Polyboundedness of zero-closed semigroups
Abstract
The polyboundedness number cov( AX) of a semigroup X is the smallest cardinality of a cover of X by sets of the form \x∈ X:a0xa1·s xan=b\ for some n 1, b∈ X and a0,…,an∈ X1=X\1\. Semigroups with finite polyboundedness number are called polybounded. A semigroup X is called zero-closed if X is closed in its 0-extension X0=\0\ X endowed with any Hausdorff semigroup topology. We prove that any zero-closed infinite semigroup X has cov( AX)<|X|. Under Martin's Axiom, a zero-closed semigroup is polybounded if X admits a compact Hausdorff semigroup topology or X has a separable complete subinvariant metric.
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