The R --matrix action of untwisted affine quantum groups at roots of 1

Abstract

Let g be an untwisted affine Kac-Moody algebra. The quantum group Uh( g) (over C[[h]]) is known to be a quasitriangular Hopf algebra: in particular, it has a universal R --matrix, which yields an R --matrix for each pair of representations of Uh( g). On the other hand, the quantum group Uq( g) (over C(q) ) also has an R --matrix for each pair of representations, but it has not a universal R --matrix so that one cannot say that it is quasitriangular. Following Reshetikin, one introduces the (weaker) notion of braided Hopf algebra: then Uq( g) is a braided Hopf algebra. In this work we prove that also the unrestricted specializations of Uq( g) at roots of 1 are braided: in particular, specializing q at 1 we have that the function algebra F [ H ] of the Poisson proalgebraic group H dual of G (a Kac-Moody group with Lie algebra g \,) is braided. This is useful because, despite these specialized quantum groups are not quasitriangular, the braiding is enough for applications, mainly for producing knot invariants. As an example, the action of the R --matrix on (tensor products of) Verma modules can be specialized at odd roots of 1.

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