Almost-crystallographic groups as quotients of Artin braid groups

Abstract

Let n, k ≥ 3. In this paper, we analyse the quotient group B\n/\k(P\n) of the Artin braid group B\n by the subgroup \k(P\n) belonging to the lower central series of the Artin pure braid group P\n. We prove that it is an almost-crystallographic group. We then focus more specifically on the case k=3. If n ≥ 5, and if τ ∈ N is such that gcd(τ, 6) = 1, we show that B\n/\3 (P\n) possesses torsion τ if and only if S\n does, and we prove that there is a one-to-one correspondence between the conjugacy classes of elements of order τ in B\n/\3 (P\n) with those of elements of order τ in the symmetric group S\n. We also exhibit a presentation for the almost-crystallographic group B\n/\3 (P\n). Finally, we obtain some 4-dimensional almost-Bieberbach subgroups of B\3/\3 (P\3), we explain how to obtain almost-Bieberbach subgroups of B\4/\3(P\4) and B\3/\4(P\3), and we exhibit explicit elements of order 5 in B\5/\3 (P\5).