On stable Cartan subgroups of Lie groups

Abstract

Let G be a connected real Lie group with associated Lie algebra g, and let Aut(G) be the group of (Lie) automorphisms of G. It is noted here that, given a super-solvable subgroup ⊂ Aut(G) of semisimple automorphisms, there exists a -stable Cartan subgroup, by using a result of Borel and Mostow. We characterize the -stable Cartan subgroups (with induced action) in the quotient group modulo a -stable closed normal subgroup as the images of the -stable Cartan subgroups in the ambient group. It is well known that a semisimple automorphism of g always fixes a Cartan subalgebra of g. Conversely, if we take a representative from each non-conjugate class of Cartan subalgebras in a real Lie algebra, we show that there exists a non-identity automorphism that fixes these representatives. We explicitly identify such automorphisms in the case of classical simple Lie algebras. As a consequence, we deduce an analogous result for semisimple Lie groups. Moreover, given a -stable Cartan subgroup H of G, and a -stable closed connected normal subgroup M of G, we prove that there exists a -stable Cartan subgroup HM of M such that H M⊂ HM.