The R-matrix formalism for quantized enveloping algebras

Abstract

Let Ug denote the Drinfeld-Jimbo quantum group associated to a complex semisimple Lie algebra g. We apply a modification of the R-matrix construction for quantum groups to the evaluation of the universal R-matrix of Ug on the tensor square of any of its finite-dimensional representations. This produces a quantized enveloping algebra UR(g) whose definition is given in terms of two generating matrices satisfying variants of the well-known RLL relations. We prove that UR(g) is isomorphic to the tensor product of the quantum double of the Borel subalgebra Ub⊂ Ug and a quantized polynomial algebra encoded by the space of g-invariants associated to the semiclassical limit V of the underlying finite-dimensional representation of Ug. Using this description, we characterize Ug and the quantum double of Ub as Hopf quotients of UR(g) and as fixed-point subalgebras with respect to certain natural automorphisms. As an additional corollary, we deduce that UR(g) is quasitriangular precisely when the irreducible summands of V are distinct.