The image of the Lepowsky homomorphism for the group F4

Abstract

Let Go be a semisimple Lie group, let Ko be a maximal compact subgroup of Go and let k⊂g denote the complexification of their Lie algebras. Let G be the adjoint group of g and let K be the connected Lie subgroup of G with Lie algebra ad(k). If U(g) is the universal enveloping algebra of g then U(g)K will denote the centralizer of K in U(g). Also let P:U(g) U(k) U(a) be the projection map corresponding to the direct sum U(g)=(U(k) U(a)) U(g)n associated to an Iwasawa decomposition of Go adapted to Ko. In this paper we give a characterization of the image of U(g)K under the injective antihomorphism P:U(g)K U(k)M U(a), considered by Lepowsky, when Go is locally isomorphic to F4.