Finiteness properties for relatives of braided Higman--Thompson groups

Abstract

We study the finiteness properties of the braided Higman--Thompson group bVd,r(H) with labels in H≤ Bd, and bFd,r(H) and bTd,r(H) with labels in H≤ PBd where Bd is the braid group with d strings and PBd is its pure braid subgroup. We show that for all d≥ 2 and r≥ 1, the group bVd,r(H) (resp. bTd,r(H) or bFd,r(H)) is of type Fn if and only if H is. Our result in particular confirms a recent conjecture of Aroca and Cumplido.