On Maps with a Single Zigzag
Abstract
If a graph is embedded into a closed surface such that is a collection of disjoint open discs, then is called a {\em map}. A {\em zigzag} in a map 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, and whose images and kernels are respectively the cycle and bond spaces (over GF(2)) of and , where is the dual map of . We prove that is the intersection of the cycle spaces of and , and that the dimension of this subspace is connectivity of . Finally, if has also a single face, this face induces a linear transformation which is invertible: we show that .
Keywords
Cite
@article{arxiv.math/0301053,
title = {On Maps with a Single Zigzag},
author = {Sostenes Lins and Valdenberg Silva},
journal= {arXiv preprint arXiv:math/0301053},
year = {2007}
}
Comments
12 pages, 8 figures