Homotopy classification of 4-manifolds with 3-manifold fundamental group

Abstract

We give a criterion on a group π and a homomorphism w π C2 under which closed 4-manifolds with fundamental group π and orientation character w are classified up to homotopy equivalence by their quadratic 2-types. We verify the criterion for a large class of 3-manifold groups and orientation characters, in particular for the fundamental group π of any closed, orientable 3-manifold whose finite subgroups are cyclic, provided w vanishes on every element of π of finite order. We deduce a homeomorphism classification of closed, orientable 4-manifolds with infinite dihedral fundamental group Z/2 * Z/2.