Models for irreducible representations of the symplectic algebra using Dirac-type operators

Abstract

In this paper we will study both the finite and infinite-dimensional representations of the symplectic Lie algebra sp(2n) and develop a polynomial model for these representations. This means that we will associate a certain space of homogeneous polynomials in a matrix variable, intersected with the kernel of sp(2n)-invariant differential operators related to the symplectic Dirac operator with every irreducible representation of sp(2n). We will show that the systems of symplectic Dirac operators can be seen as generators of parafermion algebras. As an application of these new models, we construct a symplectic analogue of the Rarita-Schwinger operator using the theory of transvector algebras.