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Generalization Error of Generalized Linear Models in High Dimensions

Machine Learning 2020-05-04 v1 Machine Learning

Abstract

At the heart of machine learning lies the question of generalizability of learned rules over previously unseen data. While over-parameterized models based on neural networks are now ubiquitous in machine learning applications, our understanding of their generalization capabilities is incomplete. This task is made harder by the non-convexity of the underlying learning problems. We provide a general framework to characterize the asymptotic generalization error for single-layer neural networks (i.e., generalized linear models) with arbitrary non-linearities, making it applicable to regression as well as classification problems. This framework enables analyzing the effect of (i) over-parameterization and non-linearity during modeling; and (ii) choices of loss function, initialization, and regularizer during learning. Our model also captures mismatch between training and test distributions. As examples, we analyze a few special cases, namely linear regression and logistic regression. We are also able to rigorously and analytically explain the \emph{double descent} phenomenon in generalized linear models.

Keywords

Cite

@article{arxiv.2005.00180,
  title  = {Generalization Error of Generalized Linear Models in High Dimensions},
  author = {Melikasadat Emami and Mojtaba Sahraee-Ardakan and Parthe Pandit and Sundeep Rangan and Alyson K. Fletcher},
  journal= {arXiv preprint arXiv:2005.00180},
  year   = {2020}
}

Comments

20 pages, 4 figures

R2 v1 2026-06-23T15:13:53.974Z