{"meta":{"query_hash":"9766bc3836bd","filters":{"venue":"Mathematica"},"cohort_total":3,"direct_labels_cover":0,"predictions_cover":3,"exported":3,"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/9766bc3836bd","api":"https://metacan.xera.ac/api/v1/cohort?venue=Mathematica"},"results":[{"id":"W3167808758","doi":"10.24193/mathcluj.2021.1.06","title":"Well-posedness and exponential decay for a laminated beam in thermoelasticity of type III with delay term","year":2021,"lang":"en","type":"article","venue":"Mathematica","topic":"Advanced Mathematical Modeling in Engineering","field":"Computer Science","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":"Toronto Metropolitan University","funders":"","keywords":"Term (time); Type (biology); Beam (structure); Exponential stability; Exponential growth; Exponential decay; Mathematical analysis; Exponential type; Mathematics; Exponential function; Physics; Quantum mechanics; Optics; Geology","score_opus":0.013464307537663135,"score_gpt":0.2411962324156541,"score_spread":0.22773192487799096,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W3167808758","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":[0.31884196,0.000029035291,0.68052626,0.000023918241,0.000032318025,0.00014930277,7.730387e-7,0.00003912503,0.00035729114],"genre_scores_gemma":[0.7219136,0.0000028256131,0.27796814,0.000008441276,0.0000064460005,0.000024068406,8.3628623e-7,0.000012887934,0.00006275389],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"simulation_or_modeling","domain_scores_codex":[0.99912816,0.000012744255,0.0002723554,0.00023638744,0.00014678287,0.00020354781],"domain_scores_gemma":[0.9990714,0.00037817043,0.00006711747,0.00031957304,0.000113349095,0.00005037749],"candidate_categories":[],"consensus_categories":[],"category_scores_codex":[0.00015861043,0.00012434108,0.0002786975,0.000056945308,0.000027389327,0.000028877175,0.00022165304,0.000045926532,0.000012173295],"category_scores_gemma":[0.000115778865,0.000099545265,0.000024997698,0.00024884284,0.000043252894,0.00013098335,0.00012880444,0.00007140202,0.0000021437647],"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":[0.00023227156,0.00197598,0.00016336114,0.0056812777,0.00023623738,0.00023731221,0.014666721,0.042120688,0.17413366,0.7508058,0.00004660545,0.009700097],"study_design_scores_gemma":[0.0012219106,0.00015890395,0.00013382563,0.0006324765,0.000030376863,0.00009130648,0.0001071112,0.89909214,0.06996158,0.028273465,0.00001563719,0.00028126704],"about_ca_topic_score_codex":7.002468e-7,"about_ca_topic_score_gemma":0.0000023129915,"teacher_disagreement_score":0.85697144,"about_ca_system_score_codex":0.000017064813,"about_ca_system_score_gemma":0.000036388592,"threshold_uncertainty_score":0.4059338},"labels":[],"label_agreement":null},{"id":"W4200230425","doi":"10.24193/mathcluj.2021.2.01","title":"A note on the Diophantine Equation x^2-kxy+ky^2+ly=0","year":2021,"lang":"en","type":"article","venue":"Mathematica","topic":"Advanced Mathematical Theories and Applications","field":"Physics and Astronomy","cited_by":1,"is_retracted":false,"has_abstract":true,"route_ca_aff":true,"route_ca_fund":false,"route_ca_venue":false,"route_about_ca":false,"ca_institutions":"Carleton University","funders":"","keywords":"Diophantine equation; Mathematics; Legendre's equation; Characterization (materials science); Diophantine set; Pure mathematics; Discrete mathematics; Physics","score_opus":0.023845753857601192,"score_gpt":0.28730089453095176,"score_spread":0.2634551406733506,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4200230425","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":[0.017345982,0.000016819076,0.7379433,0.005604207,0.00005315069,0.00032168403,0.00002598149,0.00006307276,0.23862584],"genre_scores_gemma":[0.9762411,0.0000020339176,0.016859509,0.00032395404,0.00023738109,0.00020607773,0.00002228018,0.000026878417,0.0060807453],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.9991942,0.00003082711,0.0002294929,0.00018125492,0.00017379671,0.00019044382],"domain_scores_gemma":[0.9986522,0.00064669683,0.0000878827,0.00049955584,0.0000641303,0.00004949661],"candidate_categories":["insufficient_payload"],"consensus_categories":["insufficient_payload"],"category_scores_codex":[0.00015455497,0.0001280939,0.00017088185,0.000012339907,0.0002053535,0.000058716287,0.00014946469,0.000020733081,0.0036954638],"category_scores_gemma":[0.00009801552,0.00008160493,0.00010091098,0.0001937039,0.000055237895,0.00004623566,0.000065377484,0.00011907865,0.0008645262],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.0000020341454,0.00016370961,0.0000036886463,0.000016345823,0.000016508126,6.212642e-7,0.00025880866,0.000017514607,0.001348842,0.9940693,0.0004171258,0.0036855098],"study_design_scores_gemma":[0.00014238668,0.000012153839,0.000012572756,0.000057980542,0.000024380457,0.000001422664,0.00038038922,0.002676119,0.02020079,0.9637474,0.012623041,0.00012136694],"about_ca_topic_score_codex":0.0000010427872,"about_ca_topic_score_gemma":1.5217694e-7,"teacher_disagreement_score":0.95889515,"about_ca_system_score_codex":0.000009745414,"about_ca_system_score_gemma":0.000023395567,"threshold_uncertainty_score":0.9999134},"labels":[],"label_agreement":null},{"id":"W4224102154","doi":"10.24193/mathcluj.2022.1.02","title":"Least primes which split in imaginary quadratic fields","year":2022,"lang":"en","type":"article","venue":"Mathematica","topic":"Analytic Number Theory Research","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":"Brock University","funders":"Natural Sciences and Engineering Research Council of Canada","keywords":"The Imaginary; Quadratic equation; Quadratic field; Mathematics; Class (philosophy); Pure mathematics; Quadratic function; Computer science; Artificial intelligence; Geometry; Psychology","score_opus":0.047684934953181164,"score_gpt":0.34597366369476545,"score_spread":0.2982887287415843,"validation_status":"score_only:v0-immature-baseline","prediction":{"id":"W4224102154","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":[0.5250881,0.00019687894,0.009357958,0.0072686714,0.00019351332,0.0016695134,0.00002588609,0.0003469367,0.45585257],"genre_scores_gemma":[0.9671533,0.0000027130714,0.010580617,0.0001252494,0.000045969577,0.00027415392,0.0000054721168,0.00006072153,0.021751788],"study_design_codex":"theoretical_or_conceptual","study_design_gemma":"theoretical_or_conceptual","domain_scores_codex":[0.99756145,0.00033829722,0.00053892354,0.00033393904,0.00072866544,0.00049873086],"domain_scores_gemma":[0.9978577,0.0010756361,0.000118053686,0.00078478694,0.000063335494,0.00010048492],"candidate_categories":["insufficient_payload"],"consensus_categories":[],"category_scores_codex":[0.0018021634,0.000203138,0.00043631665,0.00022093992,0.0002050629,0.00005331958,0.0006220468,0.00005185286,0.011896721],"category_scores_gemma":[0.0008515424,0.00019169172,0.00009580173,0.0006932688,0.00007844118,0.00011033526,0.00056594244,0.0006038186,0.00036849835],"study_design_candidate":"theoretical_or_conceptual","study_design_consensus":"theoretical_or_conceptual","about_ca_topic_candidate":false,"about_ca_topic_consensus":false,"about_ca_system_candidate":false,"about_ca_system_consensus":false,"study_design_scores_codex":[0.00007798617,0.0012971071,0.0010937889,0.0008851297,0.00008455522,0.00017547086,0.006663388,0.000037871985,0.00019246229,0.9648999,0.02379234,0.0007999919],"study_design_scores_gemma":[0.00047555266,0.00009878248,0.00013653489,0.00006602971,0.000030973646,0.00012845521,0.0024689494,0.008751809,0.000118952565,0.9866221,0.00084543996,0.0002564168],"about_ca_topic_score_codex":0.000023083361,"about_ca_topic_score_gemma":0.000031238687,"teacher_disagreement_score":0.44206524,"about_ca_system_score_codex":0.00017749664,"about_ca_system_score_gemma":0.00014035607,"threshold_uncertainty_score":0.9890065},"labels":[],"label_agreement":null}]}