Repr\'esentations de r\'eflexion de groupes de Coxeter -- Quatri\`eme partie: La repr\'esentation R est r\'eductible. G\'en\'eralit\'es

Abstract

In this fourth part, (with the notations of the preceding parts) we make the following hypothesis: (W,S) is a Coxeter system, irreducible, 2-spherical and S is finite. Let R:W GL(M) be a reducible reflection representation of W. Let G:= Im\,R. Each sub-space of M (≠ M) stabilize by G is contained in CM(G). Let M':=M/CM(G) and N(G):=\g|g∈ G,g\, acts trivially on\,M'. We call N(G) the translation sub-group of G. One of the goals of this part is to study M' and N(G).