The Kauffman Polynomial

The Kauffman polynomial ${\displaystyle F(K)(a,z)}$ (see [Kauffman]) of a knot or link ${\displaystyle K}$ is ${\displaystyle a^{-w(K)}L(K)}$ where ${\displaystyle w(L)}$ is the writhe of ${\displaystyle K}$ (see How is the Jones Polynomial Computed?) and where ${\displaystyle L(K)}$ is the regular isotopy invariant defined by the skein relations

${\displaystyle L(s_{+})=aL(s),\qquad L(s_{-})=a^{-1}L(s)}$

(here ${\displaystyle s}$ is a strand and ${\displaystyle s_{\pm }}$ is the same strand with a ${\displaystyle \pm }$ kink added) and

${\displaystyle L(T_{1})+L(T_{2})=z\left(L(T_{3})+L(T_{4})\right)}$

(here ${\displaystyle T_{1}}$, ${\displaystyle T_{2}}$, ${\displaystyle T_{3}}$ and ${\displaystyle T_{4}}$ are , , and , respectively), and by the initial condition ${\displaystyle L(U)=1}$ where ${\displaystyle U}$ is the unknot .

KnotTheory` knows about the Kauffman polynomial:

(For In[1] see Setup)

Thus, for example, here's the Kauffman polynomial of the knot 5_2:

It is well known that the Jones polynomial is related to the Kauffman polynomial via

${\displaystyle J(L)(q)=(-1)^{c}L(K)(-q^{-3/4},\,q^{1/4}+q^{-1/4})}$,

where ${\displaystyle K}$ is some knot or link and where ${\displaystyle c}$ is the number of components of ${\displaystyle K}$. Let us verify this fact for the torus knot T(8,3):

[Kauffman] ^  L. H. Kauffman, An invariant of regular isotopy, Trans. Amer. Math. Soc. 312 (1990) 417-471.