Edge homogeneous colorings

Tomáš Madaras; Alfréd Onderko; Thomas Schweser

doi:10.7494/OpMath.2022.42.1.65

Opuscula Mathematica (Jan 2022)

Edge homogeneous colorings

Tomáš Madaras,
Alfréd Onderko,
Thomas Schweser

Affiliations

Tomáš Madaras: ORCiD; P.J. Šafárik University in Košice, Institute of Mathematics, Faculty of Science, Jesenná 5, 04001 Košice, Slovakia
Alfréd Onderko: ORCiD; P.J. Šafárik University in Košice, Institute of Mathematics, Faculty of Science, Jesenná 5, 04001 Košice, Slovakia
Thomas Schweser: ORCiD; Technische Universitat Ilmenau, Institute of Mathematics, PF 100565, D-98684 Ilmenau, Germany

DOI: https://doi.org/10.7494/OpMath.2022.42.1.65
Journal volume & issue: Vol. 42, no. 1
pp. 65 – 73

Abstract

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We explore four kinds of edge colorings defined by the requirement of equal number of colors appearing, in particular ways, around each vertex or each edge. We obtain the characterization of graphs colorable in such a way that the ends of each edge see (not regarding the edge color itself) \(q\) colors (resp. one end sees \(q\) colors and the color sets for both ends are the same), and a sufficient condition for 2-coloring a graph in a way that the ends of each edge see (with the omission of that edge color) altogether \(q\) colors. The relations of these colorings to \(M_q\)-colorings and role colorings are also discussed; we prove an interpolation theorem for the numbers of colors in edge coloring where all edges around each vertex have \(q\) colors.

Published in Opuscula Mathematica

ISSN: 1232-9274 (Print); 2300-6919 (Online)
Publisher: AGH Univeristy of Science and Technology Press
Country of publisher: Poland
LCC subjects: Technology: Technology (General): Industrial engineering. Management engineering: Applied mathematics. Quantitative methods
Website: http://www.opuscula.agh.edu.pl/

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