Principal basis in Cartan subalgebra

Abstract

Let g be a simple complex Lie algebra and h a Cartan subalgebra. In this article we explain how to obtain the principal basis of h starting form a set of generators \p1,...,pr\,r=(g), of the invariants polynomials . For each invariant polynomial p, we define a G-equivariant map Dp form g to g. We show that the Gram-Schmidt orthogonalization of the elements \Dp1(), ... Dpr() \ gives the principal basis of h. Similarly the orthogonalization of the elements \Dp1(), >... Dpr() \ produces the principal basis of the Cartan subalgebra of g, the Langlands dual of g.