Probabilistic Matrix Factorization
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Résumé
Many existing approaches to collaborative filtering can neither handle very large datasets nor easily deal with users who have very few ratings. In this paper we present the Probabilistic Matrix Factorization (PMF) model which scales linearly with the number of observations and, more importantly, performs well on the large, sparse, and very imbalanced Netflix dataset. We further extend the PMF model to include an adaptive prior on the model parameters and show how the model capacity can be controlled automatically. Finally, we introduce a constrained version of the PMF model that is based on the assumption that users who have rated similar sets of movies are likely to have similar preferences. The resulting model is able to generalize considerably better for users with very few ratings. When the predictions of multiple PMF models are linearly combined with the predictions of Restricted Boltzmann Machines models, we achieve an error rate of 0.8861, that is nearly 7% better than the score of Netflix's own system.
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La notice
- Revue
- Neural Information Processing Systems
- Thématique
- Recommender Systems and Techniques
- Domaine
- Computer Science
- Établissements canadiens
- University of Toronto
- Organismes subventionnaires
- —
- Mots-clés
- Computer scienceCollaborative filteringProbabilistic logicMatrix decompositionRecommender systemFactorizationStatistical modelRestricted Boltzmann machineArtificial intelligenceMachine learningAlgorithmDeep learning
- Résumé présent dans OpenAlex
- oui