Cocycle superrigidity for profinite actions of irreducible lattices

Abstract

Let be an irreducible lattice in a product of two locally compact groups and assume that is densely embedded in a profinite group K. We give necessary conditions which imply that the left translation action K is "virtually" cocycle superrigid: any cocycle w:× K→ with values in a countable group is cohomologous to a cocycle which factors through the map × K→× K0, for some finite quotient group K0 of K. As a corollary, we deduce that any ergodic profinite action of =SL2( Z[S-1]) is virtually cocycle superrigid and virtually W*-superrigid, for any finite nonempty set of primes S.