English

Equitably Coloring Planar and Outerplanar Graphs

Combinatorics 2025-09-23 v2

Abstract

A proper ss-coloring of an nn-vertex graph is \emph{equitable} if every color class has size n/s\lfloor{n/s}\rfloor or n/s\lceil{n/s}\rceil. A necessary condition to have an equitable ss-coloring is that every vertex vv appears in an independent set of size at least n/s\lfloor{n/s}\rfloor. That is minvV(G)αvn/s\min_{v\in V(G)}\alpha_v\ge \lfloor{n/s}\rfloor. Various authors showed that when GG is a tree and s3s\ge 3 this obvious necessary condition is also sufficient. Kierstead, Kostochka, and Xiang asked whether this result holds more generally for all outerplanar graphs. We show that the answer is No when s=3s=3, but that the answer is Yes when s6s\ge 6. The case s{4,5}s\in\{4,5\} remains open. We also prove an analogous result for planar graphs, with a necessary and sufficient hypothesis. Fix s40s\ge 40. Let GG be a planar graph, and let w0,w1w_0,w_1 be its 22 vertices with largest degrees. If there exist disjoint independent sets I0,I1I_0, I_1 such that I0=n/s|I_0|=\lfloor{n/s}\rfloor and I1=(n+1)/s|I_1| = \lfloor{(n+1)/s}\rfloor and w0,w1I0I1w_0,w_1\in I_0\cup I_1, then GG has an equitable ss-coloring.

Keywords

Cite

@article{arxiv.2509.16123,
  title  = {Equitably Coloring Planar and Outerplanar Graphs},
  author = {Daniel W. Cranston and Reem Mahmoud},
  journal= {arXiv preprint arXiv:2509.16123},
  year   = {2025}
}

Comments

19 pages, 8 figures, 4.5 page appendix

R2 v1 2026-07-01T05:46:05.628Z