Quasitriangularity of quantum groups at roots of 1

To every fimte-dlmensional irreducible representation V of the quantum group U,(g\_) where e is a primitive /th root of unity (1 odd) and g is a finite-dimensional complex simple Lie algebra, de Concini, Kac and Procesi have associated a conjugacy class C v in the adjoint group G ofg. We describe ex

## Dedicated to R. Steinberg on the occasion of his 80th birthday Let G be a semisimple algebraic group over a field of characteristic p > 0 and let B ⊂ G be a Borel subgroup. The strong linkage principle for G in [1] gives a condition on the highest weights of composition factors of the cohomolog

Let \(\mathrm{g}\) be a finite dimensional complex simple Lie algebra and \(U(g)\) its enveloping algebra. The quantum group of Drinfeld and Jimbo is a Hopf algebra denoted \(U_{q}(\mathbf{g})\) defined on Chevalley-like generators over \(\mathbb{C}\left[q, q^{-1}\right]\). Through "specialization"