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| [[Image:Trefoil knot arb.png|thumb|A three-dimensional depiction of a thickened [[trefoil knot]], the simplest non-[[trivial knot]]]]
| | == Peignoir Ralph Lauren HommePolo Homme A Vendre == |
| [[Image:TrefoilKnot 01.svg|thumb|A knot diagram of the trefoil knot]]
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| In [[topology]], '''knot theory''' is the study of [[knot (mathematics)|mathematical knot]]s. While inspired by knots which appear in daily life in shoelaces and rope, a mathematician's knot differs in that the ends are joined together so that it cannot be undone. In mathematical language, a knot is an [[embedding]] of a [[circle]] in 3-dimensional [[Euclidean space]], '''R'''<sup>3</sup> (Note that since we're using topology the concept of circle isn't bound only to the classical geometric concept, but to all of its [[homeomorphism]]s). Two mathematical knots are equivalent if one can be transformed into the other via a deformation of '''R'''<sup>3</sup> upon itself (known as an [[ambient isotopy]]); these transformations correspond to manipulations of a knotted string that do not involve cutting the string or passing the string through itself.
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| Knots can be described in various ways. Given a method of description, however, there may be more than one description that represents the same knot. For example, a common method of describing a knot is a planar diagram called a knot diagram. Any given knot can be drawn in many different ways using a knot diagram. Therefore, a fundamental problem in knot theory is determining when two descriptions represent the same knot.
| | == Ralph Lauren Big Pony 2 == |
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| A complete algorithmic solution to this problem exists, which has unknown [[computational complexity|complexity]]. In practice, knots are often distinguished by using a ''[[knot invariant]]'', a "quantity" which is the same when computed from different descriptions of a knot. Important invariants include [[knot polynomials]], [[knot group]]s, and hyperbolic invariants.
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| The original motivation for the founders of knot theory was to create a table of knots and [[link (knot theory)|link]]s, which are knots of several components entangled with each other. Over six billion knots and links have been tabulated since the beginnings of knot theory in the 19th century.
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| To gain further insight, mathematicians have generalized the knot concept in several ways. Knots can be considered in other [[3-manifold|three-dimensional spaces]] and objects other than circles can be used; see ''[[knot (mathematics)]]''. Higher dimensional knots are [[n-sphere|''n''-dimensional spheres]] in ''m''-dimensional Euclidean space.
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| ==History== | | == Doudoune Ralph Lauren Pas Cher == |
| {{main|History of knot theory}}
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| [[Image:KellsFol034rXRhoDet3.jpeg|thumb|upright|Intricate Celtic knotwork in the 1200 year old [[Book of Kells]]]]
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| Archaeologists have discovered that knot tying dates back to prehistoric times. Besides their uses such as [[khipu|recording information]] and [[knot tying|tying]] objects together, knots have interested humans for their aesthetics and spiritual symbolism. Knots appear in various forms of Chinese artwork dating from several centuries BC (see [[Chinese knotting]]). The [[endless knot]] appears in [[Tibetan Buddhism]], while the [[Borromean rings]] have made repeated appearances in different cultures, often representing strength in unity. The [[Celtic Christianity|Celtic]] monks who created the [[Book of Kells]] lavished entire pages with intricate [[Celtic knot]]work.
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| A mathematical theory of knots was first developed in 1771 by [[Alexandre-Théophile Vandermonde]] who explicitly noted the importance of topological features when discussing the properties of knots related to the geometry of position. Mathematical studies of knots began in the 19th century with [[Gauss]], who defined the [[linking integral]] {{Harv|Silver|2006}}. In the 1860s, [[Lord Kelvin]]'s theory that [[atoms]] were knots in the [[Luminiferous aether|aether]] led to [[Peter Guthrie Tait]]'s creation of the first knot tables for complete classification. Tait, in 1885, published a table of knots with up to ten crossings, and what came to be known as the [[Tait conjectures]]. This record motivated the early knot theorists, but knot theory eventually became part of the emerging subject of [[topology]].
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| [[Image:Peter Tait.jpg|thumb|left|upright|The first knot tabulator, [[Peter Guthrie Tait]]]]
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| These topologists in the early part of the 20th century—[[Max Dehn]], [[James Waddell Alexander II|J. W. Alexander]], and others—studied knots from the point of view of the [[knot group]] and invariants from [[Homology (mathematics)|homology]] theory such as the [[Alexander polynomial]]. This would be the main approach to knot theory until a series of breakthroughs transformed the subject.
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| In the late 1970s, [[William Thurston]] introduced [[hyperbolic geometry]] into the study of knots with the [[geometrization conjecture|hyperbolization theorem]]. Many knots were shown to be [[hyperbolic knot]]s, enabling the use of geometry in defining new, powerful [[knot invariant]]s. The discovery of the [[Jones polynomial]] by [[Vaughan Jones]] in 1984 {{Harv|Sossinsky|2002|pp=71–89}}, and subsequent contributions from [[Edward Witten]], [[Maxim Kontsevich]], and others, revealed deep connections between knot theory and mathematical methods in [[statistical mechanics]] and [[quantum field theory]]. A plethora of knot invariants have been invented since then, utilizing sophisticated tools such as [[quantum group]]s and [[Floer homology]].
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| In the last several decades of the 20th century, scientists became interested in studying [[physical knot theory|physical knots]] in order to understand knotting phenomena in [[DNA]] and other polymers. Knot theory can be used to determine if a molecule is [[chirality (chemistry)|chiral]] (has a "handedness") or not {{Harv|Simon|1986}}. [[tangle (mathematics)|Tangle]]s, strings with both ends fixed in place, have been effectively used in studying the action of [[topoisomerase]] on DNA {{Harv|Flapan|2000}}. Knot theory may be crucial in the construction of quantum computers, through the model of [[topological quantum computation]] {{Harv|Collins|2006}}.
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| ==Knot equivalence<!--[[Knot equivalence]] redirects directly here.-->==
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| {{double image|right|unknots.svg|180|Ochiai unknot.svg|180|On the left, the unknot, and a knot equivalent to it. It can be more difficult to determine whether complex knots, such as the one on the right, are equivalent to the unknot.}}
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| A knot is created by beginning with a one-[[dimension]]al line segment, wrapping it around itself arbitrarily, and then fusing its two free ends together to form a closed loop {{Harv|Adams|2004}}{{Harv|Sossinsky|2002}}. When topologists consider knots and other entanglements such as [[link (knot theory)|links]] and [[Braid theory|braid]]s, they consider the space surrounding the knot as a viscous fluid. If the knot can be pushed about smoothly in the fluid, without intersecting itself, to coincide with another knot, the two knots are considered equivalent. The idea of '''knot equivalence''' is to give a precise definition of when two knots should be considered the same even when positioned quite differently in space. A formal mathematical definition is that two knots are equivalent if one can be transformed into the other via a type of deformation of '''R'''<sup>3</sup> upon itself, known as an [[ambient isotopy]].
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| The basic problem of knot theory, the '''recognition problem''', is determining the equivalence of two knots. [[Algorithm]]s exist to solve this problem, with the first given by [[Wolfgang Haken]] in the late 1960s {{Harv|Hass|1998}}. Nonetheless, these algorithms can be extremely time-consuming, and a major issue in the theory is to understand how hard this problem really is {{Harv|Hass|1998}}. The special case of recognizing the [[unknot]], called the [[unknotting problem]], is of particular interest {{Harv|Hoste|2005}}.
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| ==Knot diagrams<!--[[Knot diagram]] links directly here, [[MOS:HEAD]]-->==
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| A useful way to visualise and manipulate knots is to project the knot onto a plane—think of the knot casting a shadow on the wall. A small change in the direction of projection will ensure that it is [[Injective function|one-to-one]] except at the double points, called '''''crossings''''', where the "shadow" of the knot crosses itself once transversely {{Harv|Rolfsen|1976}}. At each crossing, to be able to recreate the original knot, the over-strand must be distinguished from the under-strand. This is often done by creating a break in the strand going underneath. The resulting diagram is an [[immersed plane curve]] with the additional data of which strand is over and which is under at each crossing. (These diagrams are called '''knot diagrams''' when they represent a [[Knot (mathematics)|knot]] and '''link diagrams''' when they represent a [[Link (knot theory)|link]].) Analogously, knotted surfaces in 4-space can be related to [[immersed surface]]s in 3-space.
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| A '''reduced diagram''' is a knot diagram in which there are no '''reducible crossings''' (also '''nugatory''' or '''removable crossings'''), or in which all of the reducible crossings have been removed.{{harv|Weisstein||loc=ReducedKnotDiagram}}{{harv|Weisstein||loc=ReducibleCrossing}}
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| ===Reidemeister moves===
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| {{main|Reidemeister move}}
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| In 1927, working with this diagrammatic form of knots, [[James Waddell Alexander II|J. W. Alexander]] and G. B. Briggs, and independently [[Kurt Reidemeister]], demonstrated that two knot diagrams belonging to the same knot can be related by a sequence of three kinds of moves on the diagram, shown below. These operations, now called the '''Reidemeister moves''', are:
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| <ol style="list-style-type:upper-Roman">
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| <li> Twist and untwist in either direction.</li>
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| <li> Move one strand completely over another.</li>
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| <li> Move a strand completely over or under a crossing.</li>
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| </ol>
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| {| align="center" style="text-align:center"
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| |+ '''Reidemeister moves'''
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| |- style="padding:1em"
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| | [[Image:Reidemeister move 1.png|130px|]] [[File:Frame left.png]] || [[Image:Reidemeister move 2.png|210px]]
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| |-
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| | <u>Type I</u> || <u>Type II</u>
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| |- style="padding:1em"
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| | colspan="2" | [[Image:Reidemeister move 3.png|360px]]
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| |-
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| | colspan="2" | <u>Type III</u>
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| |}
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| The proof that diagrams of equivalent knots are connected by Reidemeister moves relies on an analysis of what happens under the planar projection of the movement taking one knot to another. The movement can be arranged so that almost all of the time the projection will be a knot diagram, except at finitely many times when an "event" or "catastrophe" occurs, such as when more than two strands cross at a point or multiple strands become tangent at a point. A close inspection will show that complicated events can be eliminated, leaving only the simplest events: (1) a "kink" forming or being straightened out; (2) two strands becoming tangent at a point and passing through; and (3) three strands crossing at a point. These are precisely the Reidemeister moves {{Harv|Sossinsky|2002| loc=ch. 3}} {{Harv|Lickorish|1997| loc=ch. 1}}.
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| ==Knot invariants==
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| {{main|Knot invariant}}
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| A knot invariant is a "quantity" that is the same for equivalent knots {{Harv|Adams|2004}}{{Harv|Lickorish|1997}}{{Harv|Rolfsen|1976}}. For example, if the invariant is computed from a knot diagram, it should give the same value for two knot diagrams representing equivalent knots. An invariant may take the same value on two different knots, so by itself may be incapable of distinguishing all knots. An elementary invariant is [[tricolorability]].
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| "Classical" knot invariants include the [[knot group]], which is the [[fundamental group]] of the [[knot complement]], and the [[Alexander polynomial]], which can be computed from the Alexander invariant, a module constructed from the infinite cyclic cover of the knot complement {{Harv|Lickorish|1997}}{{Harv|Rolfsen|1976}}. In the late 20th century, invariants such as "quantum" knot polynomials, [[Vassiliev invariant]]s and hyperbolic invariants were discovered. These aforementioned invariants are only the tip of the iceberg of modern knot theory.
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| ===Knot polynomials===
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| {{main|Knot polynomial}}
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| A knot polynomial is a [[knot invariant]] that is a [[polynomial]]. Well-known examples include the [[Jones polynomial|Jones]] and [[Alexander polynomial]]s. A variant of the Alexander polynomial, the [[Alexander–Conway polynomial]], is a polynomial in the variable ''z'' with [[integer]] coefficients {{Harv|Lickorish|1997}}.
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| The Alexander–Conway polynomial is actually defined in terms of [[link (knot theory)|links]], which consist of one or more knots entangled with each other. The concepts explained above for knots, e.g. diagrams and Reidemeister moves, also hold for links.
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| Consider an oriented link diagram, ''i.e.'' one in which every component of the link has a preferred direction indicated by an arrow. For a given crossing of the diagram, let <math>L_+, L_-, L_0</math> be the oriented link diagrams resulting from changing the diagram as indicated in the figure: [[Image:Skein (HOMFLY).svg|200px|center]]
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| Note that the original diagram might be either <math>L_+</math> or <math>L_-</math>, depending on the chosen crossing's configuration. Then the Alexander–Conway polynomial, ''C''(''z''), is recursively defined according to the rules:
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| * ''C''(''O'') = 1 (where O is any diagram of the [[unknot]])
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| * <math>C(L_+) = C(L_-) + z C(L_0).</math>
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| The second rule is what is often referred to as a [[skein relation]]. To check that these rules give an invariant of an oriented link, one should determine that the polynomial does not change under the three Reidemeister moves. Many important knot polynomials can be defined in this way.
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| The following is an example of a typical computation using a skein relation. It computes the Alexander–Conway polynomial of the [[trefoil knot]]. The yellow patches indicate where the relation is applied.
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| :''C''([[Image:skein-relation-trefoil-plus-sm.png]]) = ''C''([[Image:skein-relation-trefoil-minus-sm.png]]) + ''z'' ''C''([[Image:skein-relation-trefoil-zero-sm.png]])
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| gives the unknot and the [[Hopf link]]. Applying the relation to the Hopf link where indicated,
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| :''C''([[Image:skein-relation-link22-plus-sm.png]]) = ''C''([[Image:skein-relation-link22-minus-sm.png]]) + ''z'' ''C''([[Image:skein-relation-link22-zero-sm.png]])
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| gives a link deformable to one with 0 crossings (it is actually the [[unlink]] of two components) and an unknot. The unlink takes a bit of sneakiness:
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| :''C''([[Image:skein-relation-link20-plus-sm.png]]) = ''C''([[Image:skein-relation-link20-minus-sm.png]]) + ''z'' ''C''([[Image:skein-relation-link20-zero-sm.png]])
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| which implies that ''C''(unlink of two components) = 0, since the first two polynomials are of the unknot and thus equal.
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| Putting all this together will show:
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| :''C''(trefoil) = 1 + z (0 + z) = 1 + z<sup>2</sup>.
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| Since the Alexander–Conway polynomial is a knot invariant, this shows that the trefoil is not equivalent to the unknot. So the trefoil really is "knotted".
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| <gallery widths="70px" heights="70px" align="right" perrow="3">
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| Image:Trefoil knot left.svg|The left handed trefoil knot.
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| Image:TrefoilKnot_01.svg|The right handed trefoil knot.
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| </gallery>
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| Actually, there are two trefoil knots, called the right and left-handed trefoils, which are [[chiral knot|mirror images]] of each other (take a diagram of the trefoil given above and change each crossing to the other way to get the mirror image). These are not equivalent to each other, meaning that they are not amphicheiral. This was shown by [[Max Dehn]], before the invention of knot polynomials, using group theoretical methods {{Harv|Dehn|1914}}. But the Alexander–Conway polynomial of each kind of trefoil will be the same, as can be seen by going through the computation above with the mirror image. The ''Jones'' polynomial can in fact distinguish between the left and right-handed trefoil knots {{Harv|Lickorish|1997}}.
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| ===Hyperbolic invariants===
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| [[William Thurston]] proved many knots are [[hyperbolic knot]]s, meaning that the [[knot complement]], i.e. the set of points of 3-space not on the knot, admits a geometric structure, in particular that of [[hyperbolic geometry]]. The hyperbolic structure depends only on the knot so any quantity computed from the hyperbolic structure is then a knot invariant {{Harv|Adams|2004}}.
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| <div style="float: right; margin-left: 1em; "> | |
| <gallery> | |
| Image:BorromeanRings.svg|The [[Borromean rings]] are a link with the property that removing one ring unlinks the others.
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| Image:SnapPea-horocusp_view.png|[[SnapPea]]'s cusp view: the [[Borromean rings]] complement from the perspective of an inhabitant living near the red component.
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| </gallery>
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| </div>
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| Geometry lets us visualize what the inside of a knot or link complement looks like by imagining light rays as traveling along the [[geodesic]]s of the geometry. An example is provided by the picture of the complement of the [[Borromean rings]]. The inhabitant of this link complement is viewing the space from near the red component. The balls in the picture are views of [[horoball]] neighborhoods of the link. By thickening the link in a standard way, the horoball neighborhoods of the link components are obtained. Even though the boundary of a neighborhood is a torus, when viewed from inside the link complement, it looks like a sphere. Each link component shows up as infinitely many spheres (of one color) as there are infinitely many light rays from the observer to the link component. The fundamental parallelogram (which is indicated in the picture), tiles both vertically and horizontally and shows how to extend the pattern of spheres infinitely.
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| This pattern, the horoball pattern, is itself a useful invariant. Other hyperbolic invariants include the shape of the fundamental paralleogram, length of shortest geodesic, and volume. Modern knot and link tabulation efforts have utilized these invariants effectively. Fast computers and clever methods of obtaining these invariants make calculating these invariants, in practice, a simple task {{Harv|Adams|Hildebrand|Weeks|1991}}.
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| ==Higher dimensions==
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| <!--{{Main|Higher dimensional knots}}-->
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| A knot in three dimensions can be untied when placed in four dimensional space. This is done by changing crossings. Suppose one strand is behind another as seen from a chosen point. Lift it into the fourth dimension, so there is no obstacle (the front strand having no component there); then slide it forward, and drop it back, now in front. Analogies for the plane would be lifting a string up off the surface, or removing a dot from inside a circle.<!-- can't really find a source for this...Adams misleadingly doesn't mention the first step. This step more or less follows from very basic, well-known, general position arguments, e.g. the PL-case is essentially contained in Zeeman's paper although not explicitly described. Comment by [[User: C S]] -->
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| In fact, in four dimensions, any non-intersecting closed loop of one-dimensional string is equivalent to an unknot. First "push" the loop into a three-dimensional subspace, which is always possible, though technical to explain.
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| ===Knotting spheres of higher dimension===
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| Since a knot can be considered topologically a 1-dimensional sphere, the next generalization is to consider a [[2-sphere|two dimensional sphere]] embedded in a four dimensional ball. Such an embedding is unknotted if there is a homeomorphism of the 4-sphere onto itself taking the 2-sphere to a standard "round" 2-sphere. [[Suspended knot]]s and [[spun knot]]s are two typical families of such 2-sphere knots.
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| The mathematical technique called "general position" implies that for a given ''n''-sphere in the ''m''-sphere, if ''m'' is large enough (depending on ''n''), the sphere should be unknotted. In general, [[piecewise linear manifold|piecewise-linear]] [[n-sphere|''n-''sphere]]s form knots only in (''n'' + 2)-space {{Harv|Zeeman|1963}}, although this is no longer a requirement for smoothly knotted spheres. In fact, there are smoothly knotted (4''k'' − 1)-spheres in ''6k''-space, e.g. there is a smoothly knotted 3-sphere in the 6-sphere {{Harv|Haefliger|1962}}{{Harv|Levine|1965}}. Thus the codimension of a smooth knot can be arbitrarily large when not fixing the dimension of the knotted sphere; however, any smooth ''k''-sphere in an ''n''-sphere with 2''n'' − 3''k'' − 3 > 0 is unknotted. The notion of a knot has further generalisations in mathematics, see: [[knot (mathematics)]], [[Whitney embedding theorem#Isotopy versions|isotopy classification of embeddings]].
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| Every knot in '''S'''<sup>''n''</sup> is the link of a [[real algebraic set|real-algebraic set]] with isolated singularity in '''R'''<sup>''n''+1</sup> {{Harv|Akbulut|King|1981}}.
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| An n-knot is a single '''S'''<sup>''n''</sup> embedded in '''S'''<sup>''m''</sup>.
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| An n-link is k-copies of '''S'''<sup>''n''</sup> embedded in '''S'''<sup>''m''</sup>, where k is a natural number.
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| Both the m=n+2 case and the m>n+2 case are researched well.
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| The n>1 case has different futures from the n=1 case and is an exciting field. <ref>[http://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.64.4359&rep=rep1&type=pdf A survey of applications of surgery to knot and link theory: J Levine, K Orr - Ann. of Math. Stud, 2000]An introductory article to high dimensional knots and links for the advanced readers</ref>
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| <ref>[http://arxiv.org/pdf/1304.6053v1.pdf arxiv1304.6053 Introduction to high dimensional knots: Eiji Ogasa]An introductory article to high dimensional knots and links for the beginners</ref>
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|
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| ==Adding knots==
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| {{main|Knot sum}}
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| [[Image:Sum of knots3.svg|thumb|Adding two knots]]
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| Two knots can be added by cutting both knots and joining the pairs of ends. The operation is called the '''knot sum''', or sometimes the '''connected sum''' or '''composition''' of two knots. This can be formally defined as follows {{Harv|Adams|2004}}: consider a planar projection of each knot and suppose these projections are disjoint. Find a rectangle in the plane where one pair of opposite sides are arcs along each knot while the rest of the rectangle is disjoint from the knots. Form a new knot by deleting the first pair of opposite sides and adjoining the other pair of opposite sides. The resulting knot is a sum of the original knots. Depending on how this is done, two different knots (but no more) may result. This ambiguity in the sum can be eliminated regarding the knots as ''oriented'', i.e. having a preferred direction of travel along the knot, and requiring the arcs of the knots in the sum are oriented consistently with the oriented boundary of the rectangle.
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| The knot sum of oriented knots is [[commutative]] and [[associative]]. A [[prime knot|knot is ''prime'']] if it is non-trivial and cannot be written as the knot sum of two non-trivial knots. A knot that can be written as such a sum is ''composite''. There is a prime decomposition for knots, analogous to [[prime number|prime]] and composite numbers {{Harv|Schubert|1949}}. For oriented knots, this decomposition is also unique. Higher dimensional knots can also be added but there are some differences. While you cannot form the unknot in three dimensions by adding two non-trivial knots, you can in higher dimensions, at least when one considers ''smooth'' knots in codimension at least 3.
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| ==Tabulating knots==
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| <!-- {{Main|knot tabulation}} more can be said about tabulation.... -->
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| {{see also|List of prime knots|Knot tabulation}}
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| [[Image:Knot table.svg|thumb|350px|A table of prime knots up to seven crossings. The knots are labeled with Alexander–Briggs notation]]
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| Traditionally, knots have been catalogued in terms of [[crossing number (knot theory)|crossing number]]. Knot tables generally include only prime knots, and only one entry for a knot and its mirror image (even if they are different) {{Harv|Hoste|Thistlethwaite|Weeks|1998}}. The number of nontrivial knots of a given crossing number increases rapidly, making tabulation computationally difficult {{Harv|Hoste|2005|p=20}}. Tabulation efforts have succeeded in enumerating over 6 billion knots and links {{Harv|Hoste|2005|p=28}}. The sequence of the number of prime knots of a given crossing number, up to crossing number 16, is 0, 0, 1, 1, 2, 3, 7, 21, 49, 165, 552, 2176, 9988, 46972, 253293, 1388705... {{OEIS|id=A002863}}. While exponential upper and lower bounds for this sequence are known, it has not been proven that this sequence is strictly increasing {{Harv|Adams|2004}}.
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| The first knot tables by Tait, Little, and Kirkman used knot diagrams, although Tait also used a precursor to the [[Dowker notation]]. Different notations have been invented for knots which allow more efficient tabulation {{Harv|Hoste|2005}}.
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| The early tables attempted to list all knots of at most 10 crossings, and all alternating knots of 11 crossings {{Harv|Hoste|Thistlethwaite|Weeks|1998}}. The development of knot theory due to Alexander, Reidemeister, Seifert, and others eased the task of verification and tables of knots up to and including 9 crossings were published by Alexander–Briggs and Reidemeister in the late 1920s.
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| | |
| The first major verification of this work was done in the 1960s by [[John Horton Conway]], who not only developed a new notation but also the [[Alexander–Conway polynomial]] {{Harv|Conway|1970}}{{Harv|Doll|Hoste|1991}}. This verified the list of knots of at most 11 crossings and a new list of links up to 10 crossings. Conway found a number of omissions but only one duplication in the Tait–Little tables; however he missed the duplicates called the [[Perko pair]], which would only be noticed in 1974 by Kenneth Perko {{Harv|Perko|1974}}. This famous error would propagate when Dale Rolfsen added a knot table in his influential text, based on Conway's work.
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| In the late 1990s Hoste, Thistlethwaite, and Weeks tabulated all the knots through 16 crossings {{Harv|Hoste|Thistlethwaite|Weeks|1998}}. In 2003 Rankin, Flint, and Schermann, tabulated the [[alternating knot]]s through 22 crossings {{Harv|Hoste|2005}}.
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| | |
| ===Alexander–Briggs notation===<!--this section is linked to from locations including [[Template:Infobox knot theory]]--> | |
| This is the most traditional notation, due to the 1927 paper of [[James Waddell Alexander II|J. W. Alexander]] and [[Garland Baird Briggs|G. Briggs]] and later extended by Dale Rolfsen in his knot table (see image above and [[List of prime knots]]). The notation simply organizes knots by their crossing number. One writes the crossing number with a subscript to denote its order amongst all knots with that crossing number. This order is arbitrary and so has no special significance (though in each number of crossings the [[twist knot]] comes after the [[torus knot]]). Links are written by the crossing number with a superscript to denote the number of components and a subscript to denote its order within the links with the same number of components and crossings. Thus the trefoil knot is notated 3<sub>1</sub> and the Hopf link is 2{{sup sub|2|1}}.
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| | |
| ===Dowker notation===
| |
| {{main|Dowker notation}}
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| [[Image:Dowker-notation-example.svg|thumb|A knot diagram with crossings labelled for a Dowker sequence]]
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| The Dowker notation, also called the Dowker–Thistlethwaite notation or code, for a knot is a finite sequence of even integers. The numbers are generated by following the knot and marking the crossings with consecutive integers. Since each crossing is visited twice, this creates a pairing of even integers with odd integers. An appropriate sign is given to indicate over and undercrossing. For example, in the figure the knot diagram has crossings labelled with the pairs (1,6) (3,−12) (5,2) (7,8) (9,−4) and (11,−10). The Dowker notation for this labelling is the sequence: 6 −12 2 8 −4 −10. A knot diagram has more than one possible Dowker notation, and there is a well-understood ambiguity when reconstructing a knot from a Dowker notation.
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| | |
| ===Conway notation===
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| {{main|Conway notation (knot theory)}}
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| | |
| The Conway notation for knots and links, named after [[John Horton Conway]], is based on the theory of [[tangle (mathematics)|tangles]] {{Harv|Conway|1970}}. The advantage of this notation is that it reflects some properties of the knot or link.
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| The notation describes how to construct a particular link diagram of the link. Start with a ''basic polyhedron'', a 4-valent connected planar graph with no [[digon]] regions. Such a polyhedron is denoted first by the number of vertices then a number of asterisks which determine the polyhedron's position on a list of basic polyhedron. For example, 10** denotes the second 10-vertex polyhedron on Conway's list.
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| Each vertex then has an [[algebraic tangle]] substituted into it (each vertex is oriented so there is no arbitrary choice in substitution). Each such tangle has a notation consisting of numbers and + or − signs.
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| An example is 1*2 −3 2. The 1* denotes the only 1-vertex basic polyhedron. The 2 −3 2 is a sequence describing the continued fraction associated to a [[rational tangle]]. One inserts this tangle at the vertex of the basic polyhedron 1*.
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| A more complicated example is 8*3.1.2 0.1.1.1.1.1 Here again 8* refers to a basic polyhedron with 8 vertices. The periods separate the notation for each tangle.
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| Any link admits such a description, and it is clear this is a very compact notation even for very large crossing number. There are some further shorthands usually used. The last example is usually written 8*3:2 0, where the ones are omitted and kept the number of dots excepting the dots at the end. For an algebraic knot such as in the first example, 1* is often omitted.
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| Conway's pioneering paper on the subject lists up to 10-vertex basic polyhedra of which he uses to tabulate links, which have become standard for those links. For a further listing of higher vertex polyhedra, there are nonstandard choices available.
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| ==See also==
| |
| *[[Contact geometry#Legendrian submanifolds and knots]]
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| *[[Knots and graphs]]
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| *[[List of knot theory topics]]
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| *[[Molecular knot]]
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| *[[Quantum topology]]
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| *[[Ribbon theory]]
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| ==References==
| |
| <!-- this section is for *references*, sources used to write a part of the article or cited in the article to justify a statement. Supplementary reading should go into "further reading" -->
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| *{{Citation|first=Colin |last= Adams|author-link=Colin Adams (mathematician)|title=The Knot Book: An Elementary Introduction to the Mathematical Theory of Knots |publisher=American Mathematical Society|year=2004|isbn=0-8218-3678-1|ref=harv}}
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| *{{Citation|first=Colin|last=Adams|first2=Martin|last2=Hildebrand|first3=Jeffrey|last3=Weeks|author3-link= Jeffrey Weeks (mathematician)|title=Hyperbolic invariants of knots and links|journal=Transactions of the American Mathemathical Society|year=1991|volume=326|pages=1–56|issue=1|doi=10.2307/2001854|publisher=Transactions of the American Mathematical Society, Vol. 326, No. 1|jstor=2001854|ref=harv}}
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| *{{Citation|first=Selman|last=Akbulut|first2=Henry C.|last2=King|title= All knots are algebraic|journal=Comm. Math. Helv.|year=1981|volume=56|pages=339–351|issue=3|ref=harv|doi=10.1007/BF02566217}}
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| *{{Citation|first=Dror|last=Bar-Natan|title=On the Vassiliev knot invariants|journal=Topology|volume=34|year=1995|pages=423–472|issue=2|doi=10.1016/0040-9383(95)93237-2|ref=harv}}
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| *{{Citation|first=Graham|last=Collins|periodical=Scientific American|title=Computing with Quantum Knots|date=April 2006|ref=harv|bibcode=2006SciAm.294d..56C|volume=294|pages=56|doi=10.1038/scientificamerican0406-56|issue=4}}
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| *{{Citation|first=John Horton|last=Conway|author-link=John Horton Conway|contribution=An enumeration of knots and links, and some of their algebraic properties|publisher=Pergamon|year=1970|pages=329–358|title=Computational Problems in Abstract Algebra (Proc. Conf., Oxford, 1967|ref=harv)}}
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| *{{Citation|first=Helmut|last=Doll|first2=Jim|last2=Hoste|title=A tabulation of oriented links. With microfiche supplement|journal=Math. Comp.|volume=57|year=1991|pages=747–761|issue=196|ref=harv|doi=10.1090/S0025-5718-1991-1094946-4}}
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| *{{Citation|first=Erica|last=Flapan|authorlink=Erica Flapan|title=When topology meets chemistry: A topological look at molecular chirality|journal=Outlooks|publisher=Cambridge University Press, Cambridge; Mathematical Association of America, Washington, DC|year=2000|isbn=0-521-66254-0|ref=harv}}
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| *{{Citation|first=André|last=Haefliger|title=Knotted (4''k'' − 1)-spheres in 6''k''-space|journal=Annals of Mathematics. Second Series|publisher=The Annals of Mathematics, Vol. 75, No. 3|year=1962|volume=75|pages=452–466|doi=10.2307/1970208|issue=3|jstor=1970208|ref=harv}}
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| *{{Citation|first=Joel|last=Hass|author-link=Joel Hass|title=Algorithms for recognizing knots and 3-manifolds|journal=Chaos, Solitons and Fractals|publisher=Elsevier|year=1998|pages=569–581|volume=9|doi=10.1016/S0960-0779(97)00109-4|issue=4–5 |arxiv=math/9712269|ref=harv|bibcode = 1998CSF.....9..569H }}
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| *{{Citation|first=Jim|last=Hoste|first2=Morwen|last2=Thistlethwaite|authorlink2=Morwen Thistlethwaite|first3=Jeffrey|last3=Weeks|title= The First 1,701,935 Knots|journal=[[Math. Intelligencer]]|volume=20|year=1998|publisher=Springer|pages=33–48|doi=10.1007/BF03025227|issue=4|ref=harv}}
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| *{{Citation|first=Jim|last=Hoste|contribution=The enumeration and classification of knots and links|year=2005|title=Handbook of Knot Theory|place= Amsterdam|publisher=Elsevier|url=http://pzacad.pitzer.edu/~jhoste/HosteWebPages/downloads/Enumeration.pdf|ref=harv}}
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| *{{Citation|first=Jerome|last=Levine|title=A classification of differentiable knots|journal=Annals of Mathematics. Second Series|year=1965|volume=1982|pages=15–50|ref=harv|doi=10.2307/1970561}}
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| *{{Citation|first=Maxim|last=Kontsevich|author-link=Maxim Kontsevich|title=Vassiliev's knot invariants|pages=137–150|journal= I. M. Gelfand Seminar, Adv. Soviet Math.|volume=16|series=2|publisher=Amer. Math. Soc.|place=Providence, RI|year=1993|ref=harv}}
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| *{{Citation|first=W. B. Raymond|last=Lickorish|title=An Introduction to Knot Theory|publisher=Springer-Verlag|series=Graduate Texts in Mathematics|year=1997|isbn=0-387-98254-X|ref=harv}}
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| *{{Citation|first=Kenneth|last=Perko|title=On the classification of knots|journal=Proceedings of the American Mathematical Society|year=1974|volume=45|pages=262–266|doi=10.2307/2040074|issue=2|publisher=Proceedings of the American Mathematical Society, Vol. 45, No. 2|jstor=2040074|ref=harv}}
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| *{{Citation|first=Dale|last=Rolfsen|title=Knots and Links|publisher=Publish or Perish|year=1976|isbn=0-914098-16-0}}
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| *{{Citation|last=Schubert|first=Horst| year=1949 | title=Die eindeutige Zerlegbarkeit eines Knotens in Primknoten | journal = Heidelberger Akad. Wiss. Math.-Nat. Kl. | pages = 57–104 | issue = 3|ref=harv}}
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| *{{Citation|first=Dan|last=Silver|title=Knot theory's odd origins|periodical=American Scientist|volume=94|pages=158–165|year=2006|url=http://www.southalabama.edu/mathstat/personal_pages/silver/scottish.pdf|issue=2|ref=harv|doi=10.1511/2006.2.158}}
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| *{{Citation| last=Simon|first=Jonathan| year = 1986| journal = Topology|volume = 25|pages=229–235|title=Topological chirality of certain molecules| doi=10.1016/0040-9383(86)90041-8| issue=2|ref=harv}}
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| *{{Citation | last =Sossinsky | first =Alexei | year =2002 | title =Knots, mathematics with a twist | publisher =Harvard University Press | isbn =0-674-00944-4 |ref=harv}}
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| *{{Citation|last=Turaev|first=V. G.|title=[[Quantum invariant]]s of knots and 3-manifolds|journal= De Gruyter Studies in Mathematics|volume= 18|publisher=Walter de Gruyter & Co.|place=Berlin|year=1994|isbn=3-11-013704-6|ref=harv}}
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| *{{cite web |url=http://mathworld.wolfram.com/ReducedKnotDiagram.html |title=Reduced Knot Diagram |last1=Weisstein |first1=Eric W. |date= |work=MathWorld |publisher=Wolfram |accessdate=8 May 2013|ref=harv}}
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| *{{cite web |url=http://mathworld.wolfram.com/ReducibleCrossing.html |title=Reducible Crossing |last1=Weisstein |first1=Eric W. |date= |work=MathWorld |publisher=Wolfram |accessdate=8 May 2013|ref=harv}}
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| *{{Citation|last=Witten|first=Edward|author-link=Edward Witten|title=Quantum field theory and the Jones polynomial|journal=Comm. Math. Phys.|volume=121|year=1989|pages=351–399|issue=3|doi=10.1007/BF01217730|bibcode=1989CMaPh.121..351W|ref=harv}}
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| *{{Citation|first=E. C.|last=Zeeman|author-link=E. C. Zeeman|title=Unknotting combinatorial balls|journal=Annals of Mathematics. Second Series|year=1963|volume=78|pages=501–526|doi=10.2307/1970538|issue=3|publisher=The Annals of Mathematics, Vol. 78, No. 3|jstor=1970538|ref=harv}}
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| ==Further reading==
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| | |
| ===Introductory textbooks===
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| There are a number of introductions to knot theory. A classical introduction for graduate students or advanced undergraduates is Rolfsen (1976), given in the references. Other good texts from the references are Adams (2001) and Lickorish (1997). Adams is informal and accessible for the most part to high schoolers. Lickorish is a rigorous introduction for graduate students, covering a nice mix of classical and modern topics.
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| | |
| * [[Louis H. Kauffman]], ''Knots and Physics (Fourth Edition)'', 2013, World Scientific Publishing, ISBN 978-981-4383-00-4.
| |
| * [[Richard H. Crowell]] and [[Ralph Fox]], ''Introduction to Knot Theory'', 1977, ISBN 0-387-90272-4.
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| * [[Gerhard Burde]] and [[Heiner Zieschang]], ''Knots'', De Gruyter Studies in Mathematics, 1985, Walter de Gruyter, ISBN 3-11-008675-1.
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| * [[Louis H. Kauffman]], ''On Knots'', 1987, ISBN 0-691-08435-1.
| |
| <!-- To keep this section under control, please add only well-known texts that do not substantially overlap an already listed text -->
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| | |
| ===Surveys===
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| * William W. Menasco and [[Morwen Thistlethwaite]] (editors), ''Handbook of Knot Theory'', Amsterdam : Elsevier, 2005. ISBN 0-444-51452-X.
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| **Menasco and Thistlethwaite's handbook surveys a mix of topics relevant to current research trends in a manner accessible to advanced undergraduates but of interest to professional researchers.
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| *Livio, Mario, ''Is God a Mathematician?'', Simon & Schuster, 2009, pp. 203–218 ISBN 978-0-7432-9405-8.
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| | |
| ==External links==
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| {{commons category|Knot theory}}
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| {{Wiktionary}}
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| | |
| ===History===
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| *Thomson, Sir William (Lord Kelvin), ''[http://zapatopi.net/kelvin/papers/on_vortex_atoms.html On Vortex Atoms]'', Proceedings of the Royal Society of Edinburgh, Vol. VI, 1867, pp. 94–105.
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| *Silliman, Robert H., ''William Thomson: Smoke Rings and Nineteenth-Century Atomism'', Isis, Vol. 54, No. 4. (Dec., 1963), pp. 461–474. [http://links.jstor.org/sici?sici=0021-1753%28196312%2954%3A4%3C461%3AWTSRAN%3E2.0.CO%3B2-0 JSTOR link]
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| *[http://www.southalabama.edu/mathstat/personal_pages/silver/smoke%20rings.mpg Movie] of a modern recreation of Tait's smoke ring experiment
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| *[http://www.maths.ed.ac.uk/~aar/knots History of knot theory] (on the home page of Andrew Ranicki)
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| | |
| ===Knot tables and software===
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| * [http://www.indiana.edu/~knotinfo/ '''KnotInfo''': ''Table of Knot Invariants and Knot Theory Resources'']
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| * {{Knot Atlas|Main Page}} – detailed info on individual knots in knot tables
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| * [http://knotplot.com/ KnotPlot] – software to investigate geometric properties of knots
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| | |
| | |
| ==References==
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| {{commons}}
| |
| {{Reflist}}
| |
| | |
| | |
| {{Knot theory|state=collapsed}}
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| | |
| | |
| [[Category:Knot theory| ]] | |
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