论文信息 - THE 2-BRIDGE KNOTS OF UP TO 16 CROSSINGS

THE 2-BRIDGE KNOTS OF UP TO 16 CROSSINGS

For any given number of crossings c, there exists a formula to determine the number of 2-bridge knots of c crossings, and indeed it is a simple matter to actually construct presentations of these knots. However, the determination of whether a given (prime) knot is a 2-bridge knot remains a nontrivial exercise, and we have no procedure to determine bridge numbers more generally. Herein, we identify the 2-bridge knots within the Hoste–Thistlethwaite–Weeks tables of prime knots of up to 16 crossings by an exhaustive search of a larger set of 2-bridge knots. As the unknot is the only knot with bridge number 1, this yields a lower bound of 3 for the bridge numbers of the remaining knots.

D. D. Wit

[1] D. D. Wit,et al. Where the Links--Gould invariant first fails to distinguish nonmutant prime knots , 2005, math/0501224.

[2] Atsushi Ishii. Algebraic links and skein relations of the Links-Gould invariant , 2004 .

[3] L. Kauffman,et al. On the classification of rational tangles , 2003, Adv. Appl. Math..

[4] Louis H. Kauffman,et al. On the Classification of Rational Knots , 2002, math/0212011.

[5] Mitsuyuki Ochiai,et al. Computer aided Knot theory using mathematica and mathlink , 2002 .

[6] D. D. Wit. Automatic Evaluation of the Links–Gould Invariant for all Prime Knots of up to 10 Crossings , 1999, math/9906059.

[7] L. Kauffman,et al. On the Links–Gould Invariant of Links , 1998, math/9811128.

[8] J. Weeks,et al. The first 1,701,936 knots , 1998 .

[9] Ronald C. Read,et al. The knot book: An elementary introduction to the mathematical theory of knots , 1997, Complex..

[10] C. Adams. Tales of Topology. (Book Reviews: The Knot Book. An Elementary Introduction to the Mathematical Theory of Knots.) , 1994 .

[11] D. Sumners,et al. The growth of the number of prime knots , 1987, Mathematical Proceedings of the Cambridge Philosophical Society.

[12] S. Lambropoulou,et al. Classifying and Applying Rational Knots and Rational Tangles , 2002 .

[13] Akio Kawauchi,et al. A Survey of Knot Theory , 1996 .