Alexandroff Manifolds and Homogeneous Continua

Abstract

We prove the following result announced in Todorov and Valov: Any homogeneous, metric ANR-continuum is a VnG-continuum provided GX=n≥ 1 and Hn(X;G)≠ 0, where G is a principal ideal domain. This implies that any homogeneous n-dimensional metric ANR-continuum with Hn(X;G)≠ 0 is a Vn-continuum in the sense of Alexandroff (1957). We also prove that any finite-dimensional homogeneous metric continuum X, satisfying Hn(X;G)≠ 0 for some group G and n≥ 1, cannot be separated by a compactum K with Hn-1(K;G)=0 and G K≤ n-1. This provides a partial answer to a question of Kallipoliti-Papasoglu (2007) whether any two-dimensional homogeneous Peano continuum cannot be separated by arcs.