Poisson statistics for random deformed band matrices with power law band width
Abstract
We show Poisson statistics for random band matrices which diagonal entries have Gaussian components. These components are possibly as small as n-. Particularly, our result is applicable for a band matrix cut from the GUE with the band width satisfying w3.5<<n. A uniform upper bound of the averaged density of states (DOS) is obtained for complex deformed Gaussian band matrices with arbitrary w. A lower estimate of the DOS is also proven for arbitrary w in a certain class of band matrices.
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