Generalised Witt algebras and idealizers

Abstract

Let be an algebraically closed field of characteristic zero, and let be an additive subgroup of . Results of Kaplansky-Santharoubane and Su classify intermediate series representations of the generalised Witt algebra W in terms of three families, one parameterised by A2 and two by P1. In this note, we use the first family to construct a homomorphism from the enveloping algebra U(W) to a skew extension of [a,b]. We show that the image of is contained in a (double) idealizer subring of this skew extension and that the representation theory of idealizers explains the three families. We further show that the image of U(W) under is not left or right noetherian, giving a new proof that U(W) is not noetherian. We construct as an application of a general technique to create ring homomorphisms from shift-invariant families of modules. Let G be an arbitrary group and let A be a G-graded ring. A graded A-module M is an intermediate series module if Mg is one-dimensional for all g ∈ G. Given a shift-invariant family of intermediate series A-modules parametrised by a scheme X, we construct a homomorphism from A to a skew-extension of [X]. The kernel of consists of those elements which annihilate all modules in X.