Beres, Steven; Coufal, Vesta; Hlavacek, Kaia; Kearney, M. Kate; Lattanzi, Ryan; Olson, Hayley; Pereira, Joel; Strub, Bryan A classification of Klein links as torus links. (English) Zbl 1387.57004 Involve 11, No. 4, 609-624 (2018). Summary: 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. Cited in 1 Document MSC: 57M25 Knots and links in the \(3\)-sphere (MSC2010) Keywords:knot theory; torus links; Klein links PDF BibTeX XML Cite \textit{S. Beres} et al., Involve 11, No. 4, 609--624 (2018; Zbl 1387.57004) Full Text: DOI OpenURL References: [1] 10.2140/involve.2016.9.347 · Zbl 1337.57006 [2] ; Bush, Rose-Hulman Undergrad. Math J., 15, 73 (2014) [3] ; Catalano, Proceedings of the Midstates Conference for Undergraduate Research in Computer Science and Mathematics at Wittenberg University, 10 (2010) [4] ; Freund, Rose-Hulman Undergrad. Math J., 14, 71 (2013) [5] ; Livingston, Knot theory. Carus Mathematical Monographs, 24 (1993) [6] ; Shepherd, Proceedings of the Midstates Conference for Undergraduate Research in Computer Science and Mathematics at Ohio Wesleyan University, 38 (2012) This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.