1-free abelian non-Archimedean Polish groups
Abstract
An uncountable 1-free group cannot admit a Polish group topology but an uncountable 1-free abelian group can, as witnessed, for example, by the Baer-Specker group Zω; more strongly, Zω is separable. In this paper we investigate 1-free abelian non-Archimedean Polish groups. We prove two main results. The first is that there are continuum many separable (and so torsionless, and so 1-free) abelian non-Archimedean Polish groups which are pairwise not topologically isomorphic. The second is that the following four properties are complete co-analytic subsets of the space of closed abelian subgroups of S∞: separability, torsionlessness, 1-freeness and Z-homogeneity.
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