On groups of smooth maps into a simple compact Lie group, revisited

Abstract

Let X be a closed smooth manifold, G be a simple connected compact real Lie group, M (G) be the group of all smooth maps from X to G, and M0 (G) be its connected component for the C∞-compact open topology. It is shown that maximal normal subgroups of M0 (G) are precisely the inverse images of the centre Z(G) of G by the evaluation homomorphisms M0 (G) G, .1cm γ γ (a), for a ∈ X. This in turn is a consequence of a result on the group C∞n, G of germs at the origin O of Rn of smooth maps Rn G: this group has a unique maximal normal subgroup, which is the inverse image of Z(G) by the evaluation homomorphism C∞n, G G, .1cm γ γ (O). This article provides corrections for part of an earlier article [Harp--88].