On the 1 and 2-invariants of Artin groups

Abstract

We prove the 1-conjecture for two families of Artin groups: Artin groups such that there exists a prime number p dividing l(e)2 for every edge e with even label >2 and balanced Artin groups. The family of balanced Artin groups extends two previously studied families: the one considered by Kochloukova in arXiv:2009.14269, and the family of coherent Artin groups. We state a conjecture on the 2-invariant for Artin groups satisfying the K(π,1)-conjecture. The conjecture is proven to be true for two significant families: 2-dimensional and coherent Artin groups. In the 2-dimensional case we are able to compute n for all n≥ 2 and to derive finiteness properties of the derived subgroup.