English

On semitopological $\alpha$-bicyclic monoid

General Topology 2020-08-09 v3

Abstract

In this paper we consider a semitopological α\alpha-bicyclic monoid Bα\mathcal{B}_{\alpha} and prove that it is algebraically isomorphic to a semigroup of all order isomorphisms between the principal upper sets of the ordinal ωα\omega^\alpha. We prove that for every ordinal α\alpha for every (a,b)Bα(a,b)\in \mathcal{B_\alpha} if either aa or bb is a non-limit ordinal then (a,b)(a,b) is an isolated point in Bα\mathcal{B}_\alpha. We show that for every ordinal α<ω+1\alpha<\omega+1 every locally compact semigroup topology on Bα\mathcal{B}_{\alpha} is discrete. However, we construct an example of a non-discrete locally compact topology τlc\tau_{lc} on Bω+1\mathcal{B}_{\omega+1} such that (Bω+1,τlc)(\mathcal{B}_{\omega+1},\tau_{lc}) is a topological inverse semigroup. This example shows that there is a gap in \cite[Theorem~2.9]{Hogan-1984}, where is stated that for every ordinal α\alpha there is only discrete locally compact inverse semigroup topology on Bα\mathcal{B_\alpha}.

Keywords

Cite

@article{arxiv.1605.09345,
  title  = {On semitopological $\alpha$-bicyclic monoid},
  author = {Serhii Bardyla},
  journal= {arXiv preprint arXiv:1605.09345},
  year   = {2020}
}
R2 v1 2026-06-22T14:13:07.753Z