Positive Representations of Split Real Simply-laced Quantum Groups

Abstract

We construct the positive principal series representations for Uq(gR) where g is of simply-laced type, parametrized by R≥ 0r where r is the rank of g. We describe explicitly the actions of the generators in the positive representations as positive essentially self-adjoint operators on a Hilbert space, and prove the transcendental relations between the generators of the modular double. We define the modified quantum group Uqq(gR) of the modular double and show that the representations of both parts of the modular double commute weakly with each other, there is an embedding into a quantum torus algebra, and the commutant contains its Langlands dual.