Heegaard surfaces and the distance of amalgamation

Abstract

Let M1 and M2 be orientable irreducible 3--manifolds with connected boundary and suppose ∂ M1∂ M2. Let M be a closed 3--manifold obtained by gluing M1 to M2 along the boundary. We show that if the gluing homeomorphism is sufficiently complicated, then M is not homeomorphic to S3 and all small-genus Heegaard splittings of M are standard in a certain sense. In particular, g(M)=g(M1)+g(M2)-g(∂ Mi), where g(M) denotes the Heegaard genus of M. This theorem is also true for certain manifolds with multiple boundary components.