Spheroidal groups, virtual cohomology and lower dimensional G-spaces

Abstract

A space is defined to be "n-spheroidal" if it has the homotopy type of an n-dimensional CW-complex X with Hn(X, Z) not zero and finitely generated. A group G is called "n-spheroidal" if its classifying space K(G,1) is n-spheroidal. Examples include fundamental groups of compact manifold K(G,1)'s. Moreover, the class of groups G which are n-spheroidal for some n, is closed under products, free products, and group extensions. If Y is a space with π1(Y) n-spheroidal, and if Hk(Y;Fp) is non-zero and finitely generated, and if Hi(Y;Fp) = 0 for i>k, then Hn+k(Y;Fp) ≠ 0 for Y a finite sheeted covering space of Y. Hence, dim(Y) ≥ n+k. Thus, it follows that if dim(Y) < n, and if Hk(Y;Fp) ≠ 0 and Hi(Y;Fp) = 0 for i>k>0, then Hk(Y;Fp) is not finitely generated. Similar results follow for Y⊂ K(G,1).