Stabilizing and destabilizing Heegaard splittings of sufficiently complicated 3-manifolds

Abstract

Let M1 and M2 be compact, orientable 3-manifolds with incompressible boundary, and M the manifold obtained by gluing with a homeomorphism φ: M1 M2. We analyze the relationship between the sets of low genus Heegaard splittings of M1, M2, and M, assuming the map φ is "sufficiently complicated." This analysis yields counter-examples to the Stabilization Conjecture, a resolution of the higher genus analogue of a conjecture of Gordon, and a result about the uniqueness of expressions of Heegaard splittings as amalgamations.