English

Equitable list coloring of sparse graphs

Combinatorics 2025-12-30 v2

Abstract

A proper vertex coloring of a graph is equitable if the sizes of all color classes differ by at most 11. For a list assignment LL of kk colors to each vertex of an nn-vertex graph GG, an equitable LL-coloring of GG is a proper coloring of vertices of GG from their lists such that no color is used more than n/k\lceil n/k\rceil times. Call a graph equitably kk-choosable if it has an equitable LL-coloring for every kk-list assignment LL. A graph GG is (a,b)(a,b)-sparse if for every AV(G)A\subseteq V(G), the number of edges in the subgraph G[A]G[A] of GG induced by AA is at most aA+ba|A|+b. Our first main result is that every (76,13)(\frac{7}{6},\frac{1}{3})-sparse graph with minimum degree at least 22 is equitably 33-colorable and equitably 33-choosable. This is sharp. Our second main result is that every (54,12)(\frac{5}{4},\frac{1}{2})-sparse graph with minimum degree at least 22 is equitably 44-colorable and equitably 44-choosable. This is also sharp. One of the tools in the proof is the new notion of strongly equitable (SE) list coloring. This notion is both stronger and more natural than equitable list coloring; and our upper bounds are for SE list coloring.

Keywords

Cite

@article{arxiv.2411.08372,
  title  = {Equitable list coloring of sparse graphs},
  author = {H. A. Kierstead and Alexandr Kostochka and Zimu Xiang},
  journal= {arXiv preprint arXiv:2411.08372},
  year   = {2025}
}
R2 v1 2026-06-28T19:57:59.866Z