Lifshitz tails for the fractional Anderson model

Abstract

We consider the d-dimensional fractional Anderson model (-)α+ Vω on 2( Zd) where 0<α≤ 1. Here - is the negative discrete Laplacian and Vω is the random Anderson potential consisting of iid random variables. We prove that the model exhibits Lifshitz tails at the lower edge of the spectrum with exponent d/ (2α). To do so, we show among other things that the non-diagonal matrix elements of the negative discrete fractional Laplacian are negative and satisfy the two-sided bound cα,d|n-m|d+2α ≤ -(-)α(n,m)≤ Cα,d|n-m|d+2α for positive constants cα,d, Cα,d and all n≠ m∈ Zd.