In the mathematical area of knot theory, the unknotting number of a knot is the minimum number of times the knot must be passed through itself (crossing switch) to untie it. If a knot has unknotting number , then there exists a diagram of the knot which can be changed to unknot by switching crossings.[1] The unknotting number of a knot is always less than half of its crossing number.[2] This invariant was first defined by Hilmar Wendt in 1936.[3]
Trefoil knot without 3-fold symmetry being unknotted by one crossing switch.Whitehead link being unknotted by undoing one crossing
Any composite knot has unknotting number at least two, and therefore every knot with unknotting number one is a prime knot. The following table show the unknotting numbers for the first few knots:
In general, it is relatively difficult to determine the unknotting number of a given knot. Known cases include:
The unknotting number of a nontrivial twist knot is always equal to one.
The unknotting number of a -torus knot is equal to .[4]
The unknotting numbers of prime knots with nine or fewer crossings have all been determined.[5] (The unknotting number of the 1011 prime knot is unknown.)
^Adams, Colin Conrad (2004). The knot book: an elementary introduction to the mathematical theory of knots. Providence, Rhode Island: American Mathematical Society. p. 56. ISBN0-8218-3678-1.
^Taniyama, Kouki (2009), "Unknotting numbers of diagrams of a given nontrivial knot are unbounded", Journal of Knot Theory and its Ramifications, 18 (8): 1049–1063, arXiv:0805.3174, doi:10.1142/S0218216509007361, MR 2554334.
^Wendt, Hilmar (December 1937). "Die gordische Auflösung von Knoten". Mathematische Zeitschrift. 42 (1): 680–696. doi:10.1007/BF01160103.
unknotting, number, mathematical, area, knot, theory, unknotting, number, knot, minimum, number, times, knot, must, passed, through, itself, crossing, switch, untie, knot, unknotting, number, displaystyle, then, there, exists, diagram, knot, which, changed, un. In the mathematical area of knot theory the unknotting number of a knot is the minimum number of times the knot must be passed through itself crossing switch to untie it If a knot has unknotting number n displaystyle n then there exists a diagram of the knot which can be changed to unknot by switching n displaystyle n crossings 1 The unknotting number of a knot is always less than half of its crossing number 2 This invariant was first defined by Hilmar Wendt in 1936 3 Trefoil knot without 3 fold symmetry being unknotted by one crossing switch Whitehead link being unknotted by undoing one crossingAny composite knot has unknotting number at least two and therefore every knot with unknotting number one is a prime knot The following table show the unknotting numbers for the first few knots Trefoil knot unknotting number 1 Figure eight knot unknotting number 1 Cinquefoil knot unknotting number 2 Three twist knot unknotting number 1 Stevedore knot unknotting number 1 6 knot unknotting number 1 6 knot unknotting number 1 7 knot unknotting number 3In general it is relatively difficult to determine the unknotting number of a given knot Known cases include The unknotting number of a nontrivial twist knot is always equal to one The unknotting number of a p q displaystyle p q torus knot is equal to p 1 q 1 2 displaystyle p 1 q 1 2 4 The unknotting numbers of prime knots with nine or fewer crossings have all been determined 5 The unknotting number of the 1011 prime knot is unknown Contents 1 Other numerical knot invariants 2 See also 3 References 4 External linksOther numerical knot invariants EditCrossing number Bridge number Linking number Stick numberSee also EditUnknotting problemReferences Edit Adams Colin Conrad 2004 The knot book an elementary introduction to the mathematical theory of knots Providence Rhode Island American Mathematical Society p 56 ISBN 0 8218 3678 1 Taniyama Kouki 2009 Unknotting numbers of diagrams of a given nontrivial knot are unbounded Journal of Knot Theory and its Ramifications 18 8 1049 1063 arXiv 0805 3174 doi 10 1142 S0218216509007361 MR 2554334 Wendt Hilmar December 1937 Die gordische Auflosung von Knoten Mathematische Zeitschrift 42 1 680 696 doi 10 1007 BF01160103 Torus Knot Mathworld Wolfram com 1 2 p 1 q 1 displaystyle frac 1 2 p 1 q 1 Weisstein Eric W Unknotting Number MathWorld External links Edit Three Dimensional Invariants Unknotting Number The Knot Atlas This knot theory related article is a stub You can help Wikipedia by expanding it vte Retrieved from https en wikipedia org w index php title Unknotting number amp oldid 1162187885, wikipedia, wiki, book, books, library,
