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oaioai:journalhosting.ucalgary.ca:article/62707

Brooks' theorem for 2-fold coloring

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Publication date
29 December 2022
Publisher
Faculty of Science, University of Calgary
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    Abstract

    The two-fold chromatic number of a graph is the minimum number of colors needed to ensure that there is a way to color the graph so that each vertex gets two distinct colors, and adjacent vertices have no colors in common. The Ore degree is the maximum sum of degrees of an edge in a graph. We prove that, for 2-connected graphs, the two-fold chromatic number is at most the Ore degree, unless G is a complete graph or an odd cycle

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    Contributions to Discrete Mathematics (E-Journal, University of Calgary)

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    Last time updated on 09/01/2023

    This paper was published in Contributions to Discrete Mathematics (E-Journal, University of Calgary).

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