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paper

Equivalence Classes of Colorings

arXiv:1208.0993 · doi:10.4064/bc103-0-2

Abstract

For any link and for any modulus $m$ we introduce an equivalence relation on the set of non-trivial m-colorings of the link (an m-coloring has values in Z/mZ). Given a diagram of the link, the equivalence class of a non-trivial m-coloring is formed by each assignment of colors to the arcs of the diagram that is obtained from the former coloring by a permutation of the colors in the arcs which preserves the coloring condition at each crossing. This requirement implies topological invariance of the equivalence classes. We show that for a prime modulus the number of equivalence classes depends on the modulus and on the rank of the coloring matrix (with respect to this modulus).

This is the version accepted for publication of the article formerly entitled "Equivalence Classes of Colorings: the Topological Viewpoint"