Minimum numbers of Dehn colors of knots and R-palette graphs
Abstract
In this paper, we consider minimum numbers of colors of knots for Dehn colorings. In particular, we will show that for any odd prime number p and any Dehn p-colorable knot K, the minimum number of colors for K is at least 2 p +2. Moreover, we will define the -palette graph for a set of colors. The -palette graphs are quite useful to give candidates of sets of colors which might realize a nontrivially Dehn p-colored diagram. In Appendix, we also prove that for Dehn 5-colorable knot, the minimum number of colors is 4.
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