Equitable coloring of sparse graphs
Abstract
An equitable coloring of a graph is a proper coloring where the sizes of any two distinct color classes differ by at most one. The celebrated Chen-Lih-Wu Conjecture (CLWC for short) states that every connected graph that is neither an odd cycle, a , nor a has an equitable -coloring. A graph is in if for all , , and if is bipartite, then . In this paper, we confirm CLWC for all graphs in provided that and , where is a real root of . By specializing to the case , we deduce that every -degenerate graph with admits an equitable -coloring for all , thereby improving the previous best-known lower bound of on established by Kostochka and Nakprasit in 2005. A graph is -planar if it can be drawn in the plane so that each edge is crossed at most times. CLWC had been confirmed for planar graphs with (Kostochka, Lin, and Xiang, 2024) and for -planar graphs with (Cranston and Mahmoud, 2025). As an immediate application of our main result, we extend this confirmation to all -planar graphs with and .
Cite
@article{arxiv.2411.19801,
title = {Equitable coloring of sparse graphs},
author = {Weichan Liu and Xin Zhang},
journal= {arXiv preprint arXiv:2411.19801},
year = {2025}
}
Comments
We have revised several proofs and restructured the paper