Regular rigid Korovin orbits

Abstract

An example of an infinite regular feebly compact quasitopological group is presented such that all continuous real-valued functions on the group are constant. The example is based on the use of Korovin orbits in XG, where X is a special regular countably compact space constructed by S.Bardyla and L.Zdomskyy and G is an abstract Abelian group of an appropriate cardinality. Also, we study the interplay between the separation properties of the space X and Korovin orbits in XG. We show in particular that if X contains two nonempty disjoint open subsets, then every Korovin orbit in XG is Hausdorff.

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