# Montesinos-Nakanishi conjecture

From Encyclopedia of Mathematics

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Any link can be reduced to a trivial link by a sequence of $3$-moves (that is, tangle moves which add three half-twists into two parallel arcs of a link).

The conjecture has been proved for links up to $12$ crossings, $4$-bridge links and five-braid links except one family represented by the square of the centre of the $5$-braid group. This link, which can be reduced by $3$-moves to a $20$-crossings link, is the smallest known link for which the conjecture is open (as of 2001).

The conjecture has its stronger version that any $n$-tangle can be reduced by $3$-moves to one of $g(n)$ $n$-tangles (with possible additional trivial components), where $g(n)=\prod_{i=1}^{n-1}(3^i+1)$.

#### References

[a1] | R. Kirby, "Problems in low-dimensional topology" W. Kazez (ed.) , Geometric Topology (Proc. Georgia Internat. Topol. Conf. 1993) , Stud. Adv. Math. , 2:2 , Amer. Math. Soc. /IP (1997) pp. 35–473 Zbl 0888.57014 |

[a2] | Q. Chen, "The $3$-move conjecture for $5$-braids" , Knots in Hellas '98 (Proc. Internat. Conf. Knot Theory and Its Ramifications , Knots and Everything , 24 (2000) pp. 36–47 Zbl 0973.57003 |

[a3] | J.H. Przytycki, T. Tsukamoto, "The fourth skein module and the Montesinos–Nakanishi conjecture for $3$-algebraic links" J. Knot Th. Ramifications , 10 (2001) pp.959–982 DOI 10.1142/S0218216501001281 Zbl 1001.57029 |

[a4] | H.R. Morton, "Problems" J.S. Birman (ed.) A. Libgober (ed.) , Braids (Santa Cruz, 1986) , Contemp. Math. , 78 , Amer. Math. Soc. (1988) pp. 557–574 Zbl 0968.57004 |

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Montesinos–Nakanishi conjecture.

*Encyclopedia of Mathematics.*URL: http://encyclopediaofmath.org/index.php?title=Montesinos%E2%80%93Nakanishi_conjecture&oldid=22824