The smallest singular value of deformed random rectangular matrices

Abstract

We prove an estimate on the smallest singular value of a multiplicatively and additively deformed random rectangular matrix. Suppose n N M N for some constant 1. Let X be an M× n random matrix with independent and identically distributed entries, which have zero mean, unit variance and arbitrarily high moments. Let T be an N× M deterministic matrix with comparable singular values c sN(T) s1(T) c-1 for some constant c>0. Let A be an N× n deterministic matrix with \|A\|=O(N). Then we prove that for any ε>0, the smallest singular value of TX-A is larger than N-ε(N-n-1) with high probability. If we assume further the entries of X have subgaussian decay, then the smallest singular value of TX-A is at least of the order N-n-1 with high probability, which is an essentially optimal estimate.