Star Coloring High Girth Planar Graphs

Craig Timmons

doi:10.37236/848

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Star Coloring High Girth Planar Graphs

Craig Timmons

Year: 2008 Journal: The Electronic Journal of Combinatorics Vol: 15 (1) Publisher: Electronic Journal of Combinatorics

DOI: 10.37236/848

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Abstract

A star coloring of a graph is a proper coloring such that no path on four vertices is 2-colored. We prove that every planar graph with girth at least 9 can be star colored using 5 colors, and that every planar graph with girth at least 14 can be star colored using 4 colors; the figure 4 is best possible. We give an example of a girth 7 planar graph that requires 5 colors to star color.

Keywords:

Combinatorics Mathematics Planar graph Colored Girth (graph theory) Edge coloring Star (game theory) Graph List coloring Discrete mathematics Graph power Line graph

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Topics

Advanced Graph Theory Research

Physical Sciences → Computer Science → Computational Theory and Mathematics

Graph Labeling and Dimension Problems

Physical Sciences → Computer Science → Computational Theory and Mathematics

Limits and Structures in Graph Theory

Physical Sciences → Mathematics → Discrete Mathematics and Combinatorics

Star Coloring High Girth Planar Graphs

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