Quantitative equidistribution of horocycle push-forwards of transverse arcs

Abstract

Let M = SL(2,R) be a compact quotient of SL(2,R) equipped with the normalized Haar measure vol, and let \ht\t ∈ R denote the horocycle flow on M. Given p ∈ M and W ∈ sl2(R) \0\ not parallel to the generator of the horocycle flow, let γpW denote the probability measure uniformly distributed along the arc s p (sW) for 0≤ s ≤ 1. We establish quantitative estimates for the rate of convergence of [(ht) γpW](f) to vol(f) for sufficiently smooth functions f. Our result is based on the work of Bufetov and Forni [2], together with a crucial geometric observation. As a corollary, we provide an alternative proof of Ratner's theorem on quantitative mixing for the horocycle flow.