Sums of squares of the Littlewood-Richardson coefficients and GL(n)-harmonic polynomials

Abstract

We consider the example from invariant theory concerning the conjugation action of the general linear group on several copies of the n × n matrices, and examine a symmetric function which stably describes the Hilbert series for the invariant ring with respect to the multigradation by degree. The terms of this Hilbert series may be described as a sum of squares of Littlewood-Richardson coefficients. A "principal specialization" of the gradation is then related to the Hilbert series of the -invariant subring in the n-harmonic polynomials, where denotes a block diagonal embedding of a product of general linear groups. We also consider other specializations of this Hilbert series.