On (n-2)-connected 2n-dimensional Poincar\'e complexes with torsion-free homology

Abstract

Let X be an (n-2)-connected 2n-dimensional Poincar\'e complex with torsion-free homology, where n≥ 4. We prove that X can be decomposed into a connected sum of two Poincar\'e complexes: one being (n-1)-connected, while the other having trivial nth homology group. Under the additional assumption that Hn(X)=0 and Sq2:Hn-1(X;Z2) Hn+1(X;Z2) is trivial, we can prove that X can be further decomposed into connected sums of Poincar\'e complexes whose (n-1)th homology is isomorphic to Z. As an application of this result, we classify the homotopy types of such 2-connected 8-dimensional Poincar\'e complexes.