Decompositions of Kac-Moody groups

Abstract

Let G be a split (minimal) Kac-Moody group over R or C with maximal torus T, and let θ be a Cartan-Chevalley involution of G, twisted by complex conjugation, and satisfying that θ(T)=T. Furthermore, let K be the subgroup fixed by θ, and τ:G G, g gθ(g)-1. Let A:=τ(T). In this note, we show resp. revisit that G admits a (refined) Iwasawa decompositions G=UAK. We also show that if G is of non-spherical type, then it never admits a polar decomposition G=τ(G)K nor a Cartan decompositions G=KAK. This has implications for the geometrical structure of the Kac-Moody symmetric space G/K τ(G).