Sharp Bounds for the Concentration of the Resolvent in Convex Concentration Settings

Abstract

Considering random matrix X ∈ Mp,n with independent columns satisfying the convex concentration properties issued from a famous theorem of Talagrand, we express the linear concentration of the resolvent Q = (Ip - 1nXXT) -1 around a classical deterministic equivalent with a good observable diameter for the nuclear norm. The general proof relies on a decomposition of the resolvent as a series of powers of X.