Completely Positive Maps on Coxeter Groups, Deformed Commutation Relations, and Operator Spaces

Abstract

In this article we prove that quasi-multiplicative (with respect to the usual length function) mappings on the permutation group (or, more generally, on arbitrary amenable Coxeter groups), determined by self-adjoint contractions fulfilling the braid or Yang-Baxter relations, are completely positive. We point out the connection of this result with the construction of a Fock representation of the deformed commutation relations didj*-Σr,s tjsir dr*ds=δij, where the matrix tjsir is given by a self-adjoint contraction fulfilling the braid relation. Such deformed commutation relations give examples for operator spaces as considered by Effros, Ruan and Pisier. The corresponding von Neumann algebras, generated by Gi=di+di*, are typically not injective.

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