Expanding curves in T1(Hn) under geodesic flow and equidistribution in homogeneous spaces

Abstract

Let H = SO(n,1) and A =\a(t) : t ∈ R\ be a maximal R-split Cartan subgroup of H. Let G be a Lie group containing H and be a lattice of G. Let x = g ∈ G/ be a point of G/ such that its H-orbit Hx is dense in G/. Let φ: I= [a,b] → H be an analytic curve, then φ(I)x gives an analytic curve in G/. In this article, we will prove the following result: if φ(I) satisfies some explicit geometric condition, then a(t)φ(I)x tends to be equidistributed in G/ as t → ∞. It answers the first question asked by Shah in ~Shah1 and generalizes the main result of that paper.