Invariant random compacts

Abstract

For a compact metric space X with a group G acting on it continuously, an invariant random compact is a Borel probability measure on the space of nonempty compact subsets of X that is invariant under the action of G. The action is IC-rigid if, with respect to every invariant random compact, every compact set is almost surely either finite or X. We give sufficient conditions for an action to be IC-rigid, and show there are natural examples of such actions. We further consider a notion of weak IC-rigidity, and prove that the Chacon system is weakly IC-rigid but not IC-rigid. As an application, we prove results concerning multiplicative largeness of dilations of sets on the circle.