Precompact groups and property (T)
Abstract
For any topological group the dual object is defined as the set of equivalence classes of irreducible unitary representations of equipped with the Fell topology. If is compact, is discrete, and we investigate to what extent this remains true for precompact groups, i.e. for dense subgroups of compact groups. We find that: (a) if is a metrizable precompact group, then is discrete; (b) if is a countable non-metrizable precompact group, then is not discrete; (c) every non-metrizable compact group contains a dense subgroup for which is not discrete. This generalizes to the non-Abelian case what was known for Abelian groups. Kazhdan's property (T) can be defined in similar terms, but we must consider representations without non-zero invariant vectors rather than irreducible representations. If is any countable Abelian precompact group, then does not have property (T), although is discrete if is metrizable.
Cite
@article{arxiv.1112.1350,
title = {Precompact groups and property (T)},
author = {M. Ferrer and S. Hernández and V. Uspenskij},
journal= {arXiv preprint arXiv:1112.1350},
year = {2021}
}
Comments
19 pages