Quotients of the Artin braid groups and crystallographic groups

Abstract

Let n be greater than or equal to 3. We study the quotient group B\n/[P n,P\n] of the Artin braid group B\n by the commutator subgroup of its pure Artin braid group P\n. We show that B\n/[P n,P\n] is a crystallographic group, and in the case n=3, we analyse explicitly some of its subgroups. We also prove that B\n/[P n,P\n] possesses torsion, and we show that there is a one-to-one correspondence between the conjugacy classes of the finite-order elements of B\n/[P n,P\n] with the conjugacy classes of the elements of odd order of the symmetric group S\n, and that the isomorphism class of any Abelian subgroup of odd order of S\n is realised by a subgroup of B\n/[P n,P\n]. Finally, we discuss the realisation of non-Abelian subgroups of S\n of odd order as subgroups of B\n/[P n,P\n], and we show that the Frobenius group of order 21, which is the smallest non-Abelian group of odd order, embeds in B\n/[P n,P\n] for all n greater than or equal to 7.