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Semi-parametric efficiency bounds for high-dimensional models

Statistics Theory 2017-10-16 v4 Methodology Statistics Theory

Abstract

Asymptotic lower bounds for estimation play a fundamental role in assessing the quality of statistical procedures. In this paper we propose a framework for obtaining semi-parametric efficiency bounds for sparse high-dimensional models, where the dimension of the parameter is larger than the sample size. We adopt a semi-parametric point of view: we concentrate on one dimensional functions of a high-dimensional parameter. We follow two different approaches to reach the lower bounds: asymptotic Cram\'er-Rao bounds and Le Cam's type of analysis. Both these approaches allow us to define a class of asymptotically unbiased or "regular" estimators for which a lower bound is derived. Consequently, we show that certain estimators obtained by de-sparsifying (or de-biasing) an 1\ell_1-penalized M-estimator are asymptotically unbiased and achieve the lower bound on the variance: thus in this sense they are asymptotically efficient. The paper discusses in detail the linear regression model and the Gaussian graphical model.

Keywords

Cite

@article{arxiv.1601.00815,
  title  = {Semi-parametric efficiency bounds for high-dimensional models},
  author = {Jana Jankova and Sara van de Geer},
  journal= {arXiv preprint arXiv:1601.00815},
  year   = {2017}
}

Comments

68 pages

R2 v1 2026-06-22T12:23:12.742Z