Spectral gaps and abelian covers of convex co-compact surfaces

Abstract

Given a convex co-compact hyperbolic surface X= H2, we investigate the resonance spectrum Rj of the laplacian j on large finite abelian covers X=j H2, where j is a finite index normal subgroup of . Let δ be the Hausdorff dimension of the limit set of . We show that there exists an >0, such that for all j, resonances Rj in \ δ-< Re(s) ≤ δ \ are all real and satisfy a Weyl law given by the degree of the cover i.e. / j. In particular, we prove that for large imaginary parts, there is a uniform resonance gap, obtained through uniform Dolgopyat estimates for transfer operators. One of the new ingredients of the proof is the decay of oscillatory integrals with respect to Patterson-Sulivan measures, obtained recently by Bourgain-Dyatlov arXiv:1704.02909 .