Quantum Diffusion and Eigenfunction Delocalization in a Random Band Matrix Model

Abstract

We consider Hermitian and symmetric random band matrices H in d ≥ 1 dimensions. The matrix elements Hxy, indexed by x,y ∈ ⊂ d, are independent, uniformly distributed random variables if x-y is less than the band width W, and zero otherwise. We prove that the time evolution of a quantum particle subject to the Hamiltonian H is diffusive on time scales t Wd/3. We also show that the localization length of an arbitrarily large majority of the eigenvectors is larger than a factor Wd/6 times the band width. All results are uniform in the size of the matrix.