English

Penalized Maximum Tangent Likelihood Estimation and Robust Variable Selection

Methodology 2017-08-23 v2

Abstract

We introduce a new class of mean regression estimators -- penalized maximum tangent likelihood estimation -- for high-dimensional regression estimation and variable selection. We first explain the motivations for the key ingredient, maximum tangent likelihood estimation (MTE), and establish its asymptotic properties. We further propose a penalized MTE for variable selection and show that it is n\sqrt{n}-consistent, enjoys the oracle property. The proposed class of estimators consists penalized 2\ell_2 distance, penalized exponential squared loss, penalized least trimmed square and penalized least square as special cases and can be regarded as a mixture of minimum Kullback-Leibler distance estimation and minimum 2\ell_2 distance estimation. Furthermore, we consider the proposed class of estimators under the high-dimensional setting when the number of variables dd can grow exponentially with the sample size nn, and show that the entire class of estimators (including the aforementioned special cases) can achieve the optimal rate of convergence in the order of ln(d)/n\sqrt{\ln(d)/n}. Finally, simulation studies and real data analysis demonstrate the advantages of the penalized MTE.

Keywords

Cite

@article{arxiv.1708.05439,
  title  = {Penalized Maximum Tangent Likelihood Estimation and Robust Variable Selection},
  author = {Yichen Qin and Shaobo Li and Yang Li and Yan Yu},
  journal= {arXiv preprint arXiv:1708.05439},
  year   = {2017}
}

Comments

30 pages, 3 figures

R2 v1 2026-06-22T21:17:33.893Z