A note on LERF groups and generic group actions

Abstract

Let G be a finitely generated group, Sub(G) the (compact, metric) space of all subgroups of G with the Chaubuty topology and X! the (Polish) group of all permutations of a countable set X. We show that the following properties are equivalent: (i) Every finitely generated subgroup is closed in the profinite topology, (ii) the finite index subgroups are dense in Sub(G), (iii) A Baire generic homomorphism φ: G → X! admits only finite orbits. Property (i) is known as the LERF property. We introduce a new family of groups which we call A-separable groups. These are defined by replacing, in (ii) above, the word "finite index" by the word "co-amenalbe". The class of A-separable groups contains all LERF groups, all amenable groups and more. We investigate some properties of these groups.