Strichartz estimate and nonlinear Klein-Gordon on non-trapping scattering space

Abstract

We study the nonlinear Klein-Gordon equation on a product space M=× X with metric g=dt2-g where g is the scattering metic on X. We establish the global-in-time Strichartz estimate for Klein-Gordon equation without loss of derivative by using the microlocalized spectral measure of Laplacian on scattering manifold showed in HZ and a Littlewood-Paley squarefunction estimate proved in Zhang. We prove the global existence and scattering for a family of nonlinear Klein-Gordon equations for small initial data with minimum regularity on this setting.