On the efficiency of the de-biased Lasso

Abstract

We consider the high-dimensional linear regression model Y = X β0 + ε with Gaussian noise ε and Gaussian random design X. We assume that := E XT X / n is non-singular and write its inverse as := -1. The parameter of interest is the first component β10 of β0. We show that in the high-dimensional case the asymptotic variance of a debiased Lasso estimator can be smaller than 1,1. For some special such cases we establish asymptotic efficiency. The conditions include β0 being sparse and the first column 1 of being not sparse. These conditions depend on whether is known or not.