On the semigroup of monoid endomorphisms of the semigroup BωF with a two-element family F of inductive nonempty subsets of ω

Abstract

We study the semigroup of non-injective monoid endomorphisms of the semigroup BωF with a two-elements family F of inductive nonempty subsets of ω. We describe the structure of elements of the semigroup End*0(BωF) of non-injective monoid endomorphisms of the semigroup BωF. In particular we show that its subsemigroup End*(BωF) of non-injective non-annihilating monoid endomorphisms of the semigroup BωF is isomorphic to the direct product of the two-element left-zero semigroup and the multiplicative semigroup of positive integers and describe Green's relations on End*(BωF).