A proof of the Goodearl-Lenagan polynormality conjecture

Abstract

The quantum nilpotent algebras Uw-(g), defined by De Concini-Kac-Procesi and Lusztig, are large classes of iterated skew polynomial rings with rich ring theoretic structure. In this paper, we prove in an explicit way that all torus invariant prime ideals of the algebras Uw-(g) are polynormal. In the special case of the algebras of quantum matrices, this construction yields explicit polynormal generating sets consisting of quantum minors for all of their torus invariant prime ideals. This gives a constructive proof of the Goodearl-Lenagan polynormality conjecture. Furthermore we prove that Spec Uw-(g) is normally separated for all simple Lie algebras g and Weyl group elements w, and deduce from it that all algebras Uw-(g) are catenary.