Knot (mathematics)

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Knot (mathematics)

In mathematics

Mathematics

Mathematics is the study of quantity, structure, space, change, and related topics of pattern and form. Mathematicians seek out patterns whether found in numbers, space, natural science, computers, imaginary abstractions, or elsewhere....
, a knot is an embedding

Embedding

In mathematics, an embedding is one instance of some mathematical structure contained within another instance, such as a group that is a subgroup....
of a circle

Circle

A circle is a simple shape of Euclidean geometry consisting of those point in a plane which are the same distance from a given point called the center....
in 3-dimensional Euclidean space

Euclidean space

Around 300 Before Christ, the Ancient Greece mathematician Euclid undertook a study of relationships among distances and angles, first in a plane and then in space....
, R³, considered up to continuous deformations (isotopies

Homotopy

In topology, two continuous function Function from one topological space to another are called homotopic if one can be "continuously deformed" into the other, such a deformation being called a homotopy between the two functions....
). A crucial difference between the standard mathematical and conventional notions of a knot

Knot

A knot is a method for fastening or securing linear material such as rope by tying or interweaving. It may consist of a length of one or more segments of rope, string, webbing, twine, strap, or even chain interwoven such that the line can bind to itself or to some other object?the "load"....
is that mathematical knots are closed—there are no ends to tie or untie on a mathematical knot. Physical properties such as friction and thickness also do not apply, although there are mathematical definitions of a knot that take such properties into account.

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Encyclopedia

In mathematics

Mathematics

Embedding

In mathematics, an embedding is one instance of some mathematical structure contained within another instance, such as a group that is a subgroup....
of a circle

Circle

A circle is a simple shape of Euclidean geometry consisting of those point in a plane which are the same distance from a given point called the center....
in 3-dimensional Euclidean space

Euclidean space

Homotopy

Knot

Knot theory

In mathematics, knot theory is the area of topology that studies knot s. While inspired by knots which appear in daily life in shoelaces and rope, a mathematician's knot differs drastically in that the ends are joined together to prevent it from becoming undone....
.

Types of knots

The simplest knot, called the unknot
Unknot

The unknot arises in the knot theory. Intuitively, the unknot is a closed loop of rope without a knot in it. A knot theorist would describe the unknot as an image of any embedding that can be deformed, i.e....
, is a round circle embedded in R³

Euclidean space

Around 300 Before Christ, the Ancient Greece mathematician Euclid undertook a study of relationships among distances and angles, first in a plane and then in space....
. In the ordinary sense of the word, the unknot is not "knotted" at all. The simplest nontrivial knots are the trefoil knot

Trefoil knot

In knot theory, the trefoil knot is the simplest nontrivial knot . It can be obtained by joining the loose ends of an overhand knot. It can be described as a -torus knot, and is the closure of the 2-stranded braid group s1?....
(3₁ in the table), the figure-eight knot

Figure-eight knot (mathematics)

In knot theory, a figure-eight knot is the unique knot with a crossing number of four. This is the smallest possible crossing number except for the unknot and trefoil knot....
(4₁) and the cinquefoil knot

Cinquefoil knot

The cinquefoil knot, also known as Solomon's seal knot, and 51 in most tables, is a -torus knot with five crossings. Its writhe is 5, it is invertible, but not amphichiral knot....
(5₁).

Several knots, possibly tangled together, are called links

Link (knot theory)

In mathematics, a link is a collection of knot s which do not intersect, but which may be linked together. A knot can be described as a link with one component....
. Knots are links with a single component.

Often mathematicians prefer to consider knots embedded into the 3-sphere

3-sphere

In mathematics, a '3-sphere' is a higher-dimensional analogue of a sphere. It consists of the set of points equidistant from a fixed central point in 4-dimensional Euclidean space....
, S³, rather than R³ since the 3-sphere is compact

Compact space

In mathematics, a topological space is called compact if each of its open covers has a finite set subcover.Note: Some authors such as Nicolas Bourbaki use the term "quasi-compact" for this instead, and reserve the term "compact" for topological spaces that are both Hausdorff spaces and "quasi-compact"....
. The 3-sphere is equivalent to R³ with a single point added at infinity (see one-point compactification).

A knot is tame if it can be "thickened up", that is, if there exists an extension to an embedding of the solid torus

Solid torus

In mathematics, a solid torus is a topological space homeomorphic to , i.e. the cartesian product of the circle with a two dimensional ball endowed with the product topology....
, , into the 3-sphere. A knot is tame if and only it can be represented as a finite closed polygonal chain

Polygonal chain

A polygonal chain, polygonal curve, polygonal path, or piecewise linear curve, is a connected series of line segments. More formally, a polygonal chain P is a curve specified by a sequence of points called its vertices so that the curve consists of the line segments connecting the consecutive vertices....
. Knots that are not tame are called wild and can have pathological

Pathological (mathematics)

In mathematics, a pathological phenomenon is one whose properties are considered atypically bad or counterintuitive.Often, when the usefulness of a theorem is challenged by counterexamples, defenders of the theorem argue that the exceptions are pathological....
behavior. In knot theory and 3-manifold

3-manifold

In mathematics, a 3-manifold is a 3-dimensional manifold. The topological, piecewise-linear, and smooth categories are all equivalent in three dimensions, so little distinction is usually made in whether we are dealing with say, topological 3-manifolds, or smooth 3-manifolds....
theory, often the adjective "tame" is omitted. Smooth knots, for example, are always tame.

Given a knot in the 3-sphere, the knot complement

Knot complement

In mathematics, the knot complement of a tame knot K is the set-theoretic complement of the interior of the embedding of a solid torus into the 3-sphere....
is all the points of the 3-sphere not contained in the knot. A major theorem of Gordon and Luecke states that at most two knots have homeomorphic complements (the original knot and its mirror reflection). This in effect turns the study of knots into the study of their complements, and in turn into 3-manifold theory.

The JSJ decomposition

JSJ decomposition

In mathematics, the JSJ decomposition, also known as the toral decomposition, is a topological construct given by the following theorem:...
and Thurston's hyperbolization theorem

Geometrization conjecture

Thurston's geometrization conjecture states that compact 3-manifolds can be decomposed into submanifolds that have geometric structures. The geometrization conjecture is an analogue for 3-manifolds of the uniformization theorem for surfaces....
reduces the study of knots in the 3-sphere to the study of various geometric manifolds via splicing or satellite operations.

Satellite knot

In the knot theory, a satellite knot is a knot which contains an incompressible surface, non-boundary parallel torus in its knot complement. The class of satellite knots include prime knot knots, cable knots and Whitehead doubles....
In the pictured knot, the JSJ-decomposition splits the complement into the union of three manifolds: two trefoil complements

Trefoil knot

Borromean rings

In mathematics, the Borromean rings consist of three topological circles which are link ed and form a Brunnian link, i.e., removing any ring results in two unlinked rings....
. The trefoil complement has the geometry of , while the Borromean rings complement has the geometry of .

Knots, more generally speaking

In contemporary mathematics the term knot is sometimes used to describe a more general phenomena related to embeddings. Given a manifold with a submanifold , one sometimes says can be knotted in if there exists an embedding of in which is not isotopic to . Traditional knots form the case where and .

The Schoenflies theorem states that the circle does not knot in the 2-sphere -- every circle in the 2-sphere is isotopic to the standard circle. Alexander's theorem states that the 2-sphere does not smoothly (or PL or tame topologically) knot in the 3-sphere. In the tame topological category, it's known that the -sphere does not knot in the -sphere for all . This is a theorem of Brown and Mazur. The Alexander horned sphere

Alexander horned sphere

The Alexander horned sphere is one of the most famous pathological s in mathematics discovered in 1924 by James Waddell Alexander II. It is the particular embedding of a sphere in 3-dimensional Euclidean space obtained by the following construction, starting with a standard torus:...
is an example of a knotted 2-sphere in the 3-sphere which is not tame. In the smooth category, the -sphere is known not to knot in the -sphere provided . The case is a long-outstanding problem closely related to the question: does the 4-ball admit an exotic smooth structure

Exotic sphere

In mathematics, an exotic sphere is a differentiable manifold that is homeomorphic to the standard Euclidean n-sphere, but not diffeomorphic....
?

Haefliger

André Haefliger

Andr? Haefliger is a Swiss mathematician who works primarily on topology.He studied mathematics in Lausanne. He received his PhD in 1958 from the Universit?t Stra?burg under the supervision of Charles Ehresmann with "Structures feuillet?es et cohomologie ? valeurs dans un faisceau de groupoides"....
proved that there are no smooth j-dimensional knots in provided , and gave further examples of knotted spheres for all such that . is called the codimension

Codimension

In mathematics, codimension is a basic geometric idea that applies to subspaces in vector spaces, and more generally to submanifolds in manifolds, and suitable subsets of algebraic varieties....
of the knot. An interesting aspect of Haefliger's work is that the isotopy classes of embeddings of in form a group, with group operation given by the connect sum, provided the co-dimension is greater than two. Haefliger based his work on Smale's h-cobordism theorem. One of Smale's theorems is that when one deals with knots in co-dimension greater than two, even inequivalent knots have diffeomorphic complements. This gives the subject a different flavour than co-dimension 2 knot theory. If one allows topological or PL-isotopies, Zeeman proved that spheres do not knot when the co-dimension is larger than two.

Knot (mathematics)

Types of knots

Knots, more generally speaking

See also

Further reading

External links