Vizing's theorem

In graph theory, Vizing's theorem states that every simple undirected graph may be edge colored using a number of colors that is at most one larger than the maximum degree $Δ$ of the graph. At least $Δ$ colors are always necessary, so the undirected graphs may be partitioned into two classes: "class one" graphs for which $Δ$ colors suffice, and "class two" graphs for which $Δ + 1$ colors are necessary. A more general version of Vizing's theorem states that every undirected multigraph without loops can be colored with at most $Δ+µ$ colors, where $µ$ is the multiplicity of the multigraph.^[1] The theorem is named for Vadim G. Vizing who published it in 1964.

^ Berge, Claude; Fournier, Jean Claude (1991). "A short proof for a generalization of Vizing's theorem". Journal of Graph Theory. 15 (3). Wiley Online Library: 333–336. doi:10.1002/jgt.3190150309.

[1] Berge, Claude; Fournier, Jean Claude (1991). "A short proof for a generalization of Vizing's theorem". Journal of Graph Theory. 15 (3). Wiley Online Library: 333–336. doi:10.1002/jgt.3190150309.

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