Lifshitz tails for random diagonal perturbations of Laurent matrices

Abstract

We study the Integrated Density of States of one-dimensional random operators acting on 2( Z) of the form T + Vω where T is a Laurent (also called bi-infinite Toeplitz) matrix and Vω is an Anderson potential generated by i.i.d. random variables. We assume that the operator T is associated to a bounded, H\"older-continuous symbol f, that attains its minimum at a finite number of points. We allow for f to attain its minima algebraically. The resulting operator T is long-range with weak (algebraic) off-diagonal decay. We prove that this operator exhibits Lifshitz tails at the lower edge of the spectrum with an exponent given by the Integrated Density of States of T at the lower spectral edge. The proof relies on generalizations of Dirichlet-Neumann bracketing to the long-range setting and a generalization of Temple's inequality to degenerate ground state energies.