Coxeter groups, symmetries, and rooted representations

Abstract

Let (W,S) be a Coxeter system, let G be a group of symmetries of (W,S) and let f : W (V) be the linear representation associated with a root basis (V, .,. , ).We assume that G ⊂ (V), and that G leaves invariant and .,. . We show that WG is a Coxeter group, we construct a subset ⊂ VG so that (VG, .,. , ) is a root basis of WG, and we show that the induced representation fG : WG (VG) is the linear representation associated with (VG, .,. , ).In particular, the latter is faithful. The fact that WG is a Coxeter group is already known and is due to M\"uhlherr and H\'ee, but also follows directly from the proof of the other results.