Uniform Strichartz estimates on the lattice

Abstract

In this paper, we investigate Strichartz estimates for discrete linear Schr\"odinger and discrete linear Klein-Gordon equations on a lattice hZd with h>0, where h is the distance between two adjacent lattice points. As for fixed h>0, Strichartz estimates for discrete Schr\"odinger and one-dimensional discrete Klein-Gordon equations are established by Stefanov-Kevrekidis SK2005. Our main result shows that such inequalities hold uniformly in h∈(0,1] with additional fractional derivatives on the right hand side. As an application, we obtain local well-posedness of a discrete nonlinear Schr\"odinger equation with a priori bounds independent of h. The theorems and the harmonic analysis tools developed in this paper would be useful in the study of the continuum limit h 0 for discrete models, including our forthcoming work HY where strong convergence for a discrete nonlinear Schr\"odinger equation is addressed.