Flat braid groups, right-angled Artin groups, and commensurability

Abstract

For every n≥ 1, the flat braid group FBn is an analogue of the braid group Bn that can be described as the fundamental group of the configuration space \ \x1, …, xn \ ∈ Rn / Sym(n) there exist at most two indices i,j such that xi=xj \. Alternatively, FBn can also be described as the right-angled Coxeter group C(Pn-2opp), where Pn-2opp denotes the opposite graph of the path Pn-2 of length n-2. In this article, we prove that, for every n= 7 or ≥ 11, PFBn is not virtually a right-angled Artin group, disproving a conjecture of Naik, Nanda, and Singh. In the opposite direction, we observe that FB7 turns out to be commensurable to the right-angled Artin group A(P4).

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