Homogeneous ANR-spaces and Alexandroff manifolds

Abstract

We specify a result of Yokoi yo by proving that if G is an abelian group and X is a homogeneous metric ANR compactum with GX=n and Hn(X;G)≠ 0, then X is an (n,G)-bubble. This implies that any such space X has the following properties: Hn-1(A;G)≠ 0 for every closed separator A of X, and X is an Alexandroff manifold with respect to the class Dn-2G of all spaces of dimension G≤ n-2. We also prove that if X is a homogeneous metric continuum with Hn(X;G)≠ 0, then Hn-1(C;G)≠ 0 for any partition C of X such that GC≤ n-1. The last provides a partial answer to a question of Kallipoliti and Papasoglu kp.