On the semigroup of injective endomorphisms of the semigroup BωFn which is generated by the family Fn of initial finite intervals of ω

Abstract

In the paper we describe injective endomorphisms of the inverse 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 is generated by the set \0,1,…,n\. In particular we show that the semigroup of injective endomorphisms of the semigroup BωF is isomorphic to (ω,+). Also we describe the structure of the semigroup End(Bλ) of all endomorphisms of the semigroup of λ×λ-matrix units Bλ.