English

Deep Learning meets Nonparametric Regression: Are Weight-Decayed DNNs Locally Adaptive?

Machine Learning 2024-05-21 v4 Machine Learning

Abstract

We study the theory of neural network (NN) from the lens of classical nonparametric regression problems with a focus on NN's ability to adaptively estimate functions with heterogeneous smoothness -- a property of functions in Besov or Bounded Variation (BV) classes. Existing work on this problem requires tuning the NN architecture based on the function spaces and sample size. We consider a "Parallel NN" variant of deep ReLU networks and show that the standard 2\ell_2 regularization is equivalent to promoting the p\ell_p-sparsity (0<p<10<p<1) in the coefficient vector of an end-to-end learned function bases, i.e., a dictionary. Using this equivalence, we further establish that by tuning only the regularization factor, such parallel NN achieves an estimation error arbitrarily close to the minimax rates for both the Besov and BV classes. Notably, it gets exponentially closer to minimax optimal as the NN gets deeper. Our research sheds new lights on why depth matters and how NNs are more powerful than kernel methods.

Keywords

Cite

@article{arxiv.2204.09664,
  title  = {Deep Learning meets Nonparametric Regression: Are Weight-Decayed DNNs Locally Adaptive?},
  author = {Kaiqi Zhang and Yu-Xiang Wang},
  journal= {arXiv preprint arXiv:2204.09664},
  year   = {2024}
}

Comments

Published as a conference paper at ICLR 2023; 35 pages, 7 figures

R2 v1 2026-06-24T10:53:46.302Z