English

On a semitopological polycyclic monoid

Group Theory 2016-07-15 v1 General Topology

Abstract

We study algebraic structure of the λ\lambda-polycyclic monoid PλP_{\lambda} and its topologizations. We show that the λ\lambda-polycyclic monoid for an infinite cardinal λ2\lambda\geqslant 2 has similar algebraic properties so has the polycyclic monoid PnP_n with finitely many n2n\geqslant 2 generators. In particular we prove that for every infinite cardinal λ\lambda the polycyclic monoid PλP_{\lambda} is a congruence-free combinatorial 00-bisimple 00-EE-unitary inverse semigroup. Also we show that every non-zero element xx is an isolated point in (Pλ,τ)(P_{\lambda},\tau) for every Hausdorff topology τ\tau on PλP_{\lambda}, such that (Pλ,τ)(P_{\lambda},\tau) is a semitopological semigroup, and every locally compact Hausdorff semigroup topology on PλP_\lambda is discrete. The last statement extends results of the paper [33] obtaining for topological inverse graph semigroups. We describe all feebly compact topologies τ\tau on PλP_{\lambda} such that (Pλ,τ)\left(P_{\lambda},\tau\right) is a semitopological semigroup and its Bohr compactification as a topological semigroup. We prove that for every cardinal λ2\lambda\geqslant 2 any continuous homomorphism from a topological semigroup PλP_\lambda into an arbitrary countably compact topological semigroup is annihilating and there exists no a Hausdorff feebly compact topological semigroup which contains PλP_{\lambda} as a dense subsemigroup.

Keywords

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}
}
R2 v1 2026-06-22T12:23:57.876Z