From semiclassical Strichartz estimates to uniform Lp resolvent estimates on compact manifolds

Abstract

We prove uniform Lp resolvent estimates for the stationary damped wave operator. The uniform Lp resolvent estimates for the Laplace operator on a compact smooth Riemannian manifold without boundary were first established by Dos Santos Ferreira-Kenig-Salo and advanced further by Bourgain-Shao-Sogge-Yao. Here we provide an alternative proof relying on the techniques of semiclassical Strichartz estimates. This approach allows us also to handle non-self-adjoint perturbations of the Laplacian and embeds very naturally in the semiclassical spectral analysis framework.