English

Delocalization and Diffusion Profile for Random Band Matrices

Probability 2015-06-05 v3 Mathematical Physics math.MP

Abstract

We consider Hermitian and symmetric random band matrices H=(hxy)H = (h_{xy}) in d1d \geq 1 dimensions. The matrix entries hxyh_{xy}, indexed by x,y(\bZ/L\bZ)dx,y \in (\bZ/L\bZ)^d, are independent, centred random variables with variances sxy=\Ehxy2s_{xy} = \E |h_{xy}|^2. We assume that sxys_{xy} is negligible if xy|x-y| exceeds the band width WW. In one dimension we prove that the eigenvectors of HH are delocalized if WL4/5W\gg L^{4/5}. We also show that the magnitude of the matrix entries \absGxy2\abs{G_{xy}}^2 of the resolvent G=G(z)=(Hz)1G=G(z)=(H-z)^{-1} is self-averaging and we compute \E\absGxy2\E \abs{G_{xy}}^2. We show that, as LL\to\infty and WL4/5W\gg L^{4/5}, the behaviour of \EGxy2\E |G_{xy}|^2 is governed by a diffusion operator whose diffusion constant we compute. Similar results are obtained in higher dimensions.

Keywords

Cite

@article{arxiv.1205.5669,
  title  = {Delocalization and Diffusion Profile for Random Band Matrices},
  author = {Laszlo Erdos and Antti Knowles and Horng-Tzer Yau and Jun Yin},
  journal= {arXiv preprint arXiv:1205.5669},
  year   = {2015}
}
R2 v1 2026-06-21T21:09:27.181Z