Kernel regression in high dimensions: Refined analysis beyond double descent
Abstract
In this paper, we provide a precise characterization of generalization properties of high dimensional kernel ridge regression across the under- and over-parameterized regimes, depending on whether the number of training data n exceeds the feature dimension d. By establishing a bias-variance decomposition of the expected excess risk, we show that, while the bias is (almost) independent of d and monotonically decreases with n, the variance depends on n, d and can be unimodal or monotonically decreasing under different regularization schemes. Our refined analysis goes beyond the double descent theory by showing that, depending on the data eigen-profile and the level of regularization, the kernel regression risk curve can be a double-descent-like, bell-shaped, or monotonic function of n. Experiments on synthetic and real data are conducted to support our theoretical findings.
Cite
@article{arxiv.2010.02681,
title = {Kernel regression in high dimensions: Refined analysis beyond double descent},
author = {Fanghui Liu and Zhenyu Liao and Johan A. K. Suykens},
journal= {arXiv preprint arXiv:2010.02681},
year = {2021}
}
Comments
This paper was accepted by AISTATS-2021