Minimal Euler Characteristics for Even-Dimensional Manifolds with Finite Fundamental Group

Abstract

We consider the Euler characteristics (M) of closed orientable topological 2n-manifolds with (n-1)-connected universal cover and a given fundamental group G of type Fn. We define q2n(G), a generalized version of the Hausmann-Weinberger invariant for 4-manifolds, as the minimal value of (-1)n (M). For all n≥ 2, we establish a strengthened and extended version of their estimates, in terms of explicit cohomological invariants of G. As an application we obtain new restrictions for non-abelian finite groups arising as fundamental groups of rational homology 4-spheres.