Limits of manifolds in the Gromov-Hausdorff metric space

Abstract

We apply the Gromov-Hausdorff metric dG for characterization of certain generalized manifolds. Previously, we have proved that with respect to the metric dG, generalized n-manifolds are limits of spaces which are obtained by gluing two topological n-manifolds by a controlled homotopy equivalence (the so-called 2-patch spaces). In the present paper, we consider the so-called manifold-like generalized n-manifolds Xn, introduced in 1966 by Mardesi\'c and Segal, which are characterized by the existence of δ-mappings fδ of Xn onto closed manifolds Mnδ, for arbitrary small δ>0, i.e. there exist onto maps fδ Xn Mnδ such that for every u∈ Mnδ, f-1δ(u) has diameter less than δ. We prove that with respect to the metric dG, manifold-like generalized n-manifolds Xn are limits of topological n-manifolds Mni. Moreover, if topological n-manifolds Mni satisfy a certain local contractibility condition M(, n), we prove that generalized n-manifold Xn is resolvable.