The cascade of orthogonal roots and the coadjoint structure of the nilradical of a Borel subgroup of a semisimple Lie group

Abstract

Let G be a semisimple Lie group and let =- + + be a triangular decomposition of = Lie\,G. Let = + and let H,N,B be Lie subgroups of G corresponding respectively to , and . We may identify - with the dual space to . The coadjoint action of N on - extends to an action of B on -. There exists a unique nonempty Zariski open orbit X of B on -. Any N-orbit in X is a maximal coadjoint orbit of N in -. The cascade of orthogonal roots defines a cross-section -× of the set of such orbits leading to a decomposition X = N/R× -×. This decomposition, among other things, establishes the structure of S() as a polynomial ring generated by the prime polynomials of H-weight vectors in S(). It also leads tothe multiplicity 1 of H weights in S().