English

$\chi^2$-confidence sets in high-dimensional regression

Statistics Theory 2015-09-16 v2 Statistics Theory

Abstract

We study a high-dimensional regression model. Aim is to construct a confidence set for a given group of regression coefficients, treating all other regression coefficients as nuisance parameters. We apply a one-step procedure with the square-root Lasso as initial estimator and a multivariate square-root Lasso for constructing a surrogate Fisher information matrix. The multivariate square-root Lasso is based on nuclear norm loss with 1\ell_1-penalty. We show that this procedure leads to an asymptotically χ2\chi^2-distributed pivot, with a remainder term depending only on the 1\ell_1-error of the initial estimator. We show that under 1\ell_1-sparsity conditions on the regression coefficients β0\beta^0 the square-root Lasso produces to a consistent estimator of the noise variance and we establish sharp oracle inequalities which show that the remainder term is small under further sparsity conditions on β0\beta^0 and compatibility conditions on the design.

Keywords

Cite

@article{arxiv.1502.07131,
  title  = {$\chi^2$-confidence sets in high-dimensional regression},
  author = {Sara van de Geer and Benjamin Stucky},
  journal= {arXiv preprint arXiv:1502.07131},
  year   = {2015}
}

Comments

22 pages

R2 v1 2026-06-22T08:37:33.698Z