On a semitopological polycyclic monoid
Abstract
We study algebraic structure of the -polycyclic monoid and its topologizations. We show that the -polycyclic monoid for an infinite cardinal has similar algebraic properties so has the polycyclic monoid with finitely many generators. In particular we prove that for every infinite cardinal the polycyclic monoid is a congruence-free combinatorial -bisimple --unitary inverse semigroup. Also we show that every non-zero element is an isolated point in for every Hausdorff topology on , such that is a semitopological semigroup, and every locally compact Hausdorff semigroup topology on is discrete. The last statement extends results of the paper [33] obtaining for topological inverse graph semigroups. We describe all feebly compact topologies on such that is a semitopological semigroup and its Bohr compactification as a topological semigroup. We prove that for every cardinal any continuous homomorphism from a topological semigroup into an arbitrary countably compact topological semigroup is annihilating and there exists no a Hausdorff feebly compact topological semigroup which contains as a dense subsemigroup.
Cite
@article{arxiv.1601.01151,
title = {On a semitopological polycyclic monoid},
author = {Serhii Bardyla and Oleg Gutik},
journal= {arXiv preprint arXiv:1601.01151},
year = {2016}
}