Combinatorial Bounds for Conflict-free Coloring on Open Neighborhoods

TL;DR

This paper improves bounds on conflict-free coloring with respect to open neighborhoods in graphs, relating it to structural parameters like feedback vertex set, pathwidth, and neighborhood diversity, and introduces new bounds for planar graphs.

Contribution

It provides tighter bounds on the CFON chromatic number based on feedback vertex set, pathwidth, and other parameters, and addresses an open question about partial coloring in planar graphs.

Findings

Improved bound: vs(G)+2 for CFON coloring, tight and answers open question.

New bound: loor(5/3)(vs(G)+1) relating CFON coloring to pathwidth.

*_{ON}(G)  5 for all planar graphs, improving previous bound of 8.

Abstract

In an undirected graph $G$, a conflict-free coloring with respect to open neighborhoods (denoted by CFON coloring) is an assignment of colors to the vertices such that every vertex has a uniquely colored vertex in its open neighborhood. The minimum number of colors required for a CFON coloring of $G$ is the CFON chromatic number of $G$, denoted by $\chi_{ON}(G)$. The decision problem that asks whether $\chi_{ON}(G) \leq k$ is NP-complete. We obtain the following results: * Bodlaender, Kolay and Pieterse [WADS 2019] showed the upper bound $\chi_{ON}(G)\leq {\sf fvs}(G)+3$, where ${\sf fvs}(G)$ denotes the size of a minimum feedback vertex set of $G$. We show the improved bound of $\chi_{ON}(G)\leq {\sf fvs}(G)+2$, which is tight, thereby answering an open question in the above paper. * We study the relation between $\chi_{ON}(G)$ and the pathwidth of the graph $G$, denoted ${\sf pw}(G)$. The above paper from WADS 2019 showed the upper bound $\chi_{ON}(G) \leq 2{\sf tw}(G)+1$ where ${\sf tw}(G)$ stands for the treewidth of $G$. This implies an upper bound of $\chi_{ON}(G) \leq 2{\sf pw}(G)+1$. We show an improved bound of $\chi_{ON}(G) \leq \lfloor \frac{5}{3}({\sf pw}(G)+1) \rfloor$. * We prove new bounds for $\chi_{ON}(G)$ with respect to the structural parameters neighborhood diversity and distance to cluster, improving existing results. * We also study the partial coloring variant of the CFON coloring problem, which allows vertices to be left uncolored. Let $\chi^*_{ON}(G)$ denote the minimum number of colors required to color $G$ as per this variant. Abel et. al. [SIDMA 2018] showed that $\chi^*_{ON}(G) \leq 8$ when $G$ is planar. They asked if fewer colors would suffice for planar graphs. We answer this question by showing that $\chi^*_{ON}(G) \leq 5$ for all planar $G$. All our bounds are a result of constructive algorithmic procedures.