All trees are six-cordial
Abstract
For any integer k>0, a tree T is k-cordial if there exists a labeling of the vertices of T by Zk, inducing a labeling on the edges with edge-weights found by summing the labels on vertices incident to a given edge modulo k so that each label appears on at most one more vertex than any other and each edge-weight appears on at most one more edge than any other. We prove that all trees are six-cordial by an adjustment of the test proposed by Hovey (1991) to show all trees are k-cordial.
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