La conjecture du K(π,1) pour les groupes d'Artin affines (d'apr\`es Paolini et Salvetti)

Abstract

Consider an affine Coxeter group W acting by isometries on the Euclidean space Rn, and the arrangement of its reflection hyperplanes. The fundamental group of the complement YW of the complexification of this arrangement in Cn mod out by W is the affine Artin group GW associated with W. The K(π,1) conjecture states that YW is a classifying space for GW. It has been recently proved by Paolini and Salvetti building on the works of McCammond and Sulway. We will present some ingredients of the proof that rests on the study of dual Garside structures for affine Artin groups, the factorisations of Euclidean isometries, and the shellability of noncrossing partitions. One consequence is that affine Artin groups, as well as braided crystallographic groups, have a finite classifying space.