Root Systems, Tits Cones and Imaginary Cones of Brink-Howlett Groupoids

Abstract

We extend the basic theory of the groupoids introduced by Brink and Howlett in their study of normalizers of parabolic subgroups of Coxeter groups, by studying both their abstract root systems and root systems realized in real vector spaces. Such root systems have some properties formally analogous to those of root systems of Borcherds-Kac-Moody Lie algebras; in particular, some contain imaginary simple roots. Further, positive roots correspond to certain reflection subgroups. We also extend the most basic properties of the Tits cone and imaginary cone of Coxeter groups to corresponding cones defined for Brink-Howlett groupoids. The results linearize the study of certain classes of reflection subgroups of Coxeter groups in a similar way as root systems of Coxeter groups linearize the study of reflections.