Sparse Equidistribution of Unipotent Orbits in Finite-Volume Quotients of PSL(2, R), with appendices

Abstract

In this note, we consider the orbits \pu(n1+γ)|n∈ N\ in (2, R), where is a non-uniform lattice in PSL(2, R) and u(t) is the standard unipotent group in PSL(2, R). Under a Diophantine condition on the intial point p, we can prove that \pu(n1+γ)|n∈ N\ is equidistributed in (2, R) for small γ>0, which generalizes a result of Venkatesh (Ann.of Math. 2010). We will compute Hausdorff dimensions of subsets of non-Diophantine points in Appendix A, using results of lattice counting problem. In Appendix B we will use a technique of Venkatesh (Ann.of Math. 2010) and an exponential mixing property to prove a weak version of a result of Str\"ombergsson (J Mod Dynam, 2013), which is about the effective equidistribution of horospherical orbits.