On injective endomorphisms of the semigroup BZF2 with the two-element family F2 of inductive nonempty subsets of ω
Abstract
We describe injective endomorphisms of the semigroup BZF2 with the two-element family F2 of inductive nonempty subsets of ω. In particular we show that every injective endomorphism e of BZF2 is presented in the form e=e0a, where e0 is an injective (0,0,[0))-endomorphism of BZF2 and a is an automorphism a of BZF2. Also we describe all injective (0,0,[0))-endomorphisms e0 of BZF2, i.e., such that (0,0,[0))e0=(0,0,[0)).
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