Quantum diffusion and delocalization in one-dimensional band matrices via the flow method

Abstract

We study a class of Gaussian random band matrices of dimension N × N and band-width W. We show that delocalization holds for bulk eigenvectors and that quantum diffusion holds for the resolvent, all under the assumption that W N8/11. Our analysis is based on a flow method, and a refinement of it may lead to an improvement on the condition W N8/11.

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