Game coloring the Cartesian product of graphs |
| |
| Authors: | Xuding Zhu |
| |
| Affiliation: | 1. Department of Applied Mathematics, National Sun Yat‐Sen University, Kaohsiung, Taiwan;2. National Center for Theoretical Sciences, Taiwan |
| |
| Abstract: | This article proves the following result: Let G and G′ be graphs of orders n and n′, respectively. Let G* be obtained from G by adding to each vertex a set of n′ degree 1 neighbors. If G* has game coloring number m and G′ has acyclic chromatic number k, then the Cartesian product G□G′ has game chromatic number at most k(k + m ? 1). As a consequence, the Cartesian product of two forests has game chromatic number at most 10, and the Cartesian product of two planar graphs has game chromatic number at most 105. © 2008 Wiley Periodicals, Inc. J Graph Theory 59: 261–278, 2008 |
| |
| Keywords: | game chromatic number Cartesian product game coloring number planar graph |
|
|
