On Weak Flexibility in Planar Graphs

TL;DR

This paper explores weak flexibility in planar graphs, establishing conditions under which a significant proportion of color requests can be satisfied in list coloring, especially in classes excluding certain subgraphs.

Contribution

It introduces a new tool for handling weak flexibility and proves that specific classes of planar graphs are weakly flexible for list size four, extending previous concepts.

Findings

Planar graphs without certain subgraphs are weakly flexible for list size four.

Class of planar graphs without specific subgraphs is fully flexible for list size four.

Results are tight; these classes are not 3-colorable.

Abstract

Recently, Dvo\v{r}\'ak, Norin, and Postle introduced flexibility as an extension of list coloring on graphs [JGT 19']. In this new setting, each vertex $v$ in some subset of $V(G)$ has a request for a certain color $r(v)$ in its list of colors $L(v)$. The goal is to find an $L$ coloring satisfying many, but not necessarily all, of the requests. The main studied question is whether there exists a universal constant $\epsilon >0$ such that any graph $G$ in some graph class $\mathcal{C}$ satisfies at least $\epsilon$ proportion of the requests. More formally, for $k > 0$ the goal is to prove that for any graph $G \in \mathcal{C}$ on vertex set $V$, with any list assignment $L$ of size $k$ for each vertex, and for every $R \subseteq V$ and a request vector $(r(v): v\in R, ~r(v) \in L(v))$, there exists an $L$-coloring of $G$ satisfying at least $\epsilon|R|$ requests. If this is true, then $\mathcal{C}$ is called $\epsilon$-flexible for lists of size $k$. Choi et al. [arXiv 20'] introduced the notion of weak flexibility, where $R = V$. We further develop this direction by introducing a tool to handle weak flexibility. We demonstrate this new tool by showing that for every positive integer $b$ there exists $\epsilon(b)>0$ so that the class of planar graphs without $K_4, C_5 , C_6 , C_7, B_b$ is weakly $\epsilon(b)$-flexible for lists of size $4$ (here $K_n$, $C_n$ and $B_n$ are the complete graph, a cycle, and a book on $n$ vertices, respectively). We also show that the class of planar graphs without $K_4, C_5 , C_6 , C_7, B_5$ is $\epsilon$-flexible for lists of size $4$. The results are tight as these graph classes are not even 3-colorable.