Topological 4-manifolds with 4-dimensional fundamental group

Abstract

Let π be a group satisfying the Farrell-Jones conjecture and assume that Bπ is a 4-dimensional Poincar\'e duality space. We consider topological, closed, connected manifolds with fundamental group π whose canonical map to Bπ has degree 1 and show that two such manifolds are s-cobordant if and only if their equivariant intersection forms are isometric and they have the same Kirby-Siebenmann invariant. If π is good in the sense of Freedman, it follows that two such manifolds are homeomorphic if and only if they are homotopy equivalent and have the same Kirby--Siebenmann invariant. This shows rigidity in many cases that lie between aspherical 4-manifolds, where rigidity is expected by Borel's conjecture, and simply connected manifolds where rigidity is a consequence of Freedman's classification results.