Computer aided knot theory using Mathematica and MathLink We introduce a computer tool called Knot2000 (K2K) which was developed for the purpose of supporting research in knot theory. K2K is a package on Mathematica which consists of 19 functions and it has already been opened to the public with other external programs and data files. In this paper, we will describe, focusing on the usage of each function and some examples, effective ways to use K2K, and show its availability.
Keywords for this software
References in zbMATH (referenced in 6 articles )
Showing results 1 to 6 of 6.
- Jablan, Slavik V.; Sazdanovic, Radmila: From Conway notation to LinKnot (2016)
- Rohwer, C. M.; Müller-Nedebock, K. K.: Operator formalism for topology-conserving crossing dynamics in planar knot diagrams (2015)
- Ochiai, Mitsuyuki; Morimura, Noriko: Base-tangle decompositions of $n$-string tangles with $1< n< 10$ (2008)
- de Wit, David: The 2-bridge knots of up to 16 crossings (2007)
- de Wit, David; Links, Jon: Where the Links-Gould invariant first fails to distinguish nonmutant prime knots (2007)
- Imafuji, Noriko; Ochiai, Mitsuyuki: Computer aided knot theory using Mathematica and MathLink (2002)