English

Harmonious Colorings: bounds, heuristics and integer-linear formulations

Combinatorics 2026-05-19 v1 Discrete Mathematics

Abstract

A proper coloring cc of a simple graph GG is harmonious if, for every pair of distinct edges uv,xyE(G)uv,xy\in E(G), we have that {c(u),c(v)}{c(x),c(y)}\{c(u),c(v)\}\neq \{c(x),c(y)\}. The harmonious chromatic number of GG, denoted by h(G)h(G), is the least positive integer kk such that GG has a harmonious coloring with kk colors. In this work, we extend an idea presented in [Kolay, et al. Harmonious coloring: Parameterized algorithms and upper bounds. Theor. Comp. Sci. 772 (2019), 132-142] to compare the harmonious chromatic numbers of two graphs GG and HH, with HH being obtained from GG by identifying vertices at distance at least three. Furthermore, by fixing a proof presented in the same work, we manage to improve one of its upper bounds. We also introduce and study the first, to the best of our knowledge, integer-linear programming formulations for this problem in the literature, along with some heuristics. We provide some preliminary tests on random instances and instances from the second DIMACS Implementation Challenge.

Keywords

Cite

@article{arxiv.2605.18634,
  title  = {Harmonious Colorings: bounds, heuristics and integer-linear formulations},
  author = {Júlio Araújo and Manoel Campêlo and Beatriz Martins and Marcio C. Santos},
  journal= {arXiv preprint arXiv:2605.18634},
  year   = {2026}
}

Comments

20 pages, 1 figure, 6 tables