Local min-max surfaces and strongly irreducible minimal Heegaard splittings

Abstract

Let (M,g) be a closed oriented Riemannian 3-manifold and suppose that there is a strongly irreducible Heegaard splitting H. We prove that H is either isotopic to a minimal surface of index at most one or isotopic to the stable oriented double cover of a non-orientable minimal surface with a vertical handle attached. In particular, this proves a result conjectured by Rubinstein. Some consequences include the existence in any RP3 of either a minimal torus or a minimal projective plane with stable universal cover. In the case of positive scalar curvature, it is shown for spherical space forms not diffeomorphic to S3 or RP3 that any strongly irreducible Heegaard splitting admits a minimal representative in its isotopy class, and that there is a minimal Heegaard splitting of area less than 4π if R≥ 6.