A classification of Klein links as torus links

Beres, Steven; Coufal, Vesta; Hlavacek, Kaia; Kearney, M. Kate; Lattanzi, Ryan; Olson, Hayley; Pereira, Joel; Strub, Bryan

doi:10.2140/involve.2018.11.609

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A classification of Klein links as torus links

Steven Beres, Vesta Coufal, Kaia Hlavacek, M. Kate Kearney, Ryan Lattanzi, Hayley Olson, Joel Pereira and Bryan Strub

Vol. 11 (2018), No. 4, 609–624

DOI: 10.2140/involve.2018.11.609

Abstract

We classify Klein links. In particular, we calculate the number and types of components in a $K_{p, q}$ Klein link. We completely determine which Klein links are equivalent to a torus link, and which are not.

Keywords

knot theory, torus links, Klein links

Mathematical Subject Classification 2010

Primary: 57M25

Milestones

Received: 1 November 2016

Revised: 9 August 2017

Accepted: 16 August 2017

Published: 15 January 2018

Communicated by Kenneth S. Berenhaut

Authors

Steven Beres
Gonzaga University Spokane, WA United States

Vesta Coufal
Department of Mathematics Gonzaga University Spokane, WA United States

Kaia Hlavacek
Department of Mathematics Gonzaga University Spokane, WA United States

M. Kate Kearney
Department of Mathematics Gonzaga University Spokane, WA United States

Ryan Lattanzi
Gonzaga University Spokane, WA United States

Hayley Olson
Gonzaga University Spokane, WA United States

Joel Pereira
Department of Mathematics Drexel University Philadelphia, PA United States

Bryan Strub
Gonzaga University Spokane, WA United States

Vol. 11, No. 4, 2018