English

Linear Choosability of Sparse Graphs

Combinatorics 2011-10-12 v1

Abstract

We study the linear list chromatic number, denoted \lcl(G)\lcl(G), of sparse graphs. The maximum average degree of a graph GG, denoted \mad(G)\mad(G), is the maximum of the average degrees of all subgraphs of GG. It is clear that any graph GG with maximum degree Δ(G)\Delta(G) satisfies \lcl(G)\ceilΔ(G)/2+1\lcl(G)\ge \ceil{\Delta(G)/2}+1. In this paper, we prove the following results: (1) if \mad(G)<12/5\mad(G)<12/5 and Δ(G)3\Delta(G)\ge 3, then \lcl(G)=\ceilΔ(G)/2+1\lcl(G)=\ceil{\Delta(G)/2}+1, and we give an infinite family of examples to show that this result is best possible; (2) if \mad(G)<3\mad(G)<3 and Δ(G)9\Delta(G)\ge 9, then \lcl(G)\ceilΔ(G)/2+2\lcl(G)\le\ceil{\Delta(G)/2}+2, and we give an infinite family of examples to show that the bound on \mad(G)\mad(G) cannot be increased in general; (3) if GG is planar and has girth at least 5, then \lcl(G)\ceilΔ(G)/2+4\lcl(G)\le\ceil{\Delta(G)/2}+4.

Keywords

Cite

@article{arxiv.1007.1615,
  title  = {Linear Choosability of Sparse Graphs},
  author = {Daniel W. Cranston and Gexin Yu},
  journal= {arXiv preprint arXiv:1007.1615},
  year   = {2011}
}

Comments

12 pages, 2 figures

R2 v1 2026-06-21T15:46:29.675Z