Products of free groups inside graph braid groups

Abstract

Given a graph and a number n, the associated nth graph braid group Bn() is the fundamental group of the unordered configuration space of n points on . \'Swiatkowski showed that for a given and n large enough, there is a free abelian subgroup of Bn() of rank equal to the cohomological dimension of Bn(). In this note, we observe that at the cost of possibly adding additional points, we can find a subgroup of the same cohomological dimension which is a direct product of non-abelian free groups, and give some applications.

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