A formula for the Jack super nabla operator

Abstract

We study a Jack analog ∇(p,q) of the super nabla operator recently introduced by Bergeron, Haglund, Iraci and Romero for Macdonald polynomials. We prove that ∇(p,q) has a differential expression in the power-sum basis given in terms of Chapuy-Doega and Nazarov-Sklyanin operators. This result is obtained from a more general formula for the operator G(p,q) encoding the structure coefficients of Jack characters, from which ∇(p,q) is obtained by taking the top homogeneous part. A key step of the proof involves establishing that Chapuy-Doega operators together with a dehomogenized version of Nazarov-Sklyanin operators have a Heisenberg algebra structure. The proof also uses a characterization of the operator G(p,q) with a family of differential equations, recently established by the author.