Spectral Geometric Matrix Completion

November 17, 2019 ยท Declared Dead ยท ๐Ÿ› Mathematical and Scientific Machine Learning

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Authors Amit Boyarski, Sanketh Vedula, Alex Bronstein arXiv ID 1911.07255 Category cs.LG: Machine Learning Cross-listed cs.CG, cs.CV, stat.ML Citations 5 Venue Mathematical and Scientific Machine Learning Last Checked 4 months ago
Abstract
Deep Matrix Factorization (DMF) is an emerging approach to the problem of matrix completion. Recent works have established that gradient descent applied to a DMF model induces an implicit regularization on the rank of the recovered matrix. In this work we interpret the DMF model through the lens of spectral geometry. This allows us to incorporate explicit regularization without breaking the DMF structure, thus enjoying the best of both worlds. In particular, we focus on matrix completion problems with underlying geometric or topological relations between the rows and/or columns. Such relations are prevalent in matrix completion problems that arise in many applications, such as recommender systems and drug-target interaction. Our contributions enable DMF models to exploit these relations, and make them competitive on real benchmarks, while exhibiting one of the first successful applications of deep linear networks.
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