Combinatorial representations of Coxeter groups over a field of two elements

Abstract

Let W denote a simply-laced Coxeter group with n generators. We construct an n-dimensional representation φ of W over the finite field F2 of two elements. The action of φ(W) on F2n by left multiplication is corresponding to a combinatorial structure extracted and generalized from Vogan diagrams. In each case W of types A, D and E, we determine the orbits of F2n under the action of φ(W), and find that the kernel of φ is the center Z(W) of W.