Generating function for GLn-invariant differential operators in the skew Capelli identity

Abstract

Let Altn be the vector space of all alternating n-by-n complex matrices, on which the complex general linear group GLn acts by x g x gt. The aim of this paper is to show that Pfaffian of a certain matrix whose entries are multiplication operators or derivations acting on polynomials on Altn provides a generating function for the GLn-invariant differential operators that play a role in the skew Capelli identity, with coefficients the Hermite polynomials.