The refined solution to the Capelli eigenvalue problem for gl(m|n)gl(m|n) and gl(m|2n)

Abstract

Let g be either the Lie superalgebra gl(V)gl(V) where V:= Cm|n or the Lie superalgebra gl(V) where V:= Cm|2n. Furthermore, let W be the g-module defined by W:=V V* in the former case and W:= S2(V) in the latter case. Associated to ( g,W) there exists a distinguished basis of Capelli operators \Dλ\λ∈, naturally indexed by a set of hook partitions , for the subalgebra of g-invariants in the superalgebra PD(W) of superdifferential operators on W. Let b be a Borel subalgebra of g. We compute eigenvalues of the Dλ on the irreducible g-submodules of P(W) and obtain them explicitly as the evaluation of the interpolation super Jack polynomials of Sergeev--Veselov at suitable affine functions of the b-highest weight. While the former case is straightforward, the latter is significantly more complex. This generalizes a result by Sahi, Salmasian and Serganova for these cases, where such formulas were given for a fixed choice of Borel subalgebra.