On the homotopy of closed manifolds and finite CW-complexes

Abstract

We study the finite generation of homotopy groups of closed manifolds and finite CW-complexes by relating it to the cohomology of their fundamental groups. Our main theorems are as follows: when X is a finite CW-complex of dimension n and π1(X) is virtually a Poincar\'e duality group of dimension ≥ n-1, then πi(X) is not finitely generated for some i unless X is homotopy equivalent to the Eilenberg--MacLane space K(π1(X),1); when M is an n-dimensional closed manifold and π1(M) is virtually a Poincar\'e duality group of dimension n-1, then for some i≤ [n/2], πi(M) is not finitely generated, unless M itself is an aspherical manifold. These generalize theorems of M. Damian from polycyclic groups to any virtually Poincar\'e duality groups. When π1(X) is not a virtually Poincar\'e duality group, we also obtained similar results. As a by-product we showed that if a group G is of type F and Hi(G,Z G) is finitely generated for any i, then G is a Poincar\'e duality group. This recovers partially a theorem of Farrell.