Non-orthogonal geometric realizations of Coxeter groups

Abstract

We define in an axiomatic fashion a Coxeter datum for an arbitrary Coxeter group W. This Coxeter datum will specify a pair of reflection representations of W in two vector spaces linked only by a bilinear paring without any integrality and non-degeneracy requirements. These representations are not required to be embeddings of W in the orthogonal group of any vector space, and they give rise to a pair of inter-related root systems generalizing the classical root systems of Coxeter groups. We obtain comparison results between these non-orthogonal root systems and the classical root systems. Further, we study the equivalent of the Tits cone in these non-orthogonal representations, and we show that strong results on the geometry in the equivalent of the Tits cone can be obtained.