Restricted invertibility revisited

Abstract

Suppose that m,n∈ N and that A:Rm Rn is a linear operator. It is shown here that if k,r∈ N satisfy k<r rank(A) then there exists a subset σ⊂eq \1,…,m\ with |σ|=k such that the restriction of A to Rσ⊂eq Rm is invertible, and moreover the operator norm of the inverse A-1:A(Rσ) Rm is at most a constant multiple of the quantity mr/((r-k)Σi=rm si(A)2), where s1(A)≥slant…≥slant sm(A) are the singular values of A. This improves over a series of works, starting from the seminal Bourgain--Tzafriri Restricted Invertibility Principle, through the works of Vershynin, Spielman--Srivastava and Marcus--Spielman--Srivastava. In particular, this directly implies an improved restricted invertibility principle in terms of Schatten--von Neumann norms.