The Commutation Theorem for Tensor 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

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

MV-algebras are the models of the time-honored equational theory of magnitudes with unit. Introduced by Chang as a counterpart of the infinite-valued sentential calculus of Łukasiewicz, they are currently investigated for their relations with AF C\*-algebras, toric desingularizations, and lattice-or