Pontryagin duality for Abelian s- and sb-groups

Abstract

The main goal of the article is to study the Pontryagin duality for Abelian s- and sb-groups. Let G be an infinite Abelian group and X be the dual group of the discrete group Gd. We show that a dense subgroup H of X is g-closed iff H algebraically is the dual group of G endowed with some maximally almost periodic s-topology. Every reflexive Polish Abelian group is g-closed in its Bohr compactification. If a s-topology τ on a countably infinite Abelian group G is generated by a countable set of convergent sequences, then the dual group of (G,τ) is Polish. A non-trivial Hausdorff Abelian topological group is a s-group iff it is a quotient group of the s-sum of a family of copies of (ZN0, e).