Minimally almost periodic group topology on infinite countable Abelian groups: A solution to Comfort's question

Abstract

For any countable subgroup H of an unbounded Abelian group G there is a complete Hausdorff group topology τ such that H is the von Neumann radical of (G,τ). In particular, we obtain the positive answer to Comfort's question: any unbounded countable Abelian group admits a complete Hausdorff minimally almost periodic (MinAP) group topology. A bounded infinite Abelian group admits a MinAP group topology if and only if all its leading Ulm-Kaplansky invariants are infinite. If, in addition, G is countably infinite, a MinAP group topology can be chosen to be complete.