Highest weight vectors and transmutation

Abstract

Let G= GLn be the general linear group over an algebraically closed field k, let g= gln be its Lie algebra and let U be the subgroup of G which consists of the upper uni-triangular 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. In characteristic zero, we give for all dominant weights ∈ Zn finite homogeneous spanning sets for the k[ g]G-modules k[ g]U of highest weight vectors. This result (with some mistakes) was already given without proof by J.~F.~Donin. Then we do the same for tuples of n× n-matrices under the diagonal conjugation action. Furthermore we extend our earlier results in positive characteristic and give a general result which reduces the problem to giving spanning sets of the highest weight vectors for the action of GLr× GLs on tuples of r× s matrices. This requires the technique called "transmutation" by R.~Brylinsky which is based on an instance of Howe duality. In the cases that _n -1 or _1 1 this leads to new spanning sets for the modules k[ g]U.