On the existence of topologies compatible with a group duality with predetermined properties
Abstract
The paper deals with group dualities. A group duality is simply a pair (G, H) where G is an abstract abelian group and H a subgroup of characters defined on G. A group topology τ defined on G is compatible with the group duality (also called dual pair) (G, H) if G equipped with τ has dual group H. A topological group (G, τ) gives rise to the natural duality (G, G), where G stands for the group of continuous characters on G. We prove that the existence of a g-barrelled topology on G compatible with the dual pair (G, G) is equivalent to the semireflexivity in Pontryagin's sense of the group G endowed with the pointwise convergence topology σ(G, G). We also deal with k-group topologies. We prove that the existence of k-group topologies on G compatible with the duality (G, G) is determined by a sort of completeness property of its Bohr topology σ (G, G) (Theorem 3.3).
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