Manifold models for hyperbolic graph braid groups on three strands

Abstract

Given a finite graph , the associated graph braid group Bn() is the fundamental group of the unordered n-point configuration space of . Genevois classified which graph braid groups are Gromov hyperbolic and asked the question: When do these groups arise as 3-manifold groups? In this paper, we give a partial answer for B3(m), where m is the generalized -graph, a suspension of m-points. We show that B3(5) is a 3-manifold group while B3(m) is not even quasi-isometric to a 3-manifold group for m ≥ 7.

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