English

On Weak Flexibility in Planar Graphs

Combinatorics 2023-06-13 v1 Discrete Mathematics

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 vv in some subset of V(G)V(G) has a request for a certain color r(v)r(v) in its list of colors L(v)L(v). The goal is to find an LL coloring satisfying many, but not necessarily all, of the requests. The main studied question is whether there exists a universal constant ϵ>0\epsilon >0 such that any graph GG in some graph class C\mathcal{C} satisfies at least ϵ\epsilon proportion of the requests. More formally, for k>0k > 0 the goal is to prove that for any graph GCG \in \mathcal{C} on vertex set VV, with any list assignment LL of size kk for each vertex, and for every RVR \subseteq V and a request vector (r(v):vR, r(v)L(v))(r(v): v\in R, ~r(v) \in L(v)), there exists an LL-coloring of GG satisfying at least ϵR\epsilon|R| requests. If this is true, then C\mathcal{C} is called ϵ\epsilon-flexible for lists of size kk. Choi et al. [arXiv 20'] introduced the notion of weak flexibility, where R=VR = 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 bb there exists ϵ(b)>0\epsilon(b)>0 so that the class of planar graphs without K4,C5,C6,C7,BbK_4, C_5 , C_6 , C_7, B_b is weakly ϵ(b)\epsilon(b)-flexible for lists of size 44 (here KnK_n, CnC_n and BnB_n are the complete graph, a cycle, and a book on nn vertices, respectively). We also show that the class of planar graphs without K4,C5,C6,C7,B5K_4, C_5 , C_6 , C_7, B_5 is ϵ\epsilon-flexible for lists of size 44. The results are tight as these graph classes are not even 3-colorable.

Keywords

Cite

@article{arxiv.2009.07932,
  title  = {On Weak Flexibility in Planar Graphs},
  author = {Bernard Lidický and Tomáš Masařík and Kyle Murphy and Shira Zerbib},
  journal= {arXiv preprint arXiv:2009.07932},
  year   = {2023}
}

Comments

30 pages, 9 figures

R2 v1 2026-06-23T18:35:49.668Z