On 2-systoles of hyperbolic 3-manifolds

Abstract

We investigate the geometry of π1-injective surfaces in closed hyperbolic 3-manifolds. First we prove that for any e>0, if the manifold M has sufficiently large systole 1(M), the genus of any such surface in M is bounded below by ((1/2-e)1(M)). Using this result we show, in particular, that for congruence covers Mi M of a compact arithmetic hyperbolic 3-manifold we have: (a) the minimal genus of π1-injective surfaces satisfies (Mi) (1/3)(Mi); (b) there exist such sequences with the ratio Heegard genus(Mi)/(Mi) (Mi)1/2; and (c) under some additional assumptions π1(Mi) is k-free with k (1/3)1(Mi). The latter resolves a special case of a conjecture of M. Gromov.