English

Crystallographic groups and flat manifolds from surface braid groups

Group Theory 2021-07-09 v1 Geometric Topology

Abstract

Let MM be a compact surface without boundary, and n2n\geq 2. We analyse the quotient group Bn(M)/Γ2(Pn(M))B_n(M)/\Gamma_2(P_n(M)) of the surface braid group Bn(M)B_{n}(M) by the commutator subgroup Γ2(Pn(M))\Gamma_2(P_n(M)) of the pure braid group Pn(M)P_{n}(M). If MM is different from the 22-sphere S2\mathbb{S}^2, we prove that Bn(M)/Γ2(Pn(M))B_n(M)/\Gamma_2(P_n(M)) is isomorphic rho Pn(M)/Γ2(Pn(M))φSnP_n(M)/\Gamma_2(P_n(M)) \rtimes_{\varphi} S_n, and that Bn(M)/Γ2(Pn(M))B_n(M)/\Gamma_2(P_n(M)) is a crystallographic group if and only if MM is orientable. If MM is orientable, we prove a number of results regarding the structure of Bn(M)/Γ2(Pn(M))B_n(M)/\Gamma_2(P_n(M)). We characterise the finite-order elements of this group, and we determine the conjugacy classes of these elements. We also show that there is a single conjugacy class of finite subgroups of Bn(M)/Γ2(Pn(M))B_n(M)/\Gamma_2(P_n(M)) isomorphic either to SnS_n or to certain Frobenius groups. We prove that crystallographic groups whose image by the projection Bn(M)/Γ2(Pn(M))SnB_n(M)/\Gamma_2(P_n(M))\to S_n is a Frobenius group are not Bieberbach groups. Finally, we construct a family of Bieberbach subgroups G~n,g\tilde{G}_{n,g} of Bn(M)/Γ2(Pn(M))B_n(M)/\Gamma_2(P_n(M)) of dimension 2ng2ng and whose holonomy group is the finite cyclic group of order nn, and if Xn,g\mathcal{X}_{n,g} is a flat manifold whose fundamental group is G~n,g\tilde{G}_{n,g}, we prove that it is an orientable K\"ahler manifold that admits Anosov diffeomorphisms.

Keywords

Cite

@article{arxiv.2107.03683,
  title  = {Crystallographic groups and flat manifolds from surface braid groups},
  author = {Daciberg Lima Gonçalves and John Guaschi and Oscar Ocampo and Carolina de Miranda E Pereiro},
  journal= {arXiv preprint arXiv:2107.03683},
  year   = {2021}
}
R2 v1 2026-06-24T03:59:31.815Z