A De Vries-type Duality Theorem for Locally Compact Spaces -- III

Abstract

In this paper we prove some new Stone-type duality theorems for some subcategories of the category of locally compact zero-dimensional Hausdorff spaces and continuous maps. These theorems are new even in the compact case. They concern the cofull subcategories , , and of the category determined, respectively, by the skeletal maps, by the quasi-open perfect maps, by the open maps and by the open perfect maps. In this way, the zero-dimensional analogues of Fedorchuk Duality Theorem and its generalization are obtained. Further, we characterize the injective and surjective morphisms of the category of locally compact Hausdorff spaces and continuous maps, as well as of the category , and of some their subcategories, by means of some properties of their dual morphisms. This generalizes some well-known results of M. Stone and de Vries. An analogous problem is investigated for the homeomorphic embeddings, dense embeddings, LCA-embeddings etc., and a generalization of a theorem of Fedorchuk is obtained. Finally, in analogue to some well-known results of M. Stone, the dual objects of the open, regular open, clopen, closed, regular closed etc. subsets of a space X∈ or X∈ are described by means of the dual objects of X; some of these results (e.g., for regular closed sets) are new even in the compact case.