Autoequivalences of the tensor category of Uq(g)-modules

Abstract

We prove that for q∈* not a nontrivial root of unity the cohomology group defined by invariant 2-cocycles in a completion of Uq(g) is isomorphic to H2(P/Q;), where P and Q are the weight and root lattices of g. This implies that the group of autoequivalences of the tensor category of Uq(g)-modules is the semidirect product of H2(P/Q;) and the automorphism group of the based root datum of g. For q=1 we also obtain similar results for all compact connected separable groups.