The dual space of precompact groups
Abstract
For any topological group G the dual object G is defined as the set of equivalence classes of irreducible unitary representations of G equipped with the Fell topology. If G is compact, G is discrete. In an earlier paper we proved that G is discrete for every metrizable precompact group, i.e. a dense subgroup of a compact metrizable group. We generalize this result to the case when G is an almost metrizable precompact group.
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