Explicit formulas for Eigenvalues of Capelli operators for the Lie superalgebra osp(1|2n)

Abstract

We define a natural basis for the algebra of gosp(1|2n)-invariant differential operators on the affine superspace C1|2n. We prove that these operators lie in the image of the centre of the enveloping algebra of gosp(1|2n). Using this result, we compute explicit formulas for the eigenvalues of these operators on irreducible summands of P(C1|2n). This settles the Capelli eigenvalue problem for orthosymplectic Lie superalgebras in the cases that were not addressed in Sahi-Salmasian-Serganova. Our main technique relies on an explicit calculation of a certain determinant with polynomial entries.