Minimal coloring number on minimal diagrams for Z-colorable links

Abstract

It was shown that any Z-colorable link has a diagram which admits a non-trivial Z-coloring with at most four colors. In this paper, we consider minimal numbers of colors for non-trivial Z-colorings on minimal diagrams of Z-colorable links. We show, for any positive integer N, there exists a minimal diagram of a Z-colorable link such that any Z-coloring on the diagram has at least N colors. On the other hand, it is shown that certain Z-colorable torus links have minimal diagrams admitting Z-colorings with only four colors.