On links between horocyclic and geodesic orbits on geometrically infinite surfaces

Abstract

We study the topological dynamics of the horocycle flow hR on a geometrically infinite hyperbolic surface S. Let u be a non-periodic vector for hR in T1 S. Suppose that the half-geodesic u(R+) is almost minimizing and that the injectivity radius along u(R+) has a finite inferior limit Inj(u(R+)). We prove that the closure of hR u meets the geodesic orbit along un unbounded sequence of points gtn u. Moreover, if Inj(u(R+)) = 0, the whole half-orbit gR+ u is contained in hR u. When Inj(u(R+)) > 0, it is known that in general gR+ u ⊂ hR u. Yet, we give a construction where Inj(u(R+)) > 0 and gR+ u ⊂ hR u, which also constitutes a counterexample to Proposition 3 of [Led97].