Orthogonality of super-Jack polynomials and a Hilbert space interpretation of deformed Calogero-Moser-Sutherland operators

Abstract

We prove orthogonality and compute explicitly the (quadratic) norms for super-Jack polynomials SPλ((z1,…,zn),(w1,…,wm);θ) with respect to a natural positive semi-definite, but degenerate, Hermitian product ·,·n,m. In case m=0 (or n=0), our product reduces to Macdonald's well-known inner product ·,·n, and we recover his corresponding orthogonality results for the Jack polynomials Pλ((z1,…,zn);θ). From our main results, we readily infer that the kernel of ·,·n,m is spanned by the super-Jack polynomials indexed by a partition λ not containing the m× n rectangle (mn). As an application, we provide a Hilbert space interpretation of the deformed trigonometric Calogero-Moser-Sutherland operators of type A(n-1,m-1).