On the semigroup of endomorphisms of the semigroup $\boldsymbol{B}_{\omega}^{\mathscr{F}^2}$ with the two-element family $\mathscr{F}^2$ of inductive nonempty subsets of $\omega$

Marko Serivka

doi:10.24144/2616-7700.2025.47(2).43-51

On the semigroup of endomorphisms of the semigroup BωF2 with the two-element family F2 of inductive nonempty subsets of ω

Abstract

We study the semigroup End(BωF2) of all endomorphisms of the bicyclic extension BωF2 with the two-element family F2 of inductive nonempty subsets of ω. The submonoid 1 of End(BωF2) with the property that every element of the semigroup End(BωF2) has the unique representation as the product of the monoid endomorphism of BωF2 and the element of 1 is constructed.

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