Construction of Isozaki-Kitada modifiers for discrete Schr\"odinger operators on general lattices

Abstract

We consider a scattering theory for convolution operators on H=2(Zd; Cn) perturbed with a long-range potential V:Zdn. One of the motivating examples is discrete Schr\"odinger operators on Zd-periodic graphs. We construct time-independent modifiers, so-called Isozaki-Kitada modifiers, and we prove that the modified wave operators with the above-mentioned Isozaki-Kitada modifiers exist and that they are complete.