Cocycle Superrigidity for Profinite Actions of Property (T) Groups

Abstract

Consider a free ergodic measure preserving profinite action X (i.e. an inverse limit of actions Xn, with Xn finite) of a countable property (T) group (more generally of a group which admits an infinite normal subgroup 0 such that the inclusion 0⊂ has relative property (T) and /0 is finitely generated) on a standard probability space X. We prove that if w:× X is a measurable cocycle with values in a countable group , then w is cohomologous to a cocycle w' which factors through the map × X × Xn, for some n. As a corollary, we show that any orbit equivalence of X with any free ergodic measure preserving action Y comes from a (virtual) conjugacy of actions.