Topology and convexity in the space of actions modulo weak equivalence

Abstract

We analyse the structure of the quotient A(,X,μ) of the space of measure-preserving actions of a countable discrete group by the relation of weak equivalence. This space carries a natural operation of convex combination. We show that the convex structure of A(,X,μ) is compatible with the topology, and as a consequence deduce that A(,X,μ) is path connected. Using ideas of Tucker-Drob we are able to give a complete description of the topological and convex structure of A(,X,μ) for amenable by identifying it with the simplex of invariant random subgroups. In particular we conclude that A(,X,μ) can be represented as a compact convex subset of a Banach space if and only if is amenable. We consider the space A_s(,X,μ) of stable weak equivalence classes and show that is always a compact convex subset of a Banach space. For a free group FN, we show that if one restricts to the compact convex set FR_s(FN,X,μ) ⊂eq A_s(FN,X,μ) of the stable weak equivalence classes of free actions, the extreme points are dense in FR_s(FN,X,μ).