Root Fernando-Kac subalgebras of finite type

Abstract

Let g be a finite-dimensional Lie algebra and M be a g-module. The Fernando-Kac subalgebra of g associated to M is the subset g[M]⊂g of all elements g∈g which act locally finitely on M. A subalgebra l⊂g for which there exists an irreducible module M with g[M]=l is called a Fernando-Kac subalgebra of g. A Fernando-Kac subalgebra of g is of finite type if in addition M can be chosen to have finite Jordan-H\"older l-multiplicities. Under the assumption that g is simple, I. Penkov has conjectured an explicit combinatorial criterion describing all Fernando-Kac subalgebras of finite type which contain a Cartan subalgebra. In the present paper we prove this conjecture for g≠ E8.