Unlink

Updated on Oct 05, 2024

Edit

Comment

Common name Circle Linking no. 0 Unknotting no. 0		Crossing no. 0 Stick no. 6 A-B notation 021

In the mathematical field of knot theory, the unlink is a link that is equivalent (under ambient isotopy) to finitely many disjoint circles in the plane.

Properties

An n-component link L ⊂ S³ is an unlink if and only if there exists n disjointly embedded discs D_i ⊂ S³ such that L = ∪_i∂D_i.

A link with one component is an unlink if and only if it is the unknot.

The link group of an n-component unlink is the free group on n generators, and is used in classifying Brunnian links.

Examples

The Hopf link is a simple example of a link with two components that is not an unlink.

The Borromean rings form a link with three components that is not an unlink; however, any two of the rings considered on their own do form a two-component unlink.

Kanenobu has shown that for all n > 1 there exists a hyperbolic link of n components such that any proper sublink is an unlink (a Brunnian link). The Whitehead link and Borromean rings are such examples for n = 2, 3.

References

Unlink Wikipedia

(Text) CC BY-SA

Contents

Properties

Examples

References