English

Regularization Matters: A Nonparametric Perspective on Overparametrized Neural Network

Machine Learning 2021-09-28 v2 Machine Learning

Abstract

Overparametrized neural networks trained by gradient descent (GD) can provably overfit any training data. However, the generalization guarantee may not hold for noisy data. From a nonparametric perspective, this paper studies how well overparametrized neural networks can recover the true target function in the presence of random noises. We establish a lower bound on the L2L_2 estimation error with respect to the GD iterations, which is away from zero without a delicate scheme of early stopping. In turn, through a comprehensive analysis of 2\ell_2-regularized GD trajectories, we prove that for overparametrized one-hidden-layer ReLU neural network with the 2\ell_2 regularization: (1) the output is close to that of the kernel ridge regression with the corresponding neural tangent kernel; (2) minimax {optimal} rate of L2L_2 estimation error can be achieved. Numerical experiments confirm our theory and further demonstrate that the 2\ell_2 regularization approach improves the training robustness and works for a wider range of neural networks.

Keywords

Cite

@article{arxiv.2007.02486,
  title  = {Regularization Matters: A Nonparametric Perspective on Overparametrized Neural Network},
  author = {Tianyang Hu and Wenjia Wang and Cong Lin and Guang Cheng},
  journal= {arXiv preprint arXiv:2007.02486},
  year   = {2021}
}
R2 v1 2026-06-23T16:52:18.387Z