Threading knot diagrams

H. R. Morton

doi:10.1017/S0305004100064161

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Alexander [1] showed that an oriented link K in S3 can always be represented as a closed braid. Later Markov [5] described (without full details) how any two such representations of K are related. In her book [3], Birman gives an extensive description, with a detailed combinatorial proof of both these results.

References

REFERENCES

[1]Alexander, J. W.. A lemma on systems of knotted curves. Proc. Nat. Acad. Sci. U.S.A. 9 (1923), 93–95.CrossRef Google Scholar PubMed

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[3]Birman, J. S.. Braids, Links and Mapping Class Groups. Ann. of Math. Stud. 82 (1974).Google Scholar

[4]Jones, V. F. R.. A polynomial invariant for knots via von Neumann algebras. Bull. Amer. Math. Soc. 12 (1985), 103–111.CrossRef Google Scholar

[5]Markov, A. A.. Über die freie Äquivalenz geschlossener Zöpfe. Recueil Mathématique Moscou 1 (1935), 73–78.Google Scholar

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[7]Rudolph, L.. Special positions for surfaces bounded by closed braids. Preprint 1984, Box 251, Adamsville, Rhode Island.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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Harpe, P. 1988. Fractals, Quasicrystals, Chaos, Knots and Algebraic Quantum Mechanics. p. 233.

Birman, Joan S. and Menasco, William W. 1990. Studying links via closed braids IV: composite links and split links. Inventiones Mathematicae, Vol. 102, Issue. 1, p. 115.

Vogel, Pierre 1990. Representation of links by braids: A new algorithm. Commentarii Mathematici Helvetici, Vol. 65, Issue. 1, p. 104.

Sossinsky, A. B. 1992. Quantum Groups. Vol. 1510, Issue. , p. 354.

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Курлин, Виталий Александрович and Kurlin, Vitalii Alecsandrovich 1999. Редукция оснащенных зацеплений к обычным. Успехи математических наук, Vol. 54, Issue. 4, p. 177.

BIRMAN, JOAN S. and MENASCO, WILLIAM W. 2002. ON MARKOV'S THEOREM. Journal of Knot Theory and Its Ramifications, Vol. 11, Issue. 03, p. 295.

Stoimenow, A. 2002. On the crossing number of positive knots and braids and braid index criteria of Jones and Morton-Williams-Franks. Transactions of the American Mathematical Society, Vol. 354, Issue. 10, p. 3927.

Manturov, V.O. 2002. A Combinatorial Representation of Links by Quasitoric Braids. European Journal of Combinatorics, Vol. 23, Issue. 2, p. 207.

OREVKOV, S. YU. and SHEVCHISHIN, V. V. 2003. MARKOV THEOREM FOR TRANSVERSAL LINKS. Journal of Knot Theory and Its Ramifications, Vol. 12, Issue. 07, p. 905.

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Birman, Joan S and Menasco, William W 2006. Stabilization in the braid groups I: MTWS. Geometry & Topology, Vol. 10, Issue. 1, p. 413.

KAUFFMAN, LOUIS H. and LAMBROPOULOU, SOFIA 2006. VIRTUAL BRAIDS AND THE L-MOVE. Journal of Knot Theory and Its Ramifications, Vol. 15, Issue. 06, p. 773.

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