Commensurability invariance for abelian splittings of right-angled Artin groups, braid groups and loop braid groups

Abstract

We prove that if a right-angled Artin group A is abstractly commensurable to a group splitting non-trivially as an amalgam or HNN-extension over Zn, then A must itself split non-trivially over Zk for some k n. Consequently, if two right-angled Artin groups A and A are commensurable and has no separating k-cliques for any k n then neither does , so "smallest size of separating clique" is a commensurability invariant. We also discuss some implications for issues of quasi-isometry. Using similar methods we also prove that for n 4 the braid group Bn is not abstractly commensurable to any group that splits non-trivially over a "free group-free" subgroup, and the same holds for n 3 for the loop braid group LBn. Our approach makes heavy use of the Bieri--Neumann--Strebel invariant.