The strong fractional choice number and the strong fractional paint number of graphs

TL;DR

This paper investigates the properties of strong fractional choice and paint numbers of graphs, proving their rationality, exploring their relationships, and establishing bounds for planar graph classes with various cycle restrictions.

Contribution

It establishes the rationality of these parameters, constructs graphs with specific fractional values, and improves bounds for planar graphs without certain cycles.

Findings

Strong fractional choice and paint numbers are rational for all finite graphs.

Existence of graphs with prescribed fractional choice and paint numbers.

Improved bounds for the strong fractional choice number of planar graphs without certain cycles.

Abstract

This paper studies the strong fractional choice number $ch^s_f(G)$ and the strong fractional paint number $\chi^s_{f,P}(G)$ of a graph $G$. We prove that these parameters of any finite graph are rational numbers. On the other hand, for any positive integers $p,q$ satisfying $2 \le \frac{2p}{2q+1} \leq \lfloor\frac{p}{q}\rfloor$, there exists a graph $G$ with $ch^s_f(G) = \chi^s_{f,P}(G) = \frac{p}{q}$. The relationship between $\chi^s_{f,P}(G)$ and $ch^s_f(G)$ is explored. We prove that the gap $\chi^s_{f,P}(G)-ch^s_f(G)$ can be arbitrarily large. The strong fractional choice number of a family $\mathcal{G}$ of graphs is the supremum of the strong fractional choice number of graphs in $\mathcal{G}$. Let $\mathcal{P}$ denote the class of planar graphs and $\mathcal{P}_{k_1,\ldots, k_q}$ denote the class of planar graphs without $k_i$-cycles for $i=1,\ldots, q$. We prove that $3 + \frac{1}{2} \leq ch^s_f(\mathcal{P}_{ 4}) \leq 4$, $ch^s_f(\mathcal{P}_{ k})=4$ for $k \in \{5,6\}$, $3 +\frac{1}{12} \leq ch^s_f(\mathcal{P}_{ 4,5}) \leq 4$ and $ch^s_f(\mathcal{P}) \ge 4+\frac 13$. The last result improves the lower bound $4+\frac 29$ in [X. Zhu, multiple list colouring of planar graphs, Journal of Combin. Th. Ser. B,122(2017),794-799].