中文

Optimal ridge regularization revisited

机器学习 2026-05-28 v1 机器学习

摘要

We consider L2L^2-regularized linear (ridge) regression over a finite data sample XX with bounded covariance and linear prediction targets yy with additive isotropic noise of finite variance. We present an iterative procedure to compute the optimal regularization strength numerically from the generative parameters in the fixed-XX setting and prove its convergence at limited noise levels. Our experimental evaluation over synthetic data shows that the proposed procedure combined with sample-based parameter estimates attains near-optimal random-XX generalization across a wide range of sample sizes, aspect ratios, and noise levels, at an added computational cost equivalent to one preliminary ridge regression in the underparameterized regime and two in the overparameterized case.

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引用

@article{arxiv.2605.28679,
  title  = {Optimal ridge regularization revisited},
  author = {Jack Timmermans and Sergio A. Alvarez},
  journal= {arXiv preprint arXiv:2605.28679},
  year   = {2026}
}