.00026006903,0.000029794019,0.0007801195,0.00010871758,0.000050097042],"category_scores_gemma":[0.0006735308,0.00014788618,0.00007245051,0.0006515227,0.000562611,0.00010050516,0.0004701422,0.00039657645,0.0000287309],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000047429503,0.0006985852,0.00025707146,0.00028609938,0.0000160436,2.9190713e-7,0.00016675808,1.910536e-7,0.0001216034,0.9957567,0.0019780823,0.0007138602],"study_design_scores_gemma":[0.00020130101,0.000015329368,0.00068620907,0.0006865821,0.000046703266,0.0000016533445,0.000101185935,0.0013823819,0.00023072118,0.99383825,0.0026659323,0.00014372694],"about_ca_topic_score_codex":0.0000028199704,"about_ca_topic_score_gemma":0.0000049291093,"teacher_disagreement_score":0.3517914,"about_ca_system_score_codex":0.000037797603,"about_ca_system_score_gemma":0.000026778212,"threshold_uncertainty_score":0.60306233},"labels":[],"label_agreement":null},{"id":"W4414796602","doi":"10.1007/s00220-025-05445-9","title":"KPP Traveling Waves in the Half-Space","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum chaos and dynamical systems","field":"Physics and Astronomy","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Centre de Recherches Mathématiques; Simons Foundation; National Science Foundation","keywords":"Laplace transform; Traveling wave; Logarithm; Brownian motion; Rotation (mathematics); Boundary value problem; Dirichlet boundary condition; Boundary (topology)","score_opus":0.03453057295574897,"score_gpt":0.3282032725614068,"score_spread":0.29367269960565784,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4414796602","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.13988402,0.0004090681,0.3377392,0.012338511,0.00010155356,0.0011416967,0.000016436132,0.00005786465,0.5083117],"genre_scores_gemma":[0.99632114,0.0000073854094,0.0032359431,0.000081136015,0.00003465797,0.00011521231,0.000014596266,0.000007431891,0.00018247451],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990743,0.00018137101,0.00034073368,0.00012274216,0.000104825864,0.00017603177],"domain_scores_gemma":[0.9978052,0.00090200064,0.000053706055,0.0011970839,0.000024660058,0.000017342925],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00039908264,0.000108109,0.00020580104,0.000030628697,0.000115008144,0.000060124996,0.0009105541,0.000031996937,0.00001819036],"category_scores_gemma":[0.000029981125,0.00007847082,0.00007442436,0.00048691384,0.00013272358,0.00006697307,0.0001791658,0.00034346493,0.00004577758],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000010381488,0.00039281877,0.001473611,0.00002542482,0.000008544445,1.275695e-7,0.0010179597,0.000079532554,0.000053059517,0.99375975,0.00008535521,0.0031027491],"study_design_scores_gemma":[0.0001986458,0.000004254456,0.0010162387,0.0001760328,0.0000090974345,1.353079e-7,0.0019650313,0.11278284,0.000025910833,0.8828918,0.00084379193,0.00008625476],"about_ca_topic_score_codex":0.00009680113,"about_ca_topic_score_gemma":0.000020181591,"teacher_disagreement_score":0.85643715,"about_ca_system_score_codex":0.000027132523,"about_ca_system_score_gemma":0.000029505378,"threshold_uncertainty_score":0.31999472},"labels":[],"label_agreement":null},{"id":"W4415710866","doi":"10.1007/s00220-025-05474-4","title":"Reverse-Type Data Processing Inequality","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Waterloo","funders":"Canada First Research Excellence Fund; Innovative Research Group Project of the National Natural Science Foundation of China","keywords":"Quantum; Quantum relative entropy; Generalized relative entropy; Quantum channel; Kullback–Leibler divergence; Entropy (arrow of time); Quantum operation; Quantum system; Amplitude damping channel; Quantum discord","score_opus":0.14962632094245729,"score_gpt":0.4004935643751954,"score_spread":0.25086724343273814,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4415710866","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.00039160458,0.00017585309,0.9442921,0.0029168834,0.000044397297,0.00014771274,0.0000026457976,0.00013486986,0.05189393],"genre_scores_gemma":[0.6464321,0.00008077968,0.35220703,0.0011419933,0.0000090672775,0.00002011021,0.00004310066,0.000004683748,0.00006112403],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9990756,0.00010201948,0.0003804875,0.00016338957,0.00014369002,0.00013485076],"domain_scores_gemma":[0.99478066,0.00025531382,0.000085990745,0.004740395,0.00010849999,0.000029153669],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0006010989,0.00008481813,0.00014718025,0.00008599492,0.00015647804,0.00014233719,0.0046104128,0.000040441013,0.000006087481],"category_scores_gemma":[0.00023617697,0.00008033916,0.00002662854,0.0015823218,0.0001370362,0.0009488367,0.0021463796,0.00022672926,0.00008251797],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[7.2853237e-7,0.0001720076,0.00010688156,0.00007217124,0.000004263227,8.53799e-8,0.0004251174,0.000008586518,0.00001093522,0.9623303,0.001278509,0.03559042],"study_design_scores_gemma":[0.000099086115,0.000003392154,0.00020769618,0.00009965438,0.0000038236594,3.7293205e-7,0.000088040324,0.41483116,0.000025083335,0.5783118,0.0062579866,0.00007194101],"about_ca_topic_score_codex":0.0000029141668,"about_ca_topic_score_gemma":0.0000024455321,"teacher_disagreement_score":0.6460405,"about_ca_system_score_codex":0.000025496196,"about_ca_system_score_gemma":0.000107812455,"threshold_uncertainty_score":0.8567371},"labels":[],"label_agreement":null},{"id":"W4415710888","doi":"10.1007/s00220-025-05482-4","title":"Orthogonal Howe Duality and Dynamical (Split) Symmetric Pairs","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"McGill University","funders":"National Science Foundation","keywords":"Dynamical systems theory; Duality (order theory); Lie group; Differential operator; Boundary (topology); Lie algebra; Dynamical system (definition); Symmetric group; Group (periodic table)","score_opus":0.05952326076974649,"score_gpt":0.36785297775790865,"score_spread":0.30832971698816214,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4415710888","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.76320326,0.0011772591,0.11549596,0.0048535615,0.00036831567,0.0015642468,0.000032029293,0.00039393225,0.11291142],"genre_scores_gemma":[0.96292704,0.00006745318,0.036585677,0.000112562324,0.00002544237,0.000077517805,0.000008281056,0.000017916984,0.00017811157],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99856365,0.0002110538,0.00052522717,0.00024464983,0.00021690229,0.00023851416],"domain_scores_gemma":[0.9954426,0.0026118646,0.00010059647,0.0016944556,0.00008371527,0.000066740045],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0004984172,0.00019094389,0.00040787627,0.000107973305,0.00018083102,0.00005884478,0.0007585379,0.00013452466,0.000018538169],"category_scores_gemma":[0.0009507198,0.00017391006,0.00009332112,0.0007891032,0.00035915058,0.00009865297,0.00080882054,0.00045551825,0.000009173818],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000058605115,0.00035113102,0.00040402403,0.0001559165,0.000030397623,4.1560557e-7,0.00019961869,0.0000019514146,0.0000058849005,0.9946516,0.00013154808,0.0040616593],"study_design_scores_gemma":[0.00037076982,0.000012604676,0.001348681,0.00012636995,0.000045248184,0.0000018662472,0.0001385765,0.01245461,0.000012034154,0.98517424,0.00015858618,0.000156437],"about_ca_topic_score_codex":0.000005527524,"about_ca_topic_score_gemma":0.000006593567,"teacher_disagreement_score":0.19972375,"about_ca_system_score_codex":0.00009604361,"about_ca_system_score_gemma":0.000066187255,"threshold_uncertainty_score":0.70918465},"labels":[],"label_agreement":null},{"id":"W4415710948","doi":"10.1007/s00220-025-05481-5","title":"Universal Chain Rules from Entropic Triangle Inequalities","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Information and Cryptography","field":"Computer Science","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Université de Montréal","funders":"Natural Sciences and Engineering Research Council of Canada; Google","keywords":"Von Neumann entropy; Entropy (arrow of time); Von Neumann architecture; Upper and lower bounds; Entropic uncertainty; Quantum system; Quantum relative entropy; Generalized relative entropy","score_opus":0.03728938505453548,"score_gpt":0.2969629909032079,"score_spread":0.2596736058486724,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4415710948","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.011958627,0.00020648494,0.9387058,0.0025611427,0.00006438304,0.00016293638,0.000008415873,0.00014664073,0.046185553],"genre_scores_gemma":[0.84470654,0.00010796254,0.15431903,0.0006029226,0.00001627217,0.00004739522,0.000036284433,0.000005215393,0.00015837689],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99910784,0.00014849911,0.00035018887,0.00011526232,0.00013730318,0.00014090583],"domain_scores_gemma":[0.9974154,0.0006874928,0.00007803245,0.0017309273,0.00005592883,0.00003217428],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00019966804,0.000097224925,0.00019240215,0.00013294016,0.00012602612,0.00011446389,0.0019135324,0.00004618687,0.000023159113],"category_scores_gemma":[0.00009646205,0.00009412249,0.00007851654,0.0006366552,0.00015017432,0.00041768336,0.000620952,0.00018087683,0.00013413714],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000011906624,0.0001512603,0.000076625816,0.000015645972,0.000012206586,1.6648397e-7,0.0021732703,0.000009899797,0.000014132236,0.9894322,0.0002624326,0.007850927],"study_design_scores_gemma":[0.00033090432,0.0000065608647,0.00034703428,0.00007811466,0.000005260931,1.1733538e-7,0.0006219136,0.11494868,0.00010649817,0.87994784,0.0035189705,0.00008811729],"about_ca_topic_score_codex":0.000018759269,"about_ca_topic_score_gemma":0.000005717108,"teacher_disagreement_score":0.83274794,"about_ca_system_score_codex":0.000045773235,"about_ca_system_score_gemma":0.00005930817,"threshold_uncertainty_score":0.38382038},"labels":[],"label_agreement":null},{"id":"W4416332390","doi":"10.1007/s00220-025-05488-y","title":"Deformed Double Current Algebras, Matrix Extended $${\\mathcal {W}}_{\\infty }$$ Algebras, Coproducts, and Intertwiners from the M2-M5 Intersection","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Algebraic structures and combinatorial models","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Krembil Foundation","keywords":"Yangian; Intersection (aeronautics); Algebra over a field; Affine transformation; Algebraic structure; Matrix (chemical analysis); Algebraic number; Construct (python library); Algebraic geometry; Current (fluid)","score_opus":0.05981073581955149,"score_gpt":0.3779628444251013,"score_spread":0.3181521086055498,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4416332390","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.8713389,0.0058605117,0.10073559,0.0080371,0.0020362441,0.0030888915,0.000044406646,0.00051415747,0.008344178],"genre_scores_gemma":[0.9891159,0.0003004517,0.009864958,0.00014520889,0.00015445176,0.00021811463,0.00004295147,0.000039161045,0.00011882836],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9978937,0.00023313343,0.0008084309,0.00041947266,0.00029747523,0.0003477859],"domain_scores_gemma":[0.9952129,0.0017924545,0.00022420762,0.0025493402,0.00014107337,0.000080025995],"candidate_categories":["metaepi_narrow"],"consensus_categories":[],"category_scores_codex":[0.0005090243,0.00034819878,0.0005310369,0.00008348307,0.0003441646,0.00015572828,0.0014370783,0.00014901249,0.00004089696],"category_scores_gemma":[0.00056433,0.00025457705,0.00014907253,0.00058787916,0.00051438936,0.00023990734,0.001203379,0.0008490497,0.000022602952],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000502735,0.0003968579,0.00016981032,0.00013232084,0.00008430673,3.202798e-7,0.0018013113,0.0000041531885,0.000044105236,0.9877868,0.0016576846,0.007872013],"study_design_scores_gemma":[0.0010677931,0.000019874771,0.0004510806,0.00046593646,0.00012381322,0.0000031727209,0.00095197704,0.005293678,0.00022538794,0.99021447,0.00093526824,0.00024756987],"about_ca_topic_score_codex":0.00007678896,"about_ca_topic_score_gemma":0.00006172166,"teacher_disagreement_score":0.11777695,"about_ca_system_score_codex":0.00021043257,"about_ca_system_score_gemma":0.000110022265,"threshold_uncertainty_score":0.99999064},"labels":[],"label_agreement":null},{"id":"W4416420824","doi":"10.1007/s00220-025-05502-3","title":"Correction: The Green Tensor of the Nonstationary Stokes System in the Half Space","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Navier-Stokes equation solutions","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of British Columbia","funders":"","keywords":"Half-space; Complex system; Tensor (intrinsic definition); Green S; Space (punctuation); Nonlinear system","score_opus":0.09358471762374745,"score_gpt":0.37358441538333814,"score_spread":0.27999969775959066,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4416420824","genre_codex":"other","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.030654103,0.001528091,0.3473577,0.1156243,0.001163055,0.008460075,0.000108393346,0.0003532613,0.494751],"genre_scores_gemma":[0.98776907,0.000025258545,0.009924015,0.00021178115,0.000030731662,0.00045068687,0.0000073232686,0.000017628676,0.001563535],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99751693,0.0010116978,0.0007500691,0.00014995232,0.00038417595,0.000187181],"domain_scores_gemma":[0.98755336,0.008729946,0.00028957246,0.0032107187,0.00020103567,0.00001539232],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0014180335,0.0001594575,0.0002896298,0.000087251,0.00045962475,0.000037596332,0.0022418348,0.00007778302,0.000010527908],"category_scores_gemma":[0.001296643,0.000090165246,0.00014642377,0.0017501203,0.000668316,0.00011930868,0.00046997683,0.0006339615,0.000030851807],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000034879022,0.0004429937,0.00038158847,0.00015260438,0.000022345605,1.940639e-7,0.0042168745,0.00017000949,0.000026863512,0.99009734,0.0036935336,0.0007921347],"study_design_scores_gemma":[0.00036422466,0.0000106965135,0.0031389624,0.00088711706,0.000107975284,0.000008912973,0.012683727,0.086500205,0.00009229428,0.89389914,0.0021697956,0.00013693079],"about_ca_topic_score_codex":0.00007028263,"about_ca_topic_score_gemma":0.00020231844,"teacher_disagreement_score":0.95711493,"about_ca_system_score_codex":0.00019052725,"about_ca_system_score_gemma":0.0001542257,"threshold_uncertainty_score":0.41659242},"labels":[],"label_agreement":null},{"id":"W4416420893","doi":"10.1007/s00220-025-05494-0","title":"On the Classification of Bosonic and Fermionic One-Form Symmetries in $$2+1$$d and ’t Hooft Anomaly Matching","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum many-body systems","field":"Physics and Astronomy","cited_by":0,"is_retracted":false,"has_abstract":true,"route_ca_aff":false,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"","funders":"Institut Périmètre de physique théorique; Royal Society; York University; Science and Technology Facilities Council; Institute of Mathematical Sciences","keywords":"Homogeneous space; Anomaly (physics); Group (periodic table); Categorical variable; Renormalization group; Matching (statistics)","score_opus":0.048224585918893226,"score_gpt":0.31793652873045114,"score_spread":0.2697119428115579,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4416420893","genre_codex":"empirical","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":"empirical","domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.9772483,0.00018667238,0.0056586154,0.0018428655,0.00001166503,0.00044444267,0.000005698078,0.000012127173,0.0145896105],"genre_scores_gemma":[0.9991662,0.00002666116,0.000590671,0.000035727982,0.00000912365,0.000105345905,0.000006592682,0.000009332493,0.000050377657],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99904615,0.00015151099,0.00042788676,0.00014192285,0.00010288381,0.00012967506],"domain_scores_gemma":[0.9970563,0.00170628,0.00013920445,0.0010334636,0.000045489905,0.000019233188],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0005196378,0.00011220388,0.00025980113,0.00010158268,0.00012433903,0.00005098111,0.00043539147,0.00003553519,0.0000072918842],"category_scores_gemma":[0.00008902107,0.000091401474,0.00003388143,0.0004660519,0.00028308618,0.000109523484,0.00027355316,0.00028371965,0.0000071719546],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000032455177,0.0002561301,0.005014371,0.00010254734,0.000020367312,2.1622599e-8,0.0008824497,0.000007537616,0.00018817243,0.9919374,0.000010016024,0.0015777302],"study_design_scores_gemma":[0.00021261141,0.000012326207,0.022250885,0.00050333864,0.0000134801185,1.2470973e-7,0.0017097644,0.025682755,0.00013527577,0.9493869,0.000014590242,0.00007794511],"about_ca_topic_score_codex":0.00006001746,"about_ca_topic_score_gemma":0.00001765596,"teacher_disagreement_score":0.042550508,"about_ca_system_score_codex":0.000038412327,"about_ca_system_score_gemma":0.000044030276,"threshold_uncertainty_score":0.37272438},"labels":[],"label_agreement":null},{"id":"W4416422148","doi":"10.1007/s00220-025-05500-5","title":"Entropy Formula of Folding Type for $$C^{1+\\alpha }$$ Maps","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Mathematical Dynamics and Fractals","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Alberta","funders":"National Key Research and Development Program of China; Natural Science Foundation of Jiangsu Province; National Natural Science Foundation of China","keywords":"Jacobian matrix and determinant; Entropy (arrow of time); Boltzmann's entropy formula; Entropy production; Inverse; Entropy rate; Joint quantum entropy; Maximum entropy probability distribution","score_opus":0.10665300075047426,"score_gpt":0.41778634826897904,"score_spread":0.31113334751850474,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4416422148","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.03858614,0.00027072788,0.90908384,0.0011633185,0.000117256684,0.002026713,0.000075746415,0.00012340416,0.04855284],"genre_scores_gemma":[0.65202737,0.00006765319,0.34710613,0.00006488784,0.000018519404,0.00017672725,0.000032750537,0.000030995594,0.00047495292],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9984708,0.00007391248,0.00084462285,0.00017776365,0.00016927952,0.00026361202],"domain_scores_gemma":[0.99326724,0.004428934,0.00022066286,0.0018052557,0.00023244988,0.000045441964],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.000576603,0.00018086785,0.0005611485,0.00010936301,0.000106736436,0.00002792203,0.0010270043,0.000099241995,0.000025207499],"category_scores_gemma":[0.0022315443,0.0001649026,0.00017381068,0.00061708526,0.00019855329,0.00010171208,0.00040895835,0.00021774163,0.000013856532],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000014563142,0.00084187597,0.00008905694,0.0009431407,0.000048868067,1.2425312e-7,0.00026762867,0.0000071992995,0.00042276693,0.9940743,0.00083849544,0.002451967],"study_design_scores_gemma":[0.0004565091,0.000029801937,0.000040576557,0.00037545807,0.00006845221,4.7256717e-7,0.000101679936,0.059884075,0.00037276535,0.9378194,0.0007188425,0.00013196503],"about_ca_topic_score_codex":0.000001507886,"about_ca_topic_score_gemma":0.000004828908,"teacher_disagreement_score":0.6134412,"about_ca_system_score_codex":0.00007011172,"about_ca_system_score_gemma":0.000059413323,"threshold_uncertainty_score":0.6724532},"labels":[],"label_agreement":null},{"id":"W4417075962","doi":"10.1007/s00220-025-05434-y","title":"Orbifold Completion of 3-Categories","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Homotopy and Cohomology in Algebraic Topology","field":"Mathematics","cited_by":0,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":true,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Perimeter Institute","funders":"Ministry of Colleges and Universities; Institut Périmètre de physique théorique; Deutsche Forschungsgemeinschaft; Universität Wien; Government of Canada","keywords":"Orbifold; Lift (data mining); Categorification; Topological quantum field theory; Triangulation; Algebra over a field; Quantum","score_opus":0.08423683883190235,"score_gpt":0.38607997041293085,"score_spread":0.3018431315810285,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4417075962","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"empirical","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.16407473,0.00056272146,0.45294785,0.0068001817,0.0002233784,0.001059203,0.000017472266,0.0002425794,0.3740719],"genre_scores_gemma":[0.94406706,0.00004479857,0.055327214,0.0000889588,0.000010531013,0.00007979871,0.000008885059,0.000009638549,0.00036310885],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99885535,0.00021776943,0.0005418839,0.0001270067,0.00009816931,0.00015984465],"domain_scores_gemma":[0.99595535,0.0021574823,0.0001294159,0.001643731,0.000094191026,0.000019829498],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.000420353,0.00011350177,0.00039098246,0.000087514316,0.000089875626,0.0000075559296,0.00087259366,0.0001117751,0.00007541098],"category_scores_gemma":[0.0006764053,0.00010911842,0.000075026874,0.0004674489,0.0007266417,0.000057870813,0.00038340213,0.00027812528,0.0000314586],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.000005331173,0.00060123764,0.00051014556,0.0001591559,0.000028955179,3.621512e-7,0.0005168201,0.0000018969745,0.00018987895,0.99605393,0.00038405342,0.0015482334],"study_design_scores_gemma":[0.00023549238,0.000016354508,0.0003472961,0.00011266281,0.000033393586,0.0000019227812,0.00025570672,0.0012940422,0.0009859931,0.9962243,0.00041303967,0.0000798332],"about_ca_topic_score_codex":0.000006157593,"about_ca_topic_score_gemma":0.000015202851,"teacher_disagreement_score":0.77999234,"about_ca_system_score_codex":0.000040648374,"about_ca_system_score_gemma":0.000056641948,"threshold_uncertainty_score":0.444972},"labels":[],"label_agreement":null},{"id":"W4417114353","doi":"10.1007/s00220-025-05483-3","title":"Monogamy of Highly Symmetric States","year":2025,"lang":"en","type":"article","venue":"Communications in Mathematical Physics","topic":"Quantum Computing Algorithms and Architecture","field":"Computer Science","cited_by":0,"is_retracted":false,"has_abstract":false,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"University of Ottawa","funders":"Novo Nordisk Fonden; Novo Nordisk; Nederlandse Organisatie voor Wetenschappelijk Onderzoek; Agence Nationale de la Recherche; Villum Fonden","keywords":"Antisymmetric relation; Unitary state; Representation (politics); State (computer science); Quantum entanglement; Quantum; Field (mathematics); Projection (relational algebra)","score_opus":0.022291703270545898,"score_gpt":0.3023171099550868,"score_spread":0.2800254066845409,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4417114353","genre_codex":"methods","genre_gemma":"empirical","domain_codex":null,"domain_gemma":null,"model_version":"codex-gemma-dda1882f352a","genre_candidate":"methods","genre_consensus":null,"domain_candidate":null,"domain_consensus":null,"prediction_status":"machine_predicted_unvalidated","genre_scores_codex":[0.01140298,0.00037295776,0.97475445,0.002019382,0.00003996504,0.00013283033,0.000001942708,0.000080466736,0.0111950515],"genre_scores_gemma":[0.6627728,0.000049905964,0.33702222,0.00008163873,0.000005584116,0.0000119239,0.0000021990504,0.0000037213804,0.00005003961],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.9991897,0.00009411998,0.00032039417,0.0001414796,0.00011686174,0.00013745789],"domain_scores_gemma":[0.99687177,0.0010334675,0.00007942797,0.0019235247,0.00006829915,0.00002353146],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.0002567931,0.00008743225,0.0002028969,0.00015456972,0.00007580897,0.00003742089,0.0021698277,0.00003184501,0.0000010437575],"category_scores_gemma":[0.00011442686,0.0000774419,0.000055272805,0.0015880917,0.00013196832,0.000085557214,0.0010477289,0.00021065398,0.000012764672],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":null,"about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[3.936079e-7,0.00026345122,0.00005779149,0.000047956222,0.000008751909,2.1640751e-7,0.00037512055,0.0014012905,0.000041680607,0.9410036,0.00008484885,0.05671489],"study_design_scores_gemma":[0.00007127096,0.0000074234254,0.00019453568,0.000074158146,0.000002401661,2.9271757e-7,0.000013835723,0.49990952,0.00028436142,0.49919584,0.00020670361,0.000039644972],"about_ca_topic_score_codex":0.0000068749077,"about_ca_topic_score_gemma":7.649896e-7,"teacher_disagreement_score":0.6513698,"about_ca_system_score_codex":0.00002352405,"about_ca_system_score_gemma":0.000045698987,"threshold_uncertainty_score":0.4032116},"labels":[],"label_agreement":null}]}