Simple modules over the Lie algebras of divergence zero vector fields on a torus

Abstract

Let n2 be an integer, Kn the Weyl algebra over the Laurent polynomial algebra An=C [x11, x21, ..., xn1], and Sn the Lie algebra of divergence zero vector fields on an n-dimensional torus. For any sln-module V and any module P over Kn, we define an Sn-module structure on the tensor product P V. In this paper, necessary and sufficient conditions for the Sn-modules P V to be simple are given, and an isomorphism criterion for nonminuscule Sn-modules is provided. More precisely, all nonminuscule Sn-modules are simple, and pairwise nonisomorphic. For minuscule Sn-modules, minimal and maximal submodules are concretely constructed.