Spectral Statistics for one dimensional Anderson model with unbounded but decaying potential

Abstract

In this work, we study the spectral statistics for Anderson model on 2(N) with decaying randomness whose single site distribution has unbounded support. Here we consider the operator Hω given by (Hω u)n=un+1+un-1+anωn un, an n-α and \ωn\ are real i.i.d random variables following symmetric distribution μ with fat tail, i.e μ((-R,R)c)<CRδ for R 1, for some constant C. In case of α-1δ>12, we are able to show that the eigenvalue process in (-2,2) is the clock process.