Localization and delocalization for heavy tailed band matrices

Abstract

We consider some random band matrices with band-width Nμ whose entries are independent random variables with distribution tail in x-α. We consider the largest eigenvalues and the associated eigenvectors and prove the following phase transition. On the one hand, when α2(1+μ-1), the largest eigenvalues have order N(1+μ)/α, are asymptotically distributed as a Poisson process and their associated eigenvectors are essentially carried by two coordinates (this phenomenon has already been remarked by Soshnikov for full matrices with heavy tailed entries,i.e. when α2, and by Auffinger, Ben Arous and P\'ech\'e when α4). On the other hand, when α2(1+μ-1), the largest eigenvalues have order Nμ/2 and most eigenvectors of the matrix are delocalized, i.e. approximately uniformly distributed on their N coordinates.