Crystal limits of compact semisimple quantum groups as higher-rank graph algebras

Abstract

Let Oq[K] denote the quantized coordinate ring over the field C(q) of rational functions corresponding to a compact semisimple Lie group K, equipped with its *-structure. Let A0 in C(q) denote the subring of regular functions at q=0. We introduce an A0-subalgebra OqA0[K] of Oq[K] which is stable with respect to the *-structure, and which has the following properties with respect to the crystal limit q 0. The specialization of Oq[K] at each q in (0,∞)\1\ admits a faithful *-representation πq on a fixed Hilbert space, a result due to Soibelman. We show that for every element a in OqA0K, the family of operators πq(a) admits a norm-limit as q 0. These limits define a *-representation π0 of OqA0K. We show that the resulting *-algebra O[K0]=π0(OqA0[K]) is a Kumjian-Pask algebra, in the sense of Aranda Pino, Clark, an Huef and Raeburn. We give an explicit description of the underlying higher-rank graph in terms of crystal basis theory. As a consequence, we obtain a continuous field of C*-algebras (C(Kq))q∈[0,∞], where the fibres at q = 0 and ∞ are explicitly defined higher-rank graph algebras.