\'Equivalence mono\"idale de groupes quantiques et K-th\'eorie bivariante

Abstract

In this article, we generalize to the case of regular locally compact quantum groups, two important results concerning actions of compact quantum groups. Let G1 and G2 be two monoidally equivalent regular locally compact quantum groups in the sense of De Commer. We introduce an induction procedure and we build an equivalence of the categories AG1 and AG2 consisting of continuous actions of G1 and G2 on C*-algebras. As an application of this result, we derive a canonical equivalence of the categories KKG1 and KKG2. We introduce and investigate a notion of actions on C*-algebras of measured quantum groupoids on a finite basis. The proof of the equivalence between KKG1 and KKG2 relies on a version of the Takesaki-Takai duality theorem for continuous actions on C*-algebras of measured quantum groupoids on a finite basis.