English

Sparse estimation via $\ell_q$ optimization method in high-dimensional linear regression

Machine Learning 2019-11-14 v1 Machine Learning Optimization and Control

Abstract

In this paper, we discuss the statistical properties of the q\ell_q optimization methods (0<q1)(0<q\leq 1), including the q\ell_q minimization method and the q\ell_q regularization method, for estimating a sparse parameter from noisy observations in high-dimensional linear regression with either a deterministic or random design. For this purpose, we introduce a general qq-restricted eigenvalue condition (REC) and provide its sufficient conditions in terms of several widely-used regularity conditions such as sparse eigenvalue condition, restricted isometry property, and mutual incoherence property. By virtue of the qq-REC, we exhibit the stable recovery property of the q\ell_q optimization methods for either deterministic or random designs by showing that the 2\ell_2 recovery bound O(ϵ2)O(\epsilon^2) for the q\ell_q minimization method and the oracle inequality and 2\ell_2 recovery bound O(λ22qs)O(\lambda^{\frac{2}{2-q}}s) for the q\ell_q regularization method hold respectively with high probability. The results in this paper are nonasymptotic and only assume the weak qq-REC. The preliminary numerical results verify the established statistical property and demonstrate the advantages of the q\ell_q regularization method over some existing sparse optimization methods.

Keywords

Cite

@article{arxiv.1911.05073,
  title  = {Sparse estimation via $\ell_q$ optimization method in high-dimensional linear regression},
  author = {Xin Li and Yaohua Hu and Chong Li and Xiaoqi Yang and Tianzi Jiang},
  journal= {arXiv preprint arXiv:1911.05073},
  year   = {2019}
}

Comments

32 pages, 1 figure

R2 v1 2026-06-23T12:13:26.890Z