Perko pair
Perko pair | |
---|---|
Arf invariant | 1 |
Braid length | 10 |
Braid no. | 3 |
Bridge no. | 3 |
Crosscap no. | 2 |
Crossing no. | 10 |
Genus | 3 |
Hyperbolic volume | 5.63877 |
Unknotting no. | 3 |
Conway notation | [3:-20:-20] |
A-B notation | 10161/10162 |
Dowker notation | 4, 12, -16, 14, -18, 2, 8, -20, -10, -6 |
Last /Next | 10160 / 10162 |
Other | |
hyperbolic, fibered, prime, reversible |
In the mathematical theory of knots, the Perko pair, named after Kenneth Perko, is a pair of entries in classical knot tables that actually represent the same knot. In Rolfsen's knot table, this supposed pair of distinct knots is labeled 10161 and 10162. In 1973, while working to complete the Tait–Little knot tables of knots up to 10 crossings (dating from the late 19th century), Perko found the duplication in C. N. Little's table. This duplication had been missed by John Horton Conway several years before in his knot table and subsequently found its way into Rolfsen's table. The Perko pair gives a counterexample to a "theorem" claimed by Little in 1900 that the writhe of a reduced diagram of a knot is an invariant, as the two diagrams for the pair have different writhes.
In some later knot tables, the knots have been renumbered slightly (knots 10163 to 10166 are renumbered as 10162 to 10165) so that knots 10161 and 10162 are different. Some authors have mistaken these two renumbered knots for the Perko pair and claimed incorrectly that they are the same.
References
- C.N. Little, Non-alternating +/- knots, Trans. Roy. Soc. Edinburgh 39 (1900), page 774
- Kenneth A. Perko Jr.(b.1943), On the classification of knots. Proc. Amer. Math. Soc. 45 (1974), 262—266.
- Dale Rolfsen, Knots and Links (see Appendix C for the knot table), 1976, ISBN 0-914098-16-0
External links
- "10_161", The Knot Atlas.
- The Revenge of the Perko Pair. Richard Elwes points out a common mistake in describing the Perko pair.
- Pictures of the equivalence between the two knots
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- 1 Arf invariant knots and links
- 10 braid length knots and links
- 3 braid number knots and links
- 3 bridge number knots and links
- 2 crosscap number knots and links
- 10 crossing number knots and links
- 3 genus knots and links
- 3 unknotting number knots and links
- Non-alternating knots and links
- Hyperbolic knots and links
- Fibered knots and links
- Prime knots
- Reversible knots and links
- Non-tricolorable knots and links
- Knot theory stubs