Finitely approximable groups and actions Part II: Generic representations

Abstract

Given a finitely generated group , we study the space Isom(, Q U) of all actions of by isometries of the rational Urysohn metric space Q U, where Isom(, Q U) is equipped with the topology it inherits seen as a closed subset of Isom( Q U). When is the free group n on n generators this space is just Isom( Q U)n, but is in general significantly more complicated. We prove that when is finitely generated Abelian there is a generic point in Isom(, Q U), i.e., there is a comeagre set of mutually conjugate isometric actions of on Q U.