Uniqueness of the group measure space decomposition for Popa's H T factors

Abstract

We prove that every group measure space II1 factor L∞(X) coming from a free ergodic rigid (in the sense of [Po01]) probability measure preserving action of a group with positive first 2--Betti number, has a unique group measure space Cartan subalgebra, up to unitary conjugacy. We deduce that many H T factors, including the II1 factors associated with the actions T2 and SL2( R)/SL2( Z), where is a non--amenable subgroup of SL2( Z), have a unique group measure space Cartan subalgebra.