Linear Independence of Generalized Poincar\'e Series for Anti-de Sitter 3-Manifolds

Abstract

Let be a discrete group acting properly discontinuously and isometrically on the three-dimensional anti-de Sitter space AdS3, and the Laplacian which is a second-order hyperbolic differential operator. We study linear independence of a family of generalized Poincaré series introduced by Kassel-Kobayashi [Adv. Math. 287 (2016), 123-236, arXiv:1209.4075], which are defined by the -average of certain eigenfunctions on AdS3. We prove that the multiplicities of L2-eigenvalues of the hyperbolic Laplacian on 3 are unbounded when is finitely generated. Moreover, we prove that the multiplicities of stable L2-eigenvalues for compact anti-de Sitter 3-manifolds are unbounded.