Diffusion Profile for Random Band Matrices: a Short Proof

Abstract

Let H be a Hermitian random matrix whose entries Hxy are independent, centred random variables with variances Sxy = E|Hxy|2, where x, y ∈ ( Z/L Z)d and d ≥ 1. The variance Sxy is negligible if |x - y| is bigger than the band width W. For d = 1 we prove that if L W1 + 27 then the eigenvectors of H are delocalized and that an averaged version of |Gxy(z)|2 exhibits a diffusive behaviour, where G(z) = (H-z)-1 is the resolvent of H. This improves the previous assumption L W1 + 14 by Erdos et al. (2013). In higher dimensions d ≥ 2, we obtain similar results that improve the corresponding by Erdos et al. Our results hold for general variance profiles Sxy and distributions of the entries Hxy. The proof is considerably simpler and shorter than that by Erdos et al. It relies on a detailed Fourier space analysis combined with isotropic estimates for the fluctuating error terms. It avoids the intricate fluctuation averaging machinery used by Erdos and collaborators.