Proper edge colorings of planar graphs with rainbow C 4 ${C}_{4}$ -s

Pub Date : 2024-08-05 DOI:10.1002/jgt.23163

András Gyárfás, Ryan R. Martin, Miklós Ruszinkó, Gábor N. Sárközy

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Abstract

We call a proper edge coloring of a graph $G$ a B-coloring if every 4-cycle of $G$ is colored with four different colors. Let $q_{B} (G)$ denote the smallest number of colors needed for a B-coloring of $G$ . Motivated by earlier papers on B-colorings, here we consider $q_{B} (G)$ for planar and outerplanar graphs in terms of the maximum degree $Δ = Δ (G)$ . We prove that $q_{B} (G) \leq 2 Δ + 8$ for planar graphs, $q_{B} (G) \leq 2 Δ$ for bipartite planar graphs, and $q_{B} (G) \leq Δ + 1$ for outerplanar graphs with $Δ \geq 4$ . We conjecture that, for $Δ$ sufficiently large, $q_{B} (G) \leq 2 Δ (G)$ for planar $G$ , and $q_{B} (G) \leq Δ (G)$ for outerplanar $G$ .

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具有彩虹 C4 ${C}_{4}$-s 的平面图的适当边着色

如果图的每个 4 循环都用四种不同的颜色着色，我们就称该图的适当边着色为 B 着色。让表示 B 染色所需的最小颜色数。受早先关于 B 染色的论文的启发，我们在此考虑平面图和外平面图的最大度。我们证明，对于平面图、双方形平面图以及具有 .我们猜想，在足够大的情况下，对于平面图 , 和外平面图 .

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