Delocalization of Two-Dimensional Random Band Matrices
Abstract
We study a random band matrix H=(Hxy)x,y of dimension N× N with mean-zero complex Gaussian entries, where x,y belong to the discrete torus (Z/NZ)2. The variance profile E|Hxy|2=Sxy vanishes when the distance between x,y is larger than some band-width parameter W depending on N. We show that if the band-width satisfies W≥ Nc for some c>0, then in the large-N limit, we have the following results. The first result is a local semicircle law in the bulk down to scales N-1+. The second is delocalization of bulk eigenvectors. The third is a quantum unique ergodicity for bulk eigenvectors. The fourth is universality of local bulk eigenvalue statistics. The fifth is a quantum diffusion profile for the associated T matrix. Our method is based on embedding H inside a matrix Brownian motion Ht as done in [Dubova-Yang '24] and [Yau-Yin '25] for band matrices on the one-dimensional torus. In this paper, the key additional ingredient in our analysis of Ht is a new CLT-type estimate for polynomials in the entries of the resolvent of Ht.
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