On the Centralizer of K in U( g)

Abstract

Let g = k +p be a complexified Cartan decomposition of a complex semisimple Lie algebra g and let K be the subgroup of the adjoint group of g corresponding to k . If H is an irreducible Harish-Chandra module of U(g), then H is completely determined by the finite-dimensional action of the centralizer U(g)K on any one fixed primary component in H. This original approach of Harish-Chandra to a determination of all H has largely been abandoned because one knows very little about generators of U(g)K. Generators of U(g)K are given by generators of the symmetric algebra analogue S(g)K. Let Sm(g)K, m∈ Z+, be the subalgebra of S(g)K defined by K-invariant polynomials of degree at most m. Let Q and Qm be the respective quotient fields of S(g)K and Sm(g)K. We prove that if n= dim g one has Q= Q2n. We also determine the variety, NilK, of unstable points with respect to the action K on g and show that NilK is already defined by A2n. As pointed out to us by Hanspeter Kraft, this fact together with a result of Harm Derksen (See [D]) implies, indeed, that A= Ar where r = 2n 2 dim p.

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