Delocalization and Diffusion Profile for Random Band Matrices

Abstract

We consider Hermitian and symmetric random band matrices H = (hxy) in d ≥ 1 dimensions. The matrix entries hxy, indexed by x,y ∈ (/L)d, are independent, centred random variables with variances sxy = |hxy|2. We assume that sxy is negligible if |x-y| exceeds the band width W. In one dimension we prove that the eigenvectors of H are delocalized if W L4/5. We also show that the magnitude of the matrix entries Gxy2 of the resolvent G=G(z)=(H-z)-1 is self-averaging and we compute Gxy2. We show that, as L∞ and W L4/5, the behaviour of |Gxy|2 is governed by a diffusion operator whose diffusion constant we compute. Similar results are obtained in higher dimensions.