A remark on fullness of some group measure space von Neumann algebras

Abstract

Recently C. Houdayer and Y. Isono have proved among other things that every biexact group has the property that for any non-singular strongly ergodic action (X,μ) on a standard measure space the group measure space von Neumann algebra L∞(X) is full. In this note, we prove the same property for a wider class of groups, notably including SL(3, Z). We also prove that for any connected simple Lie group G with finite center, any lattice G, and any closed non-amenable subgroup H G, the non-singular action G/H is strongly ergodic and the von Neumann factor L∞(G/H) is full.