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Main Authors: Guo, Ruixin, Jin, Ruoming, Li, Xinyu, Zhou, Yang
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2512.12905
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author Guo, Ruixin
Jin, Ruoming
Li, Xinyu
Zhou, Yang
author_facet Guo, Ruixin
Jin, Ruoming
Li, Xinyu
Zhou, Yang
contents Linear Autoencoders (LAEs) have shown strong performance in state-of-the-art recommender systems. However, this success remains largely empirical, with limited theoretical understanding. In this paper, we investigate the generalizability -- a theoretical measure of model performance in statistical learning -- of multivariate linear regression and LAEs. We first propose a PAC-Bayes bound for multivariate linear regression, extending the earlier bound for single-output linear regression by Shalaeva et al., and establish sufficient conditions for its convergence. We then show that LAEs, when evaluated under a relaxed mean squared error, can be interpreted as constrained multivariate linear regression models on bounded data, to which our bound adapts. Furthermore, we develop theoretical methods to improve the computational efficiency of optimizing the LAE bound, enabling its practical evaluation on large models and real-world datasets. Experimental results demonstrate that our bound is tight and correlates well with practical ranking metrics such as Recall@K and NDCG@K.
format Preprint
id arxiv_https___arxiv_org_abs_2512_12905
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle PAC-Bayes Bounds for Multivariate Linear Regression and Linear Autoencoders
Guo, Ruixin
Jin, Ruoming
Li, Xinyu
Zhou, Yang
Machine Learning
Linear Autoencoders (LAEs) have shown strong performance in state-of-the-art recommender systems. However, this success remains largely empirical, with limited theoretical understanding. In this paper, we investigate the generalizability -- a theoretical measure of model performance in statistical learning -- of multivariate linear regression and LAEs. We first propose a PAC-Bayes bound for multivariate linear regression, extending the earlier bound for single-output linear regression by Shalaeva et al., and establish sufficient conditions for its convergence. We then show that LAEs, when evaluated under a relaxed mean squared error, can be interpreted as constrained multivariate linear regression models on bounded data, to which our bound adapts. Furthermore, we develop theoretical methods to improve the computational efficiency of optimizing the LAE bound, enabling its practical evaluation on large models and real-world datasets. Experimental results demonstrate that our bound is tight and correlates well with practical ranking metrics such as Recall@K and NDCG@K.
title PAC-Bayes Bounds for Multivariate Linear Regression and Linear Autoencoders
topic Machine Learning
url https://arxiv.org/abs/2512.12905