On the semigroup BωF which is generated by the family F of atomic subsets of ω

Abstract

We study the semigroup BωF, which is introduced in [O. Gutik and M. Mykhalenych, On some generalization of the bicyclic monoid, Visnyk Lviv. Univ. Ser. Mech.-Mat. 90 (2020), 5--19], in the case when the family F of subsets of cardinality ≤slant 1 in ω. We show that BωF is isomorphic to the subsemigroup Bω(F) of the Brandt ω-extension of the semilattice F and describe all shift-continuous feebly compact T1-topologies on the semigroup Bω(F). In particulary we prove that every shift-continuous feebly compact T1-topology τ on Bω(F) is compact and moreover in this case the space (Bω(F),τ) is homeomorphic to the one-point Alexandroff compactification of the discrete countable space D(ω). We study the closure of BωF in a semitopological semigroup. In particularly we show that BωF is algebraically complete in the class of Hausdorff semitopological inverse semigroups with continuous inversion, and a Hausdorff topological inverse semigroup BωF is closed in any Hausdorff topological semigroup if and only if the band E(BωF) is compact.