Jones polynomial

In the mathematical field of knot theory, the Jones polynomial is a knot polynomial discovered by Vaughan Jones in 1984.^[1] Specifically, it is an invariant of an oriented knot or link which assigns to each oriented knot or link a Laurent polynomial in the variable $t^{{1/2}}$ with integer coefficients.^[2]

Definition by the bracket

Type I Reidemeister move

Suppose we have an oriented link $L$ , given as a knot diagram. We will define the Jones polynomial, $V(L)$ , using Kauffman's bracket polynomial, which we denote by $\langle ~\rangle$ . Note that here the bracket polynomial is a Laurent polynomial in the variable $A$ with integer coefficients.

First, we define the auxiliary polynomial (also known as the normalized bracket polynomial)

X(L)=(-A^{3})^{{-w(L)}}\langle L\rangle

where $w(L)$ denotes the writhe of $L$ in its given diagram. The writhe of a diagram is the number of positive crossings ( $L_{{+}}$ in the figure below) minus the number of negative crossings ( $L_{{-}}$ ). The writhe is not a knot invariant.

$X(L)$ is a knot invariant since it is invariant under changes of the diagram of $L$ by the three Reidemeister moves. Invariance under type II and III Reidemeister moves follows from invariance of the bracket under those moves. The bracket polynomial is known to change by multiplication by $-A^{{\pm 3}}$ under a type I Reidemeister move. The definition of the $X$ polynomial given above is designed to nullify this change, since the writhe changes appropriately by +1 or -1 under type I moves.

Now make the substitution $A=t^{{-1/4}}$ in $X(L)$ to get the Jones polynomial $V(L)$ . This results in a Laurent polynomial with integer coefficients in the variable $t^{{1/2}}$ .

The Jones Polynomial for tangles

This construction of the Jones Polynomial for tangles is a simple generalization of the Kauffman bracket of a link. The construction was developed by Professor Vladimir G. Turaev and published in 1990 in the Journal of Mathematics and Science.^[3]

Let $k$ be a non-negative integer and $S_k$ denote the set of all isotopic types of tangle diagrams, with $2k$ ends, having no crossing points and no closed components (smoothings). Turaev's construction makes use of the previous construction for the Kauffman bracket and associates to each $2k$ -end oriented tangle an element of the free $\mathrm{R}$ -module $\mathrm{R}[S_k]$ , where $\mathrm{R}$ is the ring of Laurent polynomials with integer coefficients in the variable $t^{{1/2}}$ .

Definition by braid representation

Jones' original formulation of his polynomial came from his study of operator algebras. In Jones' approach, it resulted from a kind of "trace" of a particular braid representation into an algebra which originally arose while studying certain models, e.g. the Potts model, in statistical mechanics.

Let a link L be given. A theorem of Alexander's states that it is the trace closure of a braid, say with n strands. Now define a representation $\rho$ of the braid group on n strands, B_n, into the Temperley–Lieb algebra TL_n with coefficients in ${\mathbb Z}[A,A^{{-1}}]$ and $\delta =-A^{2}-A^{{-2}}$ . The standard braid generator $\sigma _{i}$ is sent to $A\cdot e_{i}+A^{{-1}}\cdot 1$ , where $1,e_{1},\dots ,e_{{n-1}}$ are the standard generators of the Temperley–Lieb algebra. It can be checked easily that this defines a representation.

Take the braid word $\sigma$ obtained previously from L and compute $\delta ^{{n-1}}tr\rho (\sigma )$ where tr is the Markov trace. This gives $\langle L\rangle$ , where $\langle$ $\rangle$ is the bracket polynomial. This can be seen by considering, as Kauffman did, the Temperley–Lieb algebra as a particular diagram algebra.

An advantage of this approach is that one can pick similar representations into other algebras, such as the R-matrix representations, leading to "generalized Jones invariants".

Properties

The Jones polynomial is characterized by the fact that it takes the value 1 on any diagram of the unknot and satisfies the following skein relation:

(t^{{1/2}}-t^{{-1/2}})V(L_{0})=t^{{-1}}V(L_{{+}})-tV(L_{{-}})\,

where $L_{{+}}$ , $L_{{-}}$ , and $L_{{0}}$ are three oriented link diagrams that are identical except in one small region where they differ by the crossing changes or smoothing shown in the figure below:

The definition of the Jones polynomial by the bracket makes it simple to show that for a knot $K$ , the Jones polynomial of its mirror image is given by substitution of $t^{-1}$ for $t$ in $V(K)$ . Thus, an amphichiral knot, a knot equivalent to its mirror image, has palindromic entries in its Jones polynomial. See the article on skein relation for an example of a computation using these relations.

Another remarkable property of this invariant states that the Jones Polynomial of an alternating link is an alternating polynomial. This property was proved by Morwen Thistlethwaite ^[4] in 1987. Another proof of this last property is due to Hernando Burgos-Soto, who also gave an extension to tangles^[5] of the property.

Colored Jones polynomial

N colored Jones Polynomial: N cables of L are parallel with each other along the knot L and colored in a different color from each other.

For a positive integer N a N-colored Jones polynomial $V_{N}(L,t)$ can be defined as the Jones polynomial for N cables of the knot $L$ as depicted in the right figure. It is associated with an (N + 1)-dimensional irreducible representation of $SU(2)$ . The label N stands for coloring. Like the ordinary Jones polynomial it can be defined by Skein relation and is a Laurent polynomial in one variable t . The N-colored Jones polynomial $V_{N}(L,t)$ has the following properties:

$V_{{X\oplus Y}}(L,t)=V_{X}(L,t)+V_{Y}(L,t)$ where $X,Y$ are two representation space.
$V_{{X\otimes Y}}(L,t)$ equals the Jones polynomial of the 2-cables of L with two components labeled by $X$ and $Y$ . So the N-colored Jones polynomial equals the original Jones polynomial of the N cables of $L$ .
The original Jones polynomial appears as a special case: $V(L,t)=V_{1}(L,t)$ .

Relationship to other theories

Link with Chern–Simons theory

As first shown by Edward Witten, the Jones polynomial of a given knot $\gamma$ can be obtained by considering Chern–Simons theory on the three-sphere with gauge group SU(2), and computing the vacuum expectation value of a Wilson loop $W_{F}(\gamma )$ , associated to $\gamma$ , and the fundamental representation $F$ of $\mathrm {SU} (2)$ .

Link with quantum knot invariants

By substituting $e^{h}$ the variable $t$ of the Jones polynomial and expanding it as the series of h each of the coefficients turn to be the Vassiliev invariant of the knot K. In order to unify the Vassiliev invariants(finite type invariant) Maxim Kontsevich constructed the Kontsevich integral. The value of the Kontsevich integral, which is the infinite sum of 1, 3-valued chord diagram, named the Jacobi chord diagram, reproduces the Jones polynomial along with the $sl_{2}$ weight system which was deeply studied by Dror Bar-Natan.

Link with the Volume Conjecture

By numerical examinations on some hyperbolic knots R. M. Kashaev discovered that substituting the n-th root of unity the parameter of the colored Jones polynomial corresponding to the N-dimensional representation and limiting it as N grows to the infinity　its limit value would give the hyperbolic volume of the knot complement. (see Volume conjecture.)

Link with Khovanov homology

In 2000 Mikhail Khovanov constructed a certain chain complex for knots and links and showed that the homology induced from it is a knot invariant (see Khovanov homology). The Jones polynomial is described as the Euler characteristic for this homology.

Open problems

Is there a nontrivial knot with Jones polynomial equal to that of the unknot? It is known that there are nontrivial links with Jones polynomial equal to that of the corresponding unlinks by the work of Morwen Thistlethwaite.

Notes

↑ Jones, V.F.R. (1985). "A polynomial invariant for knots via von Neumann algebra". Bull. Amer. Math. Soc. (N.S.). 12: 103–111. doi:10.1090/s0273-0979-1985-15304-2.
↑ JONES POLYNOMIALS, VOLUME AND ESSENTIAL KNOT SURFACES: A SURVEY
↑ Turaev, Vladimir G. (1990). "Jones-type invariants of tangles". Journal of Mathematical Sciences. 52: 2806–2807. doi:10.1007/bf01099242.
↑ Thistlethwaite, Morwen B. (1987). "A spanning tree expansion of the jones polynomial". Topology. 26 (3): 297–309. doi:10.1016/0040-9383(87)90003-6.
↑ Burgos-Soto, Hernando (2010). "The Jones polynomial and the planar algebra of alternating links". Journal of Knot Theory and its Ramifications. 19 (11): 1487–1505. doi:10.1142/s0218216510008510.

References

Vaughan Jones, The Jones Polynomial
Colin Adams, The Knot Book, American Mathematical Society, ISBN 0-8050-7380-9
H. Kauffman, Louis (1987). "State models and the jones polynomial". Topology. 26 (3): 395–407. doi:10.1016/0040-9383(87)90009-7. Retrieved 22 December 2012. (explains the definition by bracket polynomial and its relation to Jones' formulation by braid representation)
Lickorish, W. B. Raymond (1997). An introduction to knot theory. New York; Berlin; Heidelberg; Barcelona; Budapest; Hong Kong; London; Milan; Paris; Santa Clara; Singapore; Tokyo: Springer. p. 175. ISBN 978-0-387-98254-0.
THISTLETHWAITE, MORWEN (2001). "LINKS WITH TRIVIAL JONES POLYNOMIAL". Journal of Knot Theory and Its Ramifications. 10 (04): 641–643. doi:10.1142/S0218216501001050.
Eliahou, Shalom; Kauffman, Louis H.; Thistlethwaite, Morwen B. (2003). "Infinite families of links with trivial Jones polynomial". Topology. 42 (1): 155–169. doi:10.1016/S0040-9383(02)00012-5.

External links

Hazewinkel, Michiel, ed. (2001), "Jones-Conway polynomial", Encyclopedia of Mathematics, Springer, ISBN 978-1-55608-010-4
Links with trivial Jones polynomial by Morwen Thistlethwaite
"The Jones Polynomial", The Knot Atlas.

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