Parabolic Positive Representations of Uq(gR)

Abstract

We construct a new family of irreducible representations of Uq(gR) and its modular double by quantizing the classical parabolic induction corresponding to arbitrary parabolic subgroups, such that the generators of Uq(gR) act by positive self-adjoint operators on a Hilbert space. This generalizes the well-established positive representations which corresponds to induction by the minimal parabolic (i.e. Borel) subgroup. We also study in detail the special case of type An acting on L2(Rn) with minimal functional dimension, and establish the properties of its central characters and universal R operator. We construct a positive version of the evaluation module of the affine quantum group Uq(sln+1) modeled over this minimal positive representation of type An.