Invariant prime ideals in quantizations of nilpotent Lie algebras

Abstract

De Concini, Kac and Procesi defined a family of subalgebras Uw+ of a quantized universal enveloping algebra Uq(g), associated to the elements of the corresponding Weyl group W. They are deformations of the universal enveloping algebras U(n+ Adw(n-)) where n are the nilradicals of a pair of dual Borel subalgebras. Based on results of Gorelik and Joseph and an interpretation of Uw+ as quantized algebras of functions on Schubert cells, we construct explicitly the H invariant prime ideals of each Uw+ and show that the corresponding poset is isomorphic to W≤ w, where H is the group of group-like elements of Uq(g). Moreover, for each H-prime of Uw+ we construct a generating set in terms of Demazure modules related to fundamental representations.