Almost simple geodesics on the triply punctured sphere

Abstract

Every closed hyperbolic geodesic γ on the triply--punctured sphere M = C - \0,1,∞\ has a self--intersection number I(γ) 1 and a combinatorial length L(γ) 2, the latter defined by the number of times γ passes through the upper halfplane. In this paper we show that δ(γ) = I(γ) - L(γ) -1 for all closed geodesics; and that for each fixed δ, the number of geodesics with invariants (δ,L) is given exactly by a quadratic polynomial pδ(L) for all L 4 + δ.