Packing chromatic number of subdivisions of cubic graphs

J\'ozsef Balogh; Alexandr Kostochka; Xujun Liu

arXiv:1803.02537·math.CO·October 9, 2018·Graphs Comb.·1 cites

Packing chromatic number of subdivisions of cubic graphs

J\'ozsef Balogh, Alexandr Kostochka, Xujun Liu

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Abstract

A packing $k$ -coloring of a graph $G$ is a partition of $V (G)$ into sets $V_{1}, \dots, V_{k}$ such that for each $1 \leq i \leq k$ the distance between any two distinct $x, y \in V_{i}$ is at least $i + 1$ . The packing chromatic number, $χ_{p} (G)$ , of a graph $G$ is the minimum $k$ such that $G$ has a packing $k$ -coloring. For a graph $G$ , let $D (G)$ denote the graph obtained from $G$ by subdividing every edge. The questions on the value of the maximum of $χ_{p} (G)$ and of $χ_{p} (D (G))$ over the class of subcubic graphs $G$ appear in several papers. Gastineau and Togni asked whether $χ_{p} (D (G)) \leq 5$ for any subcubic $G$ , and later Bresar, Klavzar, Rall and Wash conjectured this, but no upper bound was proved. Recently the authors proved that $χ_{p} (G)$ is not bounded in the class of subcubic graphs $G$ . In contrast, in this paper we show that $χ_{p} (D (G))$ is bounded in this class, and…

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TopicsAdvanced Graph Theory Research · Limits and Structures in Graph Theory · Graph Labeling and Dimension Problems