Invertibility via distance for non-centered random matrices with continuous distributions

Abstract

Let A be an n× n random matrix with independent rows R1(A),…,Rn(A), and assume that for any i≤ n and any three-dimensional linear subspace F⊂ Rn the orthogonal projection of Ri(A) onto F has distribution density (x):F R+ satisfying (x)≤ C1/(1,\|x\|22000) (x∈ F) for some constant C1>0. We show that for any fixed n× n real matrix M we have P\s(A+M)≤ t n-1/2\≤ C'\, t, t>0, where C'>0 is a universal constant. In particular, the above result holds if the rows of A are independent centered log-concave random vectors with identity covariance matrices. Our method is free from any use of covering arguments, and is principally different from a standard approach involving a decomposition of the unit sphere and coverings, as well as an approach of Sankar-Spielman-Teng for non-centered Gaussian matrices.