A Perturbation Inequality for the Schatten-p Quasi-Norm and Its Applications to Low-Rank Matrix Recovery

Abstract

In this paper, we establish the following perturbation result concerning the singular values of a matrix: Let A,B ∈ Rm× n be given matrices, and let f:R+→R+ be a concave function satisfying f(0)=0. Then, we have Σi=1\m,n\ | f(σi(A)) - f(σi(B)) | Σi=1\m,n\ f(σi(A-B)), where σi(·) denotes the i--th largest singular value of a matrix. This answers an open question that is of interest to both the compressive sensing and linear algebra communities. In particular, by taking f(·)=(·)p for any p ∈ (0,1], we obtain a perturbation inequality for the so--called Schatten p--quasi--norm, which allows us to confirm the validity of a number of previously conjectured conditions for the recovery of low--rank matrices via the popular Schatten p--quasi--norm heuristic. We believe that our result will find further applications, especially in the study of low--rank matrix recovery.