Invariant random subgroups of groups acting on hyperbolic spaces

Abstract

Suppose that a group G acts non-elementarily on a hyperbolic space S and does not fix any point of ∂ S. A subgroup H G is said to be geometrically dense in G if the limit sets of H and G coincide and H does not fix any point of ∂ S. We prove that every invariant random subgroup of G is either geometrically dense or contained in the elliptic radical (i.e., the maximal normal elliptic subgroup of G). In particular, every ergodic measure preserving action of an acylindrically hyperbolic group on a Borel probability space (X,μ) either has finite stabilizers μ-almost surely or otherwise the stabilizers are very large (in particular, acylindrically hyperbolic) μ-almost surely.