Comfort's question on powers in $\mathbb Q ^{(2^\mathfrak c)}$ and a Wallace semigroup whose cube is countably compact

A. H. Tomita

Comfort's question on powers in Q (2 c) and a Wallace semigroup whose cube is countably compact

Abstract

We prove that the existence of c incomparable selective ultrafilters implies the existence of a Wallace semigroup whose cube is countably compact. In addition, assuming the existence of 2 c incomparable selective ultrafilters and 2< 2c = 2c, we obtain torsion-free topological groups with respect to Comfort's question on the countable compactness of (infinite) powers of a topological group.

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