Commensurability in Artin groups of spherical type

Abstract

Let A and A' be two Artin groups of spherical type, and let A1,…,Ap (resp. A'1,…,A'q) be the irreducible components of A (resp. A'). We show that A and A' are commensurable if and only if p=q and, up to permutation of the indices, Ai and A'i are commensurable for every i. We prove that, if two Artin groups of spherical type are commensurable, then they have the same rank. For a fixed n, we give a complete classification of the irreducible Artin groups of rank n that are commensurable with the group of type An. Note that it will remain 6 pairs of groups to compare to get the complete classification of Artin groups of spherical type up to commensurability.