On feebly compact paratopological groups
Abstract
We obtain many results and solve some problems about feebly compact paratopological groups. We obtain necessary and sufficient conditions for such a group to be topological. One of them is the quasiregularity. We prove that each -pseudocompact paratopological group is feebly compact and that each Hausdorff -compact feebly compact paratopological group is a compact topological group. Our particular attention concerns periodic and topologically periodic groups. We construct examples of various compact-like paratopological groups which are not topological groups, among them a sequentially compact group, a -pseudocompact group, a functionally Hausdorff countably compact group (under the axiomatic assumption that there is an infinite torsion-free abelian countably compact topological group without non-trivial convergent sequences), and a functionally Hausdorff second countable group sequentially pracompact group. We investigate cone topologies of paratopological groups which provide a general tool to construct pathological examples, especially examples of compact-like paratopological groups with discontinuous inversion. We find a simple interplay between the algebraic properties of a basic cone subsemigroup of a group and compact-like properties of two basic semigroup topologies generated by on the group . We prove that the product of a family of feebly compact paratopological groups is feebly compact, and that a paratopological group is feebly compact provided it has a feebly compact normal subgroup such that a quotient group is feebly compact.
Cite
@article{arxiv.1003.5343,
title = {On feebly compact paratopological groups},
author = {Taras Banakh and Alex Ravsky},
journal= {arXiv preprint arXiv:1003.5343},
year = {2020}
}