Injectively and absolutely T1S-closed semigroups

Abstract

A semigroup X is absolutely (resp. injectively) T1S-closed if for any (injective) homomorphism h:X Y to a T1 topological semigroup Y∈ C, the image h[X] is closed in Y. We prove that a commutative semigroup X is injectively T1S-closed if and only if X is bounded, nonsingular and Clifford-finite. Using this characterization, we prove that (1) every injectively T1S-closed semigroup has injectively T1S-closed center, and (2) every absolutely T1S-closed semigroup has finite center.

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