Difference between revisions of "Rational tangles"
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A family of $2$-tangles (cf. [[Tangle|Tangle]]) classified by J.H. Conway. The $2$-tangle of Fig.a1 is called a rational tangle with Conway notation $T ( a _ { 1 } , \dots , a _ { n } )$. It is a rational $p / q$-tangle if | A family of $2$-tangles (cf. [[Tangle|Tangle]]) classified by J.H. Conway. The $2$-tangle of Fig.a1 is called a rational tangle with Conway notation $T ( a _ { 1 } , \dots , a _ { n } )$. It is a rational $p / q$-tangle if | ||
Revision as of 17:45, 1 July 2020
A family of $2$-tangles (cf. Tangle) classified by J.H. Conway. The $2$-tangle of Fig.a1 is called a rational tangle with Conway notation $T ( a _ { 1 } , \dots , a _ { n } )$. It is a rational $p / q$-tangle if
\begin{equation*} \frac { p } { q } = a _ { n } + \frac { 1 } { a _ { n - 1} + \ldots + \frac { 1 } { a_ { 1 } } }. \end{equation*}
The fraction $p / q$ is called the slope of the tangle and can be identified with the slope of the meridian disc of the solid torus that is the branched double covering of the rational tangle.
Figure: r130030a
Figure: r130030b
Conway proved that two rational tangles are ambient isotopic (with boundary fixed) if and only if their slopes are equal. A rational $n$-tangle (also called an $n$-bridge $n$-tangle) is an $n$-tangle that can be obtained from the identity tangle by a finite number of additions of a single crossing.
References
| [a1] | J.H. Conway, "An enumeration of knots and links" J. Leech (ed.) , Computational Problems in Abstract Algebra , Pergamon Press (1969) pp. 329–358 |
| [a2] | A. Kawauchi, "A survey of knot theory" , Birkhäuser (1996) |
Rational tangles. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Rational_tangles&oldid=49883