English

Group Presentations for Links in Thickened Surfaces

Geometric Topology 2020-05-05 v1

Abstract

Using a combinatorial argument, we prove the well-known result that the Wirtinger and Dehn presentations of a link in 3-space describe isomorphic groups. The result is not true for links \ell in a thickened surface S×[0,1]S \times [0,1]. Their precise relationship, as given in the 2012 thesis of R.E. Byrd, is established here by an elementary argument. When a diagram in SS for \ell can be checkerboard shaded, the Dehn presentation leads naturally to an abelian "Dehn coloring group," an isotopy invariant of \ell. Introducing homological information from SS produces a stronger invariant, C\cal C, a module over the group ring of H1(S;Z)H_1(S; {\mathbb Z}). The authors previously defined the Laplacian modules LG,LG{\cal L}_G,{ \cal L}_{G^*} and polynomials ΔG,ΔG\Delta_G, \Delta_{G^*} associated to a Tait graph GG and its dual GG^*, and showed that the pairs {LG,LG}\{{\cal L}_G, {\cal L}_{G^*}\}, {ΔG,ΔG}\{\Delta_G, \Delta_{G^*}\} are isotopy invariants of \ell. The relationship between C\cal C and the Laplacian modules is described and used to prove that ΔG\Delta_G and ΔG\Delta_{G^*} are equal when SS is a torus.

Keywords

Cite

@article{arxiv.2005.01576,
  title  = {Group Presentations for Links in Thickened Surfaces},
  author = {Daniel S. Silver and Susan G. Williams},
  journal= {arXiv preprint arXiv:2005.01576},
  year   = {2020}
}

Comments

16 pages, 12 figures

R2 v1 2026-06-23T15:17:49.640Z