Bulk universality and quantum unique ergodicity for random band matrices in high dimensions
Abstract
We consider Hermitian random band matrices H=(hxy) on the d-dimensional lattice ( Z/L Z)d, where the entries hxy= hyx are independent centered complex Gaussian random variables with variances sxy= E|hxy|2. The variance matrix S=(sxy) has a banded profile so that sxy is negligible if |x-y| exceeds the band width W. For dimensions d 7, we prove the bulk eigenvalue universality of H under the condition W L95/(d+95). Assuming that W≥ Lε for a small constant ε >0, we also prove the quantum unique ergodicity for the bulk eigenvectors of H and a sharp local law for the Green's function G(z)=(H-z)-1 up to Im \, z W-5L5-d. The local law implies that the bulk eigenvector entries of H are of order O(W-5/2L-d/2+5/2) with high probability.
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