Notes on the Kazhdan-Lusztig theorem on equivalence of the Drinfeld category and the category of Uq(g)-modules

Abstract

We discuss the proof of Kazhdan and Lusztig of the equivalence of the Drinfeld category D(g,h) of g-modules and the category of finite dimensional Uq(g)-modules, q=exp(π ih), for h∈ C*. Aiming at operator algebraists the result is formulated as the existence for each h∈ iR of a normalized unitary 2-cochain F on the dual G of a compact simple Lie group G such that the convolution algebra of G with the coproduct twisted by F is *-isomorphic to the convolution algebra of the q-deformation Gq of G, while the coboundary of F-1 coincides with Drinfeld's KZ-associator defined via monodromy of the Knizhnik-Zamolodchikov equations.