Free wreath product quantum groups : the monoidal category, approximation properties and free probability

Abstract

In this paper, we find the fusion rules for the free wreath product quantum groups G*SN+ for all compact matrix quantum groups of Kac type G and N4. This is based on a combinatorial description of the intertwiner spaces between certain generating representations of G*SN+. The combinatorial properties of the intertwiner spaces in G*SN+ then allows us to obtain several probabilistic applications. We then prove the monoidal equivalence between G*SN+ and a compact quantum group whose dual is a discrete quantum subgroup of the free product G*SUq(2), for some 0<q1. We obtain as a corollary certain stability results for the operator algebras associated with the free wreath products of quantum groups such as Haagerup property, weak amenability and exactness.