Weyl groups and rigidity of von Neumann algebras

Abstract

Let G be a noncompact semisimple algebraic group with trivial center, S < G a maximal split torus, H < G the centralizer of S in G and Γ< G an irreducible lattice. Consider the group measure space von Neumann algebra M = L(Γ G/H) associated with the nonsingular action Γ G/H and regard the group von Neumann algebra M = L(Γ) as a von Neumann subalgebra M ⊂ M. We show that the group AutM( M) of all unital normal -automorphisms of M acting identically on M is isomorphic to the Weyl group WG of the semisimple algebraic group G. Our main theorem is a noncommutative analogue of a rigidity result of Bader-Furman-Gorodnik-Weiss for group actions on algebraic homogeneous spaces and moreover gives new insight towards Connes' rigidity conjecture for higher rank lattices.