Square-section braid groups and Higman-Neumann-Neumann extensions

Abstract

For positive integers n, p and q with pq-n>0, let UC(n,p× q) denote the configuration space of n unlabelled hard unit squares in the rectangle [0,p]×[0,q], and let Bn(p× q) denote the corresponding fundamental group. It is known that, as pq-n becomes large, UC(n,p× q) starts capturing homotopical properties of the classical configuration space of n unlabelled pairwise-distinct points in the plane. At the start of this approximation process, UC(pq-1,p× q) is homotopy equivalent to a wedge of (p-1)(q-1) circles, while the only other general families of spaces UC(n,p× q) known to be aspherical are UC(n,p×2) for p≥ n, and UC(pq-2,p× q). The fundamental groups of the former family are known to be responsible for the ``right-angled'' relations in Artin's classical braid groups. We prove that the fundamental groups of the latter family have a minimal presentation all whose relators are commutators. In particular, after explaining how B2p-2(p×2) arises as the right-angled Artin group (RAAG) associated to a certain meta-edge, we show that B3p-2(p×3) is a Higman-Neumann-Neumann extension of the RAAG associated to the corresponding meta-square. We provide a geometric interpretation of the latter fact in terms of Salvetti complexes.

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