Delocalization and quantum diffusion of random band matrices in high dimensions II: T-expansion

Abstract

We consider Green's functions G(z):=(H-z)-1 of Hermitian random band matrices H on the d-dimensional lattice ( Z/L Z)d. The entries hxy= hyx of H are independent centered complex Gaussian random variables with variances sxy= E|hxy|2. The variances satisfy a banded profile so that sxy is negligible if |x-y| exceeds the band width W. For any n∈ N, we construct an expansion of the T-variable, Txy=|m|2 Σαsxα|Gα y|2, with an error O(W-nd/2), and use it to prove a local law on the Green's function. This T-expansion was the main tool to prove the delocalization and quantum diffusion of random band matrices for dimensions d 8 in part I of this series.