Sharp time decay estimates for the discrete Klein-Gordon equation

Abstract

We establish sharp time decay estimates for the the Klein-Gordon equation on the cubic lattice in dimensions d=2,3,4. The 1∞ dispersive decay rate is |t|-3/4 for d=2, |t|-7/6 for d=3 and |t|-3/2|t| for d=4. These decay rates are faster than conjectured by Kevrekidis and Stefanov (2005). The proof relies on oscillatory integral estimates and proceeds by a detailed analysis of the the singularities of the associated phase function. We also prove new Strichartz estimates and discuss applications to nonlinear PDEs and spectral theory.