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- Fox_n-coloring abstract "In the mathematical field of knot theory, Fox n-coloring is a method of specifying a representation of a knot group (or a link group) onto the dihedral group of order n where n is an odd integer by coloring arcs in a link diagram (the representation itself is also often called a Fox n-coloring). Ralph Fox discovered this method (and the special case of tricolorability) "in an effort to make the subject accessible to everyone" when he was explaining knot theory to undergraduate students at Haverford College in 1956. Fox n-coloring is an example of a conjugation quandle.".
- Fox_n-coloring thumbnail Trefoil_tricolorings.svg?width=300.
- Fox_n-coloring wikiPageExternalLink 0608172.
- Fox_n-coloring wikiPageExternalLink QuickTrip.pdf.
- Fox_n-coloring wikiPageID "4925201".
- Fox_n-coloring wikiPageRevisionID "580749372".
- Fox_n-coloring hasPhotoCollection Fox_n-coloring.
- Fox_n-coloring subject Category:Knot_theory.
- Fox_n-coloring comment "In the mathematical field of knot theory, Fox n-coloring is a method of specifying a representation of a knot group (or a link group) onto the dihedral group of order n where n is an odd integer by coloring arcs in a link diagram (the representation itself is also often called a Fox n-coloring).".
- Fox_n-coloring label "Fox n-coloring".
- Fox_n-coloring sameAs m.0cvgxh.
- Fox_n-coloring sameAs Q8565232.
- Fox_n-coloring sameAs Q8565232.
- Fox_n-coloring wasDerivedFrom Fox_n-coloring?oldid=580749372.
- Fox_n-coloring depiction Trefoil_tricolorings.svg.
- Fox_n-coloring isPrimaryTopicOf Fox_n-coloring.