On Eigenvectors of Random Band Matrices with Large Band

Abstract

We study random, symmetric N × N band matrices with a band of size W and Bernoulli random variables as entries. This interpolates between nearest neighbour interaction W = 1 and Wigner matrices W = N. Eigenvectors are known to be localized for W N1/8, delocalized for W N4/5 and it is conjectured that the transition for the bulk occurs at W N1/2. Eigenvalues in the spectral edge change their behavior at W N5/6 but nothing is known about the associated eigenvectors. We show that up to W N5/7 any random matrix has with large probability some eigenvectors in the spectral edge, which either exhibit mass concentration or interact strongly on a small scale.