Separation of homogeneous connected locally compact spaces

Abstract

We prove that any region in a homogeneous n-dimensional and locally compact separable metric space X, where n≥ 2, cannot be irreducibly separated by a closed (n-1)-dimensional subset C with the following property: C is acyclic in dimension n-1 and there is a point b∈ C having a special local base BCb in C such that the boundary of each U∈ BCb is acyclic in dimension n-2. In case X is strongly locally homogeneous, it suffices to have a point b∈ C with an ordinary base BCb satisfying the above condition. The acyclicity means triviality of the corresponding Cech cohomology groups. This implies all known results concerning the separation of regions in homogeneous connected locally compact spaces.