Injectively closed commutative semigroups
Abstract
Let C be a class of topological semigroups. A semigroup X is injectively C-closed if X is closed in each topological semigroup Y∈ C containing X as a subsemigroup. Let T\!2S (resp. T\!zS) be the class of Hausdorff (and zero-dimensional) topological semigroups. We prove that a commutative semigroup X is injectively T\!2S-closed if and only if X is injectively T\!zS-closed if and only if X is bounded, chain-finite, group-finite, nonsingular and not Clifford-singular.
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