Irreducible modules over Witt algebras Wn and over sln+1(C)

Abstract

In this paper, by using the "twisting technique" we obtain a class of new modules Ab over the Witt algebras Wn from modules A over the Weyl algebras Kn (of Laurent polynomials) for any b∈C. We give the necessary and sufficient conditions for Ab to be irreducible, and determine the necessary and sufficient conditions for two such irreducible Wn-modules to be isomorphic. Since n+1(C) is a subalgebra of Wn, all the above irreducible Wn-modules Ab can be considered as n+1(C)-modules. For a class of such n+1(C)-modules, denoted by 1-a(λ1,λ2,·s,λn) where a∈C, λ1,λ2,·s,λn ∈ C*, we determine the necessary and sufficient conditions for these n+1(C)-modules to be irreducible. If the n+1(C)-module 1-a(λ1,λ2,·s,λn) is reducible, we prove that it has a unique nontrivial submodule W1-a(λ1, λ2,...λn) and the quotient module is the finite dimensional n+1(C)-module with highest weight mn for some non-negative integer m∈ +. The necessary and sufficient conditions for two sln+1(C)-modules 1-a(λ1,λ2,·s,λn) and W1-a(λ1, λ2,...λn) to be isomorphic are also determined. The irreducible sln+1(C)-modules 1-a(λ1, λ2,...λn) and W1-a(λ1, λ2,...λn) are new.