Representations of Affine Quantum Function Algebras
Abstract
Let C be a symmetrizable generalized Cartan Matrix, and q an indeterminate. (C) is the Kac-Moody Lie algebra and U=Uq((C)) the associated quantum enveloping algebra over k= Q(q). The quantum function algebra Cq[G] is defined as a suitable U-bisubalgebra of the dual space k(U,k) which can be described using matrix elements of integrable U-modules. For affine, the highest weight modules of Cq[G] are constructed and, assuming a minimality condition, their (unitarizable) irreducible quotients are shown to be in a 1-1 correspondence with the reduced elements of the Weyl group of g(C). Further, these simple module are described in terms of the Cq[SL2]-modules obtained by restriction, and they satisfy a Tensor Product theorem, similar to the finite type case.
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