Random band matrices in the delocalized phase, II: Generalized resolvent estimates

Abstract

This is the second part of a three part series abut delocalization for band matrices. In this paper, we consider a general class of N× N random band matrices H=(Hij) whose entries are centered random variables, independent up to a symmetry constraint. We assume that the variances E |Hij|2 form a band matrix with typical band width 1 W N. We consider the generalized resolvent of H defined as G(Z):=(H - Z)-1, where Z is a deterministic diagonal matrix such that Zij=(z 11≤ i ≤ W+ z 1 i > W ) δij, with two distinct spectral parameters z∈ C+:=\z∈ C: Im z>0\ and z∈ C+ R. In this paper, we prove a sharp bound for the local law of the generalized resolvent G for W N3/4. This bound is a key input for the proof of delocalization and bulk universality of random band matrices in PartI. Our proof depends on a fluctuations averaging bound on certain averages of polynomials in the resolvent entries, which will be proved in PartIII.