Normalizers of maximal tori and real forms of Lie groups

Abstract

Given a complex connected reductive Lie group G with a maximal torus H⊂ G, Tits defined an extension WGT of the corresponding Weyl group WG. The extended group is supplied with an embedding into the normalizer NG(H), such that WGT together with H generate NG(H). In this paper we propose an interpretation of the Tits classical construction in terms of the maximal split real form G(R)⊂ G, which leads to the simple topological description of WTG. We also consider a variation of the Tits construction associated with compact real form U of G. In this case we define an extension WGU of the Weyl group WG, naturally embedded into the group extension U:=U of the compact real form U by the Galois group = Gal(C/R). Generators of WUG are squared to identity as in the Weyl group WG. However, the non-trivial action of by outer automorphisms requires WUG to be a non-trivial extension of WG. This gives a specific presentation of the maximal torus normalizer of the group extension U. Finally, we describe explicitly the adjoint action of WGT and WUG on the Lie algebra of G.