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May 2009 p-Coloring Classes of Torus Knots
Anna-Lisa Breiland, Layla Oesper, Laura Taalman
Missouri J. Math. Sci. 21(2): 120-126 (May 2009). DOI: 10.35834/mjms/1316027244

Abstract

We classify by elementary methods the $p$-colorability of torus knots, and prove that every $p$-colorable torus knot has exactly one nontrivial $p$-coloring class. As a consequence, we note that the two-fold branched cyclic cover of a torus knot complement has cyclic first homology group.

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Anna-Lisa Breiland. Layla Oesper. Laura Taalman. "p-Coloring Classes of Torus Knots." Missouri J. Math. Sci. 21 (2) 120 - 126, May 2009. https://doi.org/10.35834/mjms/1316027244

Information

Published: May 2009
First available in Project Euclid: 14 September 2011

zbMATH: 1175.57011
MathSciNet: MR2529014
Digital Object Identifier: 10.35834/mjms/1316027244

Subjects:
Primary: 57M27
Secondary: 05C15

Rights: Copyright © 2009 Central Missouri State University, Department of Mathematics and Computer Science

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Vol.21 • No. 2 • May 2009
University of Central Missouri, School of Computer Science and Mathematics
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