Discontinuous actions on cones, joins, and n-universal bundles

Abstract

We prove that locally countably-compact Hausdorff topological groups G act continuously on their iterated joins EnG:=G*(n+1) (the total spaces of the Milnor-model n-universal G-bundles) as well as the colimit-topologized unions EG=n EnG, and the converse holds under the assumption that G is first-countable. In the latter case other mutually equivalent conditions provide characterizations of local countable compactness: the fact that G acts continuously on its first self-join E1G, or on its cone CG, or the coincidence of the product and quotient topologies on G× CX for all spaces X or, equivalently, for the discrete countably-infinite X:=0. These can all be regarded as weakened versions of G's exponentiability, all to the effect that G× - preserves certain colimit shapes in the category of topological spaces; the results thus extend the equivalence (under the separation assumption) between local compactness and exponentiability.

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