Noncommutative Poisson boundaries and Furstenberg-Hamana boundaries of Drinfeld doubles

Abstract

We clarify the relation between noncommutative Poisson boundaries and Furstenberg-Hamana boundaries of quantum groups. Specifically, given a compact quantum group G, we show that in many cases where the Poisson boundary of the dual discrete quantum group G has been computed, the underlying topological boundary either coincides with the Furstenberg-Hamana boundary of the Drinfeld double D(G) of G or is a quotient of it. This includes the q-deformations of compact Lie groups, free orthogonal and free unitary quantum groups, quantum automorphism groups of finite dimensional C*-algebras. In particular, the boundary of D(Gq) for the q-deformation of a compact connected semisimple Lie group G is Gq/T (for q1), in agreement with the classical results of Furstenberg and Moore on the Furstenberg boundary of G C. We show also that the construction of the Furstenberg-Hamana boundary of D(G) respects monoidal equivalence and, in fact, can be carried out entirely at the level of the representation category of G. This leads to a notion of the Furstenberg-Hamana boundary of a rigid C*-tensor category.