Heegaard structure respects complicated JSJ decompositions

Abstract

Let M be a 3-manifold with torus boundary components T1 and T2. Let φ T1 T2 be a homeomorphism, Mφ the manifold obtained from M by gluing T1 to T2 via the map φ, and T the image of T1 in Mφ. We show that if φ is "sufficiently complicated" then any incompressible or strongly irreducible surface in Mφ can be isotoped to be disjoint from T. It follows that every Heegaard splitting of a 3-manifold admitting a "sufficiently complicated" JSJ decomposition is an amalgamation of Heegaard splittings of the components of the JSJ decomposition.