Solid ergodicity and orbit equivalence rigidity for coinduced actions

Abstract

We prove that the solid ergodicity property is stable with respect to taking coinduction for a fairly large class of coinduced action. More precisely, assume that < are countable groups such that g g-1 is finite for any g∈. Then any measure preserving action X0 gives rise to a solidly ergodic equivalence relation if and only if the equivalence relation of the associated coinduced action X is solidly ergodic. We also obtain orbit equivalence rigidity for such actions by showing that the orbit equivalence relation of a rigid or compact measure preserving action X0 of a property (T) group is "remembered" by the orbit equivalence relation of X.