Infinite Chevalley products of von Neumann algebras

dedicated to professor marc a. rieffel on the occasion of his sixtieth birthday A general commutation theorem is proved for tensor products of von Neumann algebras over common von Neumann subalgebras. Roughly speaking, if the noncommon parts of two von Neumann algebras M 1 and M 2 on the same Hilber

Let (M, 1 ) be a Hopf von Neumann algebra. The operator predual M \* of M is a completely contractive Banach algebra with multiplication m=1 \* : M \* M \* Ä M \* . We call (M, 1 ) operator amenable if the completely contractive Banach algebra M \* is operator amenable, i.e., for every operator M \*

## Abstract In this paper, we consider a generalization of property T of Kazhdan for groups and property T of Connes for von Neumann algebras. We introduce another relative property T for groups corresponding to co‐rigidity for von Neumann algebras, which is different from relative property T of Ma

We introduce the central Haagerup tensor product \(\mathscr{A} \otimes{ }_{g h}\), for a von Neumann algebra \(\mathscr{A}\). and we show that the natural injection into the space \(C B(\mathscr{A}, \mathscr{A})\) of completely bounded maps on \(h\) is isometric. This is used to study mappings betwe

In this paper we define and study certain von Neumann algebra invariants associated to the Dirac operator acting on L 2 spinors on the universal covering space of a compact, Riemannian spin manifold. We first study a Novikov Shubin type invariant, which is a conformal invariant but which is not inde