Hyperbolic volume and Heegaard distance

Abstract

We prove (Theorem~1.5) that there exists a constant > 0 so that if M is a (μ,d)-generic complete hyperbolic 3-manifold of volume [M] < ∞ and ⊂ M is a Heegaard surface of genus g() > [M], then d() ≤ 2, where d() denotes the distance of as defined by Hempel. The key for the proof of the main result is Theorem~1.8 which is on independent interest. There we prove that if M is a compact 3-manifold that can be triangulated using at most t tetrahedra (possibly with missing or truncated vertices), and is a Heegaard surface for M with g() ≥ 76t+26, then d() ≤ 2.