Rigidity for equivalence relations on homogeneous spaces
arXiv:1010.3778
Abstract
We study Popa's notion of rigidity for equivalence relations induced by actions on homogeneous spaces. For any lattices $Î,Î$ in a semisimple Lie group $G$ with finite center and no compact factors we prove that the action $Î\curvearrowright G/Î$ is rigid. If in addition $G$ has property (T) then we derive that the von Neumann algebra $L^{\infty}(G/Î)\rtimesÎ$ has property (T). We also show that if the adjoint action of $G$ on the Lie algebra of $G$ - $\{0\}$ is amenable (e.g. if $G=SL_2(\Bbb R)$), then any ergodic subequivalence relation of the orbit equivalence relation of the action $Î\curvearrowright G/Î$ is either hyperfinite or rigid.