Fibered knot

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A knot or link $K$ in the 3-dimensional sphere $S 3$ is called fibered (sometimes spelled fibred) in case there is a 1-parameter family $F t$ of Seifert surfaces for $K$ , where the parameter $t$ runs through the points of the unit circle $S 1$ , such that if $s$ is not equal to $t$ then the intersection of $F s$ and $F t$ is exactly $K$ .

For example:

The unknot, trefoil knot, and figure-eight knot are fibered knots.

The Hopf link is a fibered link.

Fibered knots and links arise naturally, but not exclusively, in complex algebraic geometry. For instance, each singular point of a complex plane curve can be described topologically as the cone on a fibered knot or link called the link of the singularity. The trefoil knot is the link of the cusp singularity $z 2 + w 3$ ; the Hopf link (oriented correctly) is the link of the node singularity $z 2 + w 2$ . In these cases, the family of Seifert surfaces is an aspect of the Milnor fibration of the singularity.

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Category: Knot theory

Fibered knot

From Wikipedia, the free encyclopedia

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