Smoothed analysis of the condition number under low-rank perturbations

Abstract

Let M be an arbitrary n by n matrix of rank n-k. We study the condition number of M plus a low-rank perturbation UVT where U, V are n by k random Gaussian matrices. Under some necessary assumptions, it is shown that M+UVT is unlikely to have a large condition number. The main advantages of this kind of perturbation over the well-studied dense Gaussian perturbation, where every entry is independently perturbed, is the O(nk) cost to store U,V and the O(nk) increase in time complexity for performing the matrix-vector multiplication (M+UVT)x. This improves the (n2) space and time complexity increase required by a dense perturbation, which is especially burdensome if M is originally sparse. Our results also extend to the case where U and V have rank larger than k and to symmetric and complex settings. We also give an application to linear systems solving and perform some numerical experiments. Lastly, barriers in applying low-rank noise to other problems studied in the smoothed analysis framework are discussed.