Abstract
It is shown that whenever the edges of a connected simple graph on n vertices are colored with \(n-1\) colors appearing so that no cycle in G is rainbow, there must be a monochromatic edge cut in G. From this it follows that such colorings of G can be represented, or ‘encoded,’ by full binary trees with n leaves, with vertices labeled by subsets of V(G), such that the leaf labels are singletons, the label of each non-leaf is the union of the labels of its children, and each label set induces a connected subgraph of G. It is also shown that \(n-1\) is the largest integer for which the main theorem holds, for each n, although for some graphs a certain strengthening of the hypothesis makes the theorem conclusion true with \(n-1\) replaced by \(n-2\).
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Notes
The reason for the terminology is that one of the co-authors was first introduced to the topic of RCF edge colorings by Jenö Lehel.
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Paul Horn and Peter Johnson’s research was partially supported by NSF grant DMS-134365. Paul Horn’s research was partially supported by Simons Collaboration Grant 525039 and a University of Denver Internationalization Grant.
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Hoffman, D., Horn, P., Johnson, P. et al. On Rainbow-Cycle-Forbidding Edge Colorings of Finite Graphs. Graphs and Combinatorics 35, 1585–1596 (2019). https://doi.org/10.1007/s00373-019-02102-6
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DOI: https://doi.org/10.1007/s00373-019-02102-6