On Coxeter Diagrams of complex reflection groups

Abstract

We study Coxeter diagrams of some unitary reflection groups. Using solely the combinatorics of diagrams, we give a new proof of the classification of root lattices defined over = [e2 π i/3]: there are only four such lattices, namely, the -lattices whose real forms are A2, D4, E6 and E8. Next, we address the issue of characterizing the diagrams for unitary reflection groups, a question that was raised by Brou\'e, Malle and Rouquier. To this end, we describe an algorithm which, given a unitary reflection group G, picks out a set of complex reflections. The algorithm is based on an analogy with Weyl groups. If G is a Weyl group, the algorithm immediately yields a set of simple roots. Experimentally we observe that if G is primitive and G has a set of roots whose --span is a discrete subset of the ambient vector space, then the algorithm selects a minimal generating set for G. The group G has a presentation on these generators such that if we forget that the generators have finite order then we get a (Coxeter-like) presentation of the corresponding braid group. For some groups, such as G33 and G34, new diagrams are obtained. For G34, our new diagram extends to an "affine diagram" with /7 symmetry.