Discrete time-dependent wave equation for the Schr\"odinger operator with unbounded potential

Abstract

In this article, we investigate the semiclassical version of the wave equation for the discrete Schr\"odinger operator, H,V:=--2L+V on the lattice n, where L is the discrete Laplacian, and V is a non-negative multiplication operator. We prove that H,V has a purely discrete spectrum when the potential V satisfies the condition |V(k)| ∞ as |k|∞. We also show that the Cauchy problem with regular coefficients is well-posed in the associated Sobolev type spaces and very weakly well-posed for distributional coefficients. Finally, we recover the classical solution as well as the very weak solution in certain Sobolev type spaces as the limit of the semiclassical parameter 0.