English

Aggregated hold out for sparse linear regression with a robust loss function

Statistics Theory 2022-12-08 v2 Statistics Theory

Abstract

Sparse linear regression methods generally have a free hyperparameter which controls the amount of sparsity, and is subject to a bias-variance tradeoff. This article considers the use of Aggregated hold-out to aggregate over values of this hyperparameter, in the context of linear regression with the Huber loss function. Aggregated hold-out (Agghoo) is a procedure which averages estimators selected by hold-out (cross-validation with a single split). In the theoretical part of the article, it is proved that Agghoo satisfies a non-asymptotic oracle inequality when it is applied to sparse estimators which are parametrized by their zero-norm. In particular , this includes a variant of the Lasso introduced by Zou, Hasti{\'e} and Tibshirani. Simulations are used to compare Agghoo with cross-validation. They show that Agghoo performs better than CV when the intrinsic dimension is high and when there are confounders correlated with the predictive covariates.

Cite

@article{arxiv.2002.11553,
  title  = {Aggregated hold out for sparse linear regression with a robust loss function},
  author = {Guillaume Maillard},
  journal= {arXiv preprint arXiv:2002.11553},
  year   = {2022}
}
R2 v1 2026-06-23T13:54:42.222Z