中文

Large Dimensional Kernel Ridge Regression: Extending to Product Kernels

机器学习 2026-05-15 v1 机器学习

摘要

Recent studies have reported saturation effects\textit{saturation effects} and multiple descent behavior\textit{multiple descent behavior} in large dimensional kernel ridge regression (KRR). However, these findings are predominantly derived under restrictive settings, such as inner product kernels on sphere or strong eigenfunction assumptions like hypercontractivity. Whether such behaviors hold for other kernels remains an open question. In this paper, we establish a broad, new family of large dimensional kernels and derive the corresponding convergence rates of the generalization error. As a result, we recover key phenomena previously associated with inner product kernels on sphere, including: i)i) the minimax optimality\textit{minimax optimality} when the source condition s1s\le 1; ii)ii) the saturation effect\textit{saturation effect} when s>1s>1; iii)iii) a periodic plateau phenomenon\textit{periodic plateau phenomenon} in the convergence rate and a multiple-descent behavior\textit {multiple-descent behavior} with respect to the sample size nn.

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引用

@article{arxiv.2605.14524,
  title  = {Large Dimensional Kernel Ridge Regression: Extending to Product Kernels},
  author = {Yang Zhou and Yicheng Li and Yuqian Cheng and Qian Lin},
  journal= {arXiv preprint arXiv:2605.14524},
  year   = {2026}
}