Spectral projectors, resolvent, and Fourier restriction on the hyperbolic space

Abstract

We develop a unified approach to proving Lp-Lq boundedness of spectral projectors, the resolvent of the Laplace-Beltrami operator and its derivative on Hd. In the case of spectral projectors, and when p and q are in duality, the dependence of the implicit constant on p is shown to be sharp. We also give partial results on the question of Lp-Lq boundedness of the Fourier extension operator. As an application, we prove smoothing estimates for the free Schr\"odinger equation on Hd and a limiting absorption principle for the electromagnetic Schr\"odinger equation with small potentials.