Embeddings of finite groups in Bn/k(Pn) for k=2, 3

Abstract

Let n ≥ 3. In this paper, we study the problem of whether a given finite group G embeds in a quotient of the form Bn/k(Pn), where Bn is the n-string Artin braid group, k ∈ \2, 3\, and \l(Pn)\l∈ N is the lower central series of the n-string pure braid group Pn. Previous results show that a necessary condition for such an embedding to exist is that |G| is odd (resp. is relatively prime with 6) if k=2 (resp. k=3), where |G| denotes the order of G. We show that any finite group G of odd order (resp. of order relatively prime with 6) embeds in B|G|/2(P|G|) (resp. in B|G|/3(P|G|)). The result in the case of B|G|/2(P|G|) has been proved independently by Beck and Marin. One may then ask whether G embeds in a quotient of the form Bn/k(Pn), where n < |G| and k ∈ \2, 3\. If G is of the form Zpr θ Zd, where the action θ is injective, p is an odd prime (resp. p ≥ 5 is prime) d is odd (resp. d is relatively prime with 6) and divides p-1, we show that G embeds in Bpr/2(Ppr) (resp. in Bpr/3(Ppr)). In the case k=2, this extends a result of Marin concerning the embedding of the Frobenius groups in Bn/2(Pn), and is a special case of another result of Beck and Marin. Finally, we construct an explicit embedding in B9/2(P9) of the two non-Abelian groups of order 27, namely the semi-direct product Z9 Z3, where the action is given by multiplication by 4, and the Heisenberg group mod 3.