Non-uniqueness of high distance Heegaard splittings

Abstract

Kevin Hartshorn showed that if a three-dimensional manifold M admits a Heegaard surface with Hempel distance d then every incompressible surface in M has genus at least d2. Scharlemann-Tomova generalized this, proving that in such a manifold, every other Heegaard surface for M of genus g' < d2 is a stabilization of . In the present paper, we show that Hartshorn's bound is sharp and Scharlemann-Tomova's bound is very close to sharp. In particular, for every pair of integers g ≥ 2, d ≥ 2, we construct a three-manifold M with a genus g, distance d Heegaard splitting and an incompressible surface of genus d2. We also construct, for every d ≥ 4, a three-manifold with a genus g, distance d Heegaard surface and a second Heegaard surface with genus g' = 12 d + g - 1 that is not a stabilization of .