Root systems, symmetries and linear representations of Artin groups

Abstract

Let be a Coxeter graph, let W be its associated Coxeter group, and let G be a group of symmetries of .Recall that, by a theorem of H\'ee and M\"uhlherr, WG is a Coxeter group associated to some Coxeter graph .We denote by + the set of positive roots of and by + the set of positive roots of .Let E be a vector space over a field having a basis in one-to-one correspondence with +.The action of G on induces an action of G on +, and therefore on E.We show that EG contains a linearly independent family of vectors naturally in one-to-one correspondence with + and we determine exactly when this family is a basis of EG.This question is motivated by the construction of Krammer's style linear representations for non simply laced Artin groups.