On the semigroup BωFn which is generated by the family Fn of finite bounded intervals of ω

Abstract

We study the semigroup BωF, which is introduced in the paper [O. Gutik and M. Mykhalenych, On some generalization of the bicyclic monoid, Visnyk Lviv. Univ. Ser. Mech.-Mat. 90 (2020), 5--19 (in Ukrainian)], in the case when the family Fn generated by the set \0,1,…,n\. We show that the Green relations D and J coincide in BωFn, the semigroup BωFn is isomorphic to the semigroup Iωn+1(conv) of partial convex order isomorphisms of (ω,≤slant) of the rank ≤slant n+1, and BωFn admits only Rees congruences. Also, we study shift-continuous topologies on the semigroup BωFn. In particular we prove that for any shift-continuous T1-topology τ on the semigroup BωFn every non-zero element of BωFn is an isolated point of (BωFn,τ), BωFn admits the unique compact shift-continuous T1-topology, and every ωd-compact shift-continuous T1-topology is compact. We describe the closure of the semigroup BωFn in a Hausdorff semitopological semigroup and prove the criterium when a topological inverse semigroup BωFn is H-closed in the class of Hausdorff topological semigroups.