Multiparameter quantum groups and twisted quasitriangular Hopf algebras

We show that the Brauer group BM(k, H ν , R s,β ) of the quasitriangular Hopf algebra (H ν , R s,β ) is a direct product of the additive group of the field k and the classical Brauer group B θ s (k, Z 2ν ) associated to the bicharacter θ s on Z 2ν defined by θ s (x, y) = ω sxy , with ω a 2νth root o

Let X s GM be a finite group factorisation. It is shown that the quantum Ž . ## Ž . double D H of the associated bicrossproduct Hopf algebra This provides a class of bicrossproduct Hopf algebras which are quasitriangular. We also construct a subgroup Y X associated to every order-reversing automo

Let G be a connected semi-simple complex Lie group. We define and study the multi-parameter quantum group C q, p [G ] in the case where q is a complex parameter that is not a root of unity. Using a method of twisting bigraded Hopf algebras by a cocycle, [2], we develop a unified approach to the cons