Simple Witt modules that are finitely generated over the cartan subalgebra

Abstract

Let d1 be an integer, Wd and Kd be the Witt algebra and the weyl algebra over the Laurent polynomial algebra Ad=C [x11, x21, ..., xd1], respectively. For any gld-module M and any admissible module P over the extended Witt algebra Wd, we define a Wd-module structure on the tensor product P M. We prove in this paper that any simple Wd-module that is finitely generated over the cartan subalgebra is a quotient module of the Wd-module P M for a finite dimensional simple gld-module M and a simple Kd-module P that are finitely generated over the cartan subalgebra. We also characterize all simple Kd-modules and all simple admissible Wd-modules that are finitely generated over the cartan subalgebra.