Classification of simple Wn-modules with finite-dimensional weight spaces

Abstract

We classify all simple Wn-modules with finite-dimensional weight spaces. Every such module is either of a highest weight type or is a quotient of a module of tensor fields on a torus, which was conjectured by Eswara Rao. This generalizes the classical result of Mathieu on simple weight modules for the Virasoro algebra. In our proof of the classification we construct a functor from the category of cuspidal Wn-modules to the category of Wn-modules with a compatible action of the algebra of functions on a torus. We also present a new identity for certain quadratic elements in the universal enveloping algebra of W1, which provides important information about cuspidal W1-modules.