Braided enveloping algebras associated to quantum parabolic subalgebras

Abstract

Associated to each subset J of the nodes I of a Dynkin diagram is a triangular decomposition of the corresponding Lie algebra g into three subalgebras gJ (generated by ej, fj for j∈ J and hi for i∈ I), n-D (generated by fd, d∈ D=I J) and its dual nD+. We demonstrate a quantum counterpart, generalising work of Majid and Rosso, by exhibiting analogous triangular decompositions of Uq(g) and identifying a graded braided Hopf algebra that quantizes nD-. This algebra has many similar properties to Uq-(g), in many cases being a Nichols algebra and therefore completely determined by its associated braiding.