Irreducible weight modules over Witt algebras with infinite dimensional weight spaces

Abstract

Let d>1 be an integer. In 1986, Shen defined a class of weight modules Fαb(V) over the Witt algebra Wd for ∈d, b∈, and an irreducible module V over the special linear Lie algebra d. In 1996, Eswara Rao determined the necessary and sufficient conditions for these modules to be irreducible when V is finite dimensional. In this note, we will determine the necessary and sufficient conditions for all these modules Fαb(V) to be irreducible where V is not necessarily finite dimensional. Therefore we obtain a lot of irreducible Wd-modules with infinite dimensional weight spaces.