Braided tensor product of von Neumann algebras
Abstract
We introduce a definition of braided tensor product MN of von Neumann algebras equipped with an action of a quasi-triangular quantum group G (this includes the case when G is a Drinfeld double). It is a new von Neumann algebra which comes together with embeddings of M,N and the unique action of G for which embeddings are equivariant. More generally, we construct braided tensor product of von Neumann algebras equipped with actions of locally compact quantum groups linked by a bicharacter. We study several examples, in particular we show that crossed products can be realised as braided tensor products. We also show that one can take the braided tensor product 12 of normal, completely bounded maps which are equivariant, but this fails without the equivariance condition.
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