Sub-exponential decay of eigenfunctions for some discrete Schr\"odinger operators

Abstract

Following the method of Froese and Herbst, we show for a class of potentials V that an eigenfunction with eigenvalue E of the multi-dimensional discrete Schr\"odinger operator H = + V on Zd decays sub-exponentially whenever the Mourre estimate holds at E. In the one-dimensional case we further show that this eigenfunction decays exponentially with a rate at least of cosh--1((E -- 2)/(θ\E -- 2)), where θ\E is the nearest threshold of H located between E and 2. A consequence of the latter result is the absence of eigenvalues between 2 and the nearest thresholds above and below this value. The method of Combes-Thomas is also reviewed for the discrete Schr\"odinger operators.