Group Presentations for Links in Thickened Surfaces

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 in a thickened surface S × [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 S for can be checkerboard shaded, the Dehn presentation leads naturally to an abelian "Dehn coloring group," an isotopy invariant of . Introducing homological information from S produces a stronger invariant, C, a module over the group ring of H1(S; Z). The authors previously defined the Laplacian modules LG, LG* and polynomials G, G* associated to a Tait graph G and its dual G*, and showed that the pairs \ LG, LG*\, \G, G*\ are isotopy invariants of . The relationship between C and the Laplacian modules is described and used to prove that G and G* are equal when S is a torus.