The Capelli eigenvalue problem for Lie superalgebras

Abstract

For a finite dimensional unital complex simple Jordan superalgebra J, the Tits-Kantor-Koecher construction yields a 3-graded Lie superalgebra g g(-1) g(0) g(1), such that g(-1) J. Set V:= g(-1)* and g:= g(0). In most cases, the space P(V) of superpolynomials on V is a completely reducible and multiplicity-free representation of g, with a decomposition P(V):=λ∈Vλ, where (Vλ)λ∈ is a family of irreducible g-modules parametrized by a set of partitions . In these cases, one can define a natural basis (Dλ)λ∈ of "Capelli operators" for the algebra PD(V) g. In this paper we complete the solution to the Capelli eigenvalue problem, which is to determine the scalar cμ(λ) by which Dμ acts on Vλ. We associate a restricted root system to the symmetric pair ( g, k) that corresponds to J, which is either a deformed root system of type A(m,n) or a root system of type Q(n). We prove a necessary and sufficient condition on the structure of for P(V) to be completely reducible and multiplicity-free. When satisfies the latter condition we obtain an explicit formula for the eigenvalue cμ(λ), in terms of Sergeev-Veselov's shifted super Jack polynomials when is of type A(m,n), and Okounkov-Ivanov's factorial Schur Q-polynomials when is of type Q(n).