Thoughts on Barnette's Conjecture
Abstract
We prove a new sufficient condition for a cubic 3-connected planar graph to be Hamiltonian. This condition is most easily described as a property of the dual graph. Let be a planar triangulation. Then the dual is a cubic 3-connected planar graph, and is bipartite if and only if is Eulerian. We prove that if the vertices of are (improperly) coloured blue and red, such that the blue vertices cover the faces of , there is no blue cycle, and every red cycle contains a vertex of degree at most 4, then is Hamiltonian. This result implies the following special case of Barnette's Conjecture: if is an Eulerian planar triangulation, whose vertices are properly coloured blue, red and green, such that every red-green cycle contains a vertex of degree 4, then is Hamiltonian. Our final result highlights the limitations of using a proper colouring of as a starting point for proving Barnette's Conjecture. We also explain related results on Barnette's Conjecture that were obtained by Kelmans and for which detailed self-contained proofs have not been published.
Cite
@article{arxiv.1312.3783,
title = {Thoughts on Barnette's Conjecture},
author = {Helmut Alt and Michael S. Payne and Jens M. Schmidt and David R. Wood},
journal= {arXiv preprint arXiv:1312.3783},
year = {2013}
}
Comments
12 pages, 7 figures