All Trees are Seven-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 edge-weights as the sum modulo k of the labels on incident vertices to a given edge, which furthermore satisfies the following conditions: (i) Each label appears on at most one more vertex than any other label. (ii) Each edge-weight appears on at most one more edge than any other edge-weight. Mark Hovey (1991) conjectured that all trees are k-cordial for any integer k. Cahit (1987) had shown earlier that all trees are 2-cordial and Hovey proved that all trees are 3,4, and 5-cordial. Driscoll, et. al. (2017), used an adjustment to Hovey's test to show that all trees are 6-cordial. It is shown here that all trees are 7-cordial by that same adjustment.