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Invertible Knot


An invertible knot is a knot that can be deformed via an ambient isotopy into itself but with the orientation reversed. A knot that is not invertible is said to be noninvertible.

Knots on ten and fewer crossing can be tested in the Wolfram Language to see if they are invertible using the command KnotData[knot, "Invertible"].

Fox (1962, Problem 10, p. 169) pointed out several knots belonging to the standard table that seemed to be noninvertible. However, no noninvertible knots were proven to exist until Trotter (1964) discovered an infinite family, the smallest of which had 15 crossings.

NoninvertibleKnot

Three prime knots on 9 or fewer crossings are noninvertible: 8_(17), 9_(32), and 9_(33) (Cromwell 2004, pp. 297-299). Some noninvertible knots can be obtained in the Wolfram Language as KnotData["Noninvertible"]. The simplest noninvertible knot is (illustrated above) was first postulated to be noninvertible by Fox (1962; Whitten 1972).

The following table gives the numbers of noninvertible and invertible knots of n crossings.

typeOEIScounts
noninvertibleA0524030, 0, 0, 0, 0, 0, 0, 1, 2, 33, 187, 1144, 6919, 38118, 226581, 1309875, ...
invertibleA0524020, 0, 1, 1, 2, 3, 7, 20, 47, 132, 365, 1032, 3069, 8854, 26712, 78830, ...

No general technique is known for determining if a knot is invertible. Burde and Zieschang (1985) give a tabulation from which it is possible to extract the noninvertible knots up to 10 crossings.


See also

Amphichiral Knot, Invertible Link

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References

Burde, G. and Zieschang, H. Knots, 2nd rev.ed. Berlin: de Gruyter, 2002.Cromwell, P. Knots and Links. Cambridge, England: Cambridge University Press, 2004.Fox, R. H. "A Quick Trip Through Knot Theory." In Topology of 3-Manifolds and Related Topics. Proc. The Univ. of Georgia Institute, 1961. Englewood Cliffs, NJ: Prentice-Hall, pp. 120-167, 1962.Hoste, J.; Thistlethwaite, M.; and Weeks, J. "The First 1701936 Knots." Math. Intell. 20, 33-48, Fall 1998.Sloane, N. J. A. Sequences A052402 and A052403 in "The On-Line Encyclopedia of Integer Sequences."Trotter, H. F. "Noninvertible Knots Exist." Topology 2, 275-280, 1964.Whitten, W. "Surgically Transforming Links into Noninvertible Knots." Amer. J. Math. 94, 1269-1281, 1972.

Referenced on Wolfram|Alpha

Invertible Knot

Cite this as:

Weisstein, Eric W. "Invertible Knot." From MathWorld--A Wolfram Web Resource. https://mathworld.wolfram.com/InvertibleKnot.html

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