Strichartz estimates without loss on manifolds with hyperbolic trapped geodesics

Abstract

Doi proved that the L2t H1/2x local smoothing effect for Schr\"odinger equation on a Riemannian manifold does not hold if the geodesic flow has one trapped trajectory. We show in contrast that Strichartz estimates and L1 L∞ dispersive estimates still hold without loss for eit in various situations where the trapped set is hyperbolic and of sufficiently small fractal dimension.