Delocalization for a class of random block band matrices

Abstract

We consider N× N Hermitian random matrices H consisting of blocks of size M≥ N6/7. The matrix elements are i.i.d. within the blocks, close to a Gaussian in the four moment matching sense, but their distribution varies from block to block to form a block-band structure, with an essential band width M. We show that the entries of the Green's function G(z)=(H-z)-1 satisfy the local semicircle law with spectral parameter z=E+iη down to the real axis for any η N-1, using a combination of the supersymmetry method inspired by Sh2014 and the Green's function comparison strategy. Previous estimates were valid only for η M-1. The new estimate also implies that the eigenvectors in the middle of the spectrum are fully delocalized.