Abstract
Abstract
We consider Abelian covers of compact hyperbolic surfaces. We establish an asymptotic expansion of the correlations for the horocycle flow on
Z
d
-covers, thus proving a strong form of Krickeberg mixing. We also prove that the spectral measures around 0 of the Casimir operators on any increasing sequence of finite Abelian covers converge weakly to an absolutely continuous measure.
Reference27 articles.
1. Local limit theorems for partial sums of stationary sequences generated by Gibbs-Markov maps;Aaronson;Stoch. Dyn.,2001
2. On the classification of invariant measures for horospherical foliations on nilpotent covers of negatively curved manifolds;Babillot,2004
3. Geodesic paths and horocycle flows on Abelian covers;Babillot,1998
4. Sector estimates for hyperbolic isometries;Bourgain;Geom. Funct. Anal.,2010