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Parameterized Complexity of Equitable Coloring

Discrete Mathematics 2023-06-22 v3

Abstract

A graph on nn vertices is equitably kk-colorable if it is kk-colorable and every color is used either n/k\left\lfloor n/k \right\rfloor or n/k\left\lceil n/k \right\rceil times. Such a problem appears to be considerably harder than vertex coloring, being NP-Complete\mathsf{NP\text{-}Complete} even for cographs and interval graphs. In this work, we prove that it is W[1]-Hard\mathsf{W[1]\text{-}Hard} for block graphs and for disjoint union of split graphs when parameterized by the number of colors; and W[1]-Hard\mathsf{W[1]\text{-}Hard} for K1,4K_{1,4}-free interval graphs when parameterized by treewidth, number of colors and maximum degree, generalizing a result by Fellows et al. (2014) through a much simpler reduction. Using a previous result due to Dominique de Werra (1985), we establish a dichotomy for the complexity of equitable coloring of chordal graphs based on the size of the largest induced star. Finally, we show that \textsc{equitable coloring} is FPT\mathsf{FPT} when parameterized by the treewidth of the complement graph.

Keywords

Cite

@article{arxiv.1810.13036,
  title  = {Parameterized Complexity of Equitable Coloring},
  author = {Guilherme de C. M. Gomes and Carlos V. G. C. Lima and Vinícius F. dos Santos},
  journal= {arXiv preprint arXiv:1810.13036},
  year   = {2023}
}
R2 v1 2026-06-23T04:58:27.928Z