Highest-weight vectors for the adjoint action of GLn on polynomials, II

Abstract

Let G=GLn be the general linear group over an algebraically closed field k and let g=gln be its Lie algebra. Let U be the subgroup of G which consists of the upper unitriangular matrices. Let k[g] be the algebra of polynomial functions on g and let k[g]G be the algebra of invariants under the conjugation action of G. For all weights chi in Zn with chi2<=0 or chin-1>=0 we give explicit bases for the k[g]G-module k[g]Uchi of highest weight vectors of weight chi. This extends earlier results to a much bigger class of weights. To express our semi-invariants in terms of matrix powers we prove certain Cayley-Hamilton type identities.