Knot operation
In knot theory, a knot move or operation is a change or changes which preserve crossing number.[1] Operations are used to investigate whether knots are equivalent, prime or reduced.
Knot moves or operations include the flype, Habiro move, Markov moves (I. conjugation and II. stabilization), pass move, Perko move, and Reidemeister moves (I. twist move, II. poke move, and III. slide move).[1]
See also
- Knot sum
- Murasugi sum
- Mutation (knot theory)
References
- ^ a b Weisstein, Eric W. "Knot Move". MathWorld.
- v
- t
- e
Knot theory (knots and links)
- Figure-eight (41)
- Three-twist (52)
- Stevedore (61)
- 62
- 63
- Endless (74)
- Carrick mat (818)
- Perko pair (10161)
- Conway knot (11n34)
- Kinoshita–Terasaka knot (11n42)
- (−2,3,7) pretzel (12n242)
- Whitehead (52
1) - Borromean rings (63
2) - L10a140
- Composite knots
- Granny
- Square
- Knot sum
and operations
- Alexander–Briggs notation
- Conway notation
- Dowker–Thistlethwaite notation
- Flype
- Mutation
- Reidemeister move
- Skein relation
- Tabulation
- Category
- Commons
This knot theory-related article is a stub. You can help Wikipedia by expanding it. |
- v
- t
- e