On injective endomorphisms of the semigroup BωF3 with a three-element family F3 of inductive non-empty subsets of ω
Abstract
We describe injective endomorphisms of the semigroup BωF3 with a three-element family F3 of inductive non-empty subsets of ω. In particular we find endomorphisms 3 and λ of BωF3 such that for every injective endomorphism of the semigroup BωF3 there exists an injective endomorphism ∈λ,3 such that =α[k] for some positive integer k, where α[k] is an injective monoid endomorphism of BωF3.
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