Asymptotic invariants for fusion algebras associated with compact quantum groups
Abstract
We introduce and study certain asymptotic invariants associated with fusion algebras (equipped with a dimension function), which arise naturally in the representation theory of compact quantum groups. Our invariants generalise the analogous concepts studied for classical discrete groups. Specifically we introduce uniform F lner constants and the uniform Kazhdan constant for a regular representation of a fusion algebra, and establish a relationship between these, amenability, and the exponential growth rate considered earlier by Banica and Vergnioux. Further we compute the invariants for fusion algebras associated with % discrete duals of quantum SUq(2) and SOq(3) and determine the uniform exponential growth rate for the fusion algebras of all q-deformations of semisimple, simply connected, compact Lie groups and for all free unitary quantum groups.
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