The Sobolev Inequalities on Real Hyperbolic Spaces and Eigenvalue Bounds for Schr\"odinger Operators with Complex Potentials

Abstract

In this paper, we prove the uniform estimates for the resolvent ( - α)-1 as a map from Lq to Lq' on real hyperbolic space Hn where α ∈ C [(n - 1)2/4, ∞) and 2n/(n + 2) ≤ q < 2. In contrast with analogous results on Euclidean space Rn, the exponent q here can be arbitrarily close to 2. This striking improvement is due to two non-Euclidean features of hyperbolic space: the Kunze-Stein phenomenon and the exponential decay of the spectral measure. In addition, we apply this result to the study of eigenvalue bounds of the Schr\"odinger operator with a complex potential. The improved Sobolev inequality results in a better long range eigenvalue bound on Hn than that on Rn.