On the -invariants of Artin groups satisfying the K(π,1)-conjecture

Abstract

We consider -invariants of Artin groups that satisfy the K(π,1)-conjecture. These invariants determine the cohomological finiteness conditions of subgroups that contain the derived subgroup. We extend a known result for even Artin groups of FC-type, giving a sufficient condition for a character :A to belong to n(A,Z). We also prove some partial converses. As applications, we prove that the 1-conjecture holds true when there is a prime p that divides l(e)/2 for any edge with even label l(e)>2, we generalize to Artin groups the homological version of Bestvina-Brady theorem and we compute the -invariants of all irreducible spherical and affine Artin groups and triangle Artin groups, which provide a complete classification of the Fn and FPn properties of their derived subgroup.