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arxiv: 2212.08339 · v1 · pith:NHGDVJPX · submitted 2022-12-16 · cs.LG · stat.ML

Generalization Bounds for Inductive Matrix Completion in Low-noise Settings

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classification cs.LG stat.ML
keywords matrixcompletionnoiserecoverytheyapproachesapproximatebounds
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We study inductive matrix completion (matrix completion with side information) under an i.i.d. subgaussian noise assumption at a low noise regime, with uniform sampling of the entries. We obtain for the first time generalization bounds with the following three properties: (1) they scale like the standard deviation of the noise and in particular approach zero in the exact recovery case; (2) even in the presence of noise, they converge to zero when the sample size approaches infinity; and (3) for a fixed dimension of the side information, they only have a logarithmic dependence on the size of the matrix. Differently from many works in approximate recovery, we present results both for bounded Lipschitz losses and for the absolute loss, with the latter relying on Talagrand-type inequalities. The proofs create a bridge between two approaches to the theoretical analysis of matrix completion, since they consist in a combination of techniques from both the exact recovery literature and the approximate recovery literature.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Sample-efficient inductive matrix completion with noise and inexact side-information

    stat.ML 2026-05 unverdicted novelty 7.0

    Nonconvex projected gradient descent for noisy inductive matrix completion achieves linear convergence and order-optimal error at sample complexity scaling with side-information dimension a instead of ambient dimension n.

  2. Sample-efficient inductive matrix completion with noise and inexact side-information

    stat.ML 2026-05 unverdicted novelty 7.0

    A projected gradient descent algorithm for noisy inductive matrix completion achieves linear convergence and stable recovery at sample complexity governed by side-information dimension, extending to inexact side-infor...