Large covers and sharp resonances of hyperbolic surfaces

Abstract

Let be a convex co-compact discrete group of isometries of the hyperbolic plane H2, and X= H2 the associated surface. In this paper we investigate the behaviour of resonances of the Laplacian for large degree covers of X given by a finite index normal subgroup of . Using various techniques of thermodynamical formalism and representation theory, we prove two new existence results of "sharp non-trivial resonances" close to (s)=δ, both in the large degree limit, for abelian covers and also infinite index congruence subgroups of SL2(Z).