Sparse estimation via $\ell_q$ optimization method in high-dimensional linear regression
Abstract
In this paper, we discuss the statistical properties of the optimization methods , including the minimization method and the 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 -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 -REC, we exhibit the stable recovery property of the optimization methods for either deterministic or random designs by showing that the recovery bound for the minimization method and the oracle inequality and recovery bound for the regularization method hold respectively with high probability. The results in this paper are nonasymptotic and only assume the weak -REC. The preliminary numerical results verify the established statistical property and demonstrate the advantages of the 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