1. Tight Bounds on 1-Harmonious Coloring of Certain Graphs
- Author
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Jia-Bao Liu, Antony Nelson, and Micheal Arockiaraj
- Subjects
Physics and Astronomy (miscellaneous) ,Computer science ,General Mathematics ,ComputingMethodologies_IMAGEPROCESSINGANDCOMPUTERVISION ,complete multipartite graph ,0102 computer and information sciences ,01 natural sciences ,Combinatorics ,Computer Science (miscellaneous) ,Multipartite graph ,Graph coloring ,coloring ,ComputingMethodologies_COMPUTERGRAPHICS ,Interconnection ,lcsh:Mathematics ,010401 analytical chemistry ,Complete graph ,Graph theory ,1-harmonious coloring ,lcsh:QA1-939 ,Graph ,0104 chemical sciences ,Vertex (geometry) ,010201 computation theory & mathematics ,Chemistry (miscellaneous) ,networks ,Harmonious coloring ,MathematicsofComputing_DISCRETEMATHEMATICS - Abstract
Graph coloring is one of the most studied problems in graph theory due to its important applications in task scheduling and pattern recognition. The main aim of the problem is to assign colors to the elements of a graph such as vertices and/or edges subject to certain constraints. The 1-harmonious coloring is a kind of vertex coloring such that the color pairs of end vertices of every edge are different only for adjacent edges and the optimal constraint that the least number of colors is to be used. In this paper, we investigate the graphs in which we attain the sharp bound on 1-harmonious coloring. Our investigation consists of a collection of basic graphs like a complete graph, wheel, star, tree, fan, and interconnection networks such as a mesh-derived network, generalized honeycomb network, complete multipartite graph, butterfly, and Benes networks. We also give a systematic and elegant way of coloring for these structures.
- Published
- 2019
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