The HOMFLY-PT Polynomial

The HOMFLY-PT polynomial ${\displaystyle H(L)(a,z)}$ (see [HOMFLY] and [PT] of a knot or link ${\displaystyle L}$ is defined by the skein relation

${\displaystyle aH\left(\{overcrossing\}\right)-a^{-1}H\left(\{undercrossing\}\right)=zH\left(\{smoothing\}\right)}$

and by the initial condition ${\displaystyle H(\{bigcirc\})}$=1.

KnotTheory` knows about the HOMFLY-PT polynomial:

(For In[1] see Setup)

Thus, for example, here's the HOMFLY-PT polynomial of the knot 8_1:

It is well known that HOMFLY-PT polynomial specializes to the Jones polynomial at ${\displaystyle a=q^{-1}}$ and ${\displaystyle z=q^{1/2}-q^{-1/2}}$ and to the Conway polynomial at ${\displaystyle a=1}$. Indeed,

In our parametirzation of the ${\displaystyle A_{2}}$ link invariant, it satisfies

${\displaystyle A_{2}(L)(q)=(-1)^{c}(q^{2}+1+q^{-2})H(L)(q^{-3},\,q-q^{-1})}$,

where ${\displaystyle L}$ is some knot or link and where ${\displaystyle c}$ is the number of components of ${\displaystyle L}$. Let us verify this fact for the Whitehead link, L5a1:

[HOMFLY] ^  J. Hoste, A. Ocneanu, K. Millett, P. Freyd, W. B. R. Lickorish and D. Yetter, A new polynomial invariant of knots and links, Bull. Amer. Math. Soc. 12 (1985) 239-246.

[PT] ^  J. Przytycki and P. Traczyk, ${\displaystyle ConwayAlgebrasandSkeinEquivalenceofLinks}$, Proc. Amer. Math. Soc. 100 (1987) 744-748.