Separation of Variables for Scalar-valued Polynomials in the Non-stable Range

Abstract

Any complex-valued polynomial on (Rn)k decomposes into an algebraic combination of O(n)-invariant polynomials and harmonic polynomials. This decomposition, separation of variables, is granted to be unique if n ≥ 2k-1. We prove that the condition n≥ 2k-1 is not only sufficient, but also necessary for uniqueness of the separation. Moreover, we describe the structure of non-uniqueness of the separation in the boundary cases when n = 2k-2 and n=2k-3. Formally, we study the kernel of a multiplication map φ carrying out separation of variables. We devise a general algorithmic procedure for describing Ker φ in the restricted non-stable range k ≤ n < 2k-1. In the full non-stable range n < 2k-1, we give formulas for highest weights of generators of the kernel as well as formulas for its Hilbert series. Using the developed methods, we obtain a list of highest weight vectors generating Ker φ.