Kac-Moody algebras and Lie algebras of regular vector fields on tori

Abstract

We consider the problem of representing the Kac-Moody algebra g(N) specified by an r× r indecomposable generalised Cartan matrix N as vector fields on the torus C*r. It is shown that, if the representations are of a certain form, this is possible if and only if g(N) sl(r+1, C) or sl(r, C). For sl(r+1, C) and sl(r, C), discrete families of representations are constructed. These generalise the well-known discrete families of representations of sl(2, C) as regular vector fields on C*

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