On Helmholtz equations and counterexamples to Strichartz estimates in hyperbolic space

Abstract

In this paper, we study nonlinear Helmholtz equations (NLH) -HN u - (N-1)24 u -λ2 u = |u|p-2u in HN, N≥ 2 where HN denotes the Laplace-Beltrami operator in the hyperbolic space HN and ∈ L∞(HN) is chosen suitably. Using fixed point and variational techniques, we find nontrivial solutions to (NLH) for all λ>0 and p>2. The oscillatory behaviour and decay rates of radial solutions is analyzed, with possible extensions to Cartan-Hadamard manifolds and Damek-Ricci spaces. Our results rely on a new Limiting Absorption Principle for the Helmholtz operator in HN. As a byproduct, we obtain simple counterexamples to certain Strichartz estimates.