On Maps with a Single Zigzag

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Abstract

If a graph GM is embedded into a closed surface S such that S\GM is a collection of disjoint open discs, then = 3D(GM, S) is called a map. A zigzag in a map M is a closed path which alternates choosing, at each star of a vertex, the leftmost and the rightmost possibilities for its next edge. If a map has a single zigzag we show that the cyclic ordering of the edges along it induces linear transformations, Cp and Cp∼ whose images and kernels are respectively the cycle and bond spaces (over GF(2)) of GM and GD, where D= 3D(GD, S) is the dual map of M. We prove that Im(cp o cp∼) is the intersection of the cycle spaces of GM and GD, and that the dimension of this subspace is connectivity of S. Finally, if M has also a single face, this face induces a linear transformation cD which is invertible: we show that C-1D = 3Dcp∼. 

Keywords

closed surfaces , graphs , maps , map dualities , facial and zigzag paths
  • Sóstenes Lins Universidade Federal de Pernambuco - CCEN, Departamento de Matemática -Recife-PE, Brazil.
  • Valdenberg Silva Universidade Federal de Sergipe, Departamento de Matemática - Aracaju-SE, Brazil.
  • Pages: 330-341
  • Date Published: 2003-10-01
  • Vol. 5 No. 3 (2003): CUBO, Matemática Educacional

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Published

2003-10-01

How to Cite

[1]
S. Lins and V. Silva, “On Maps with a Single Zigzag”, CUBO, vol. 5, no. 3, pp. 330–341, Oct. 2003.

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