Harmonious Colorings: bounds, heuristics and integer-linear formulations
摘要
A proper coloring of a simple graph is harmonious if, for every pair of distinct edges , we have that . The harmonious chromatic number of , denoted by , is the least positive integer such that has a harmonious coloring with 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 and , with being obtained from 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.
引用
@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}
}
备注
20 pages, 1 figure, 6 tables