Tensor products of topological abelian groups and Pontryagin duality

Abstract

Let G be the group of all -valued homomorphisms of the Baer-Specker group . The group G is algebraically isomorphic to (), the infinite direct sum of the group of integers, and equipped with the topology of pointwise convergence on , becomes a non reflexive prodiscrete group. It was an open question to find its dual group G. Here, we answer this question by proving that G is topologically isomorphic to Q, the (locally quasi-convex) tensor product of and . Furthermore, we investigate the reflexivity properties of the groups of Cp(X,), the group of all -valued continuous functions on X equipped with the pointwise convergence topology, and Ap(X), the free abelian group on a 0-dimensional space X equipped with the topology tp(C(X,)) of pointwise convergence topology on C(X,). In particular, we prove that Ap(X) Cp(X,)Q and we establish the existence of 0-dimensional spaces X such that Cp(X,) is Pontryagin reflexive.