From isolated subgroups to generic permutation representations

Abstract

Let G be a countable group, Sub(G) the (compact, metric) space of all subgroups of G with the Chabauty topology and Is(G) ⊂ Sub(G) the collection of isolated points. We denote by X! the (Polish) group of all permutations of a countable set X. Then the following properties are equivalent: (i) Is(G) is dense in Sub(G), (ii) G admits a "generic permutation representation". Namely there exists some τ* ∈ Hom(G,X!) such that the collection of permutation representations \φ ∈ Hom(G,X!) \ | \ φ is permutation isomorphic to τ*\ is co-meager in Hom(G,X!). We call groups satisfying these properties solitary. Examples of solitary groups include finitely generated LERF groups and groups with countably many subgroups.