Mathematics – Operator Algebras
Scientific paper
2002-09-20
Mathematics
Operator Algebras
LaTeX2e, 40 pages; minor corrections
Scientific paper
We consider the Markov operator P_phi on a discrete quantum group given by convolution with a q-tracial state phi. In the study of harmonic elements x, P_phi(x)=x, we define the Martin boundary A_phi. It is a separable C*-algebra carrying canonical actions of the quantum group and its dual. We establish a representation theorem to the effect that positive harmonic elements correspond to positive linear functionals on A_phi. The C*-algebra A_phi has a natural time evolution, and the unit can always be represented by a KMS state. Any such state gives rise to a u.c.p. map from the von Neumann closure of A_phi in its GNS representation to the von Neumann algebra of bounded harmonic elements, which is an analogue of the Poisson integral. Under additional assumptions this map is an isomorphism which respects the actions of the quantum group and its dual. Next we apply these results to identify the Martin boundary of the dual of SU_q(2) with the quantum homogeneous sphere of Podles. This result extends and unifies previous results by Ph. Biane and M. Izumi.
Neshveyev Sergey
Tuset Lars
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