The scaling limit of the critical one-dimensional random Schrodinger operator

Abstract

We consider two models of one-dimensional discrete random Schrodinger operators (Hn )l =l-1+l +1+vl l, 0=n+1=0 in the cases vk=σ ωk/n and vk=σ ωk/ k. Here ωk are independent random variables with mean 0 and variance 1. We show that the eigenvectors are delocalized and the transfer matrix evolution has a scaling limit given by a stochastic differential equation. In both cases, eigenvalues near a fixed bulk energy E have a point process limit. We give bounds on the eigenvalue repulsion, large gap probability, identify the limiting intensity and provide a central limit theorem. In the second model, the limiting processes are the same as the point processes obtained as the bulk scaling limits of the beta-ensembles of random matrix theory. In the first model, the eigenvalue repulsion is much stronger.