Pointwise Equidistribution and Translates of Measures on Homogeneous Spaces

Abstract

Let (X,B,μ) be a Borel probability space. Let Tn: X→ X be a sequence of continuous transformations on X. Let be a probability measure on X such that 1NΣn=1N (Tn) → μ in the weak- topology. Under general conditions, we show that for almost every x∈ X, the measures 1NΣn=1N δTn x get equidistributed towards μ if N is restricted to a set of full upper density. We present applications of these results to translates of closed orbits of Lie groups on homogeneous spaces. As a corollary, we prove equidistribution of exponentially sparse orbits of the horocycle flow on quotients of SL(2,R), starting from every point in almost every direction.