A complete classification of threshold properties for one-dimensional discrete Schr\"odinger operators

Abstract

We consider the discrete one-dimensional Schr\"odinger operator H=H0+V, where (H0x)[n]=-(x[n+1]+x[n-1]-2x[n]) and V is a self-adjoint operator on 2(Z) with a decay property given by V extending to a compact operator from ∞,-β(Z) to 1,β(Z) for some β≥1. We give a complete description of the solutions to Hx=0, and Hx=4x, x∈∞,-β(Z). Using this description we give asymptotic expansions of the resolvent of H at the two thresholds 0 and 4. One of the main results is a precise correspondence between the solutions to Hx=0 and the leading coefficients in the asymptotic expansion of the resolvent around 0. For the resolvent expansion we implement the expansion scheme of Jensen-Nenciu JN0, JN1 in the full generality.