Editing Jones polynomial (section)

===Link with quantum knot invariants===

By substituting <math>e^h</math> for the variable <math>t</math> 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 <math>K</math>. In order to unify the Vassiliev invariants (or, finite type invariants), [[Maxim Kontsevich]] constructed the [[Kontsevich integral]]. The value of the Kontsevich integral, which is the infinite sum of 1, 3-valued [[chord diagram (mathematics)|chord diagram]]s, named the Jacobi chord diagrams, reproduces the Jones polynomial along with the <math>\mathfrak{sl}_2</math> weight system studied by [[Dror Bar-Natan]].