Monodromy of the Casimir connection of a symmetrisable Kac-Moody algebra

Abstract

Let g be a symmetrisable Kac-Moody algebra and V an integrable g-module in category O. We show that the monodromy of the (normally ordered) rational Casimir connection on V can be made equivariant with respect to the Weyl group W of g, and therefore defines an action of the braid group BW of W on V. We then prove that this action is canonically equivalent to the quantum Weyl group action of BW on a quantum deformation of V, that is an integrable, category O-module Vh over the quantum group Uh(g) such that Vh/hVh is isomorphic to V. This extends a result of the second author which is valid for g semisimple.