Random band matrices in the delocalized phase, III: Averaging fluctuations

Abstract

We consider a general class of symmetric or Hermitian random band matrices H=(hxy)x,y ∈ 1,Nd in any dimension d 1, where the entries are independent, centered random variables with variances sxy= E|hxy|2. We assume that sxy vanishes if |x-y| exceeds the band width W, and we are interested in the mesoscopic scale with 1 W N. Define the generalized resolvent of H as G(H,Z):=(H - Z)-1, where Z is a deterministic diagonal matrix with entries Zxx∈ C+ for all x. Then we establish a precise high-probability bound on certain averages of polynomials of the resolvent entries. As an application of this fluctuation averaging result, we give a self-contained proof for the delocalization of random band matrices in dimensions d 2. More precisely, for any fixed d 2, we prove that the bulk eigenvectors of H are delocalized in certain averaged sense if N W1+d2. This improves the corresponding results in HeMa2018 under the assumption N W1+dd+1, and in ErdKno2013,ErdKno2011 under the assumption N W1+d6. For 1D random band matrices, our fluctuation averaging result was used in PartII,PartI to prove the delocalization conjecture and bulk universality for random band matrices with N W4/3.