Counting surface subgroups in cusped hyperbolic 3-manifolds

Abstract

Let M =H3/ be a finite-volume, noncompact hyperbolic 3-manifold. We show that the number of quasi-Fuchsian surface subgroups of (up to conjugacy and commensurability) of genus at most g is bounded both above and below by functions of the form (cg)2g. As a corollary, for all h≥ 4, the number of purely pseudo-Anosov closed surface subgroups of genus at most g of the mapping class group Mod(Sh,0) is bounded below by (Cg)2g for a universal constant C. In contrast, for some g ≥ 2, we construct infinitely many conjugacy classes of genus-g surface subgroups of with accidental parabolics.