Notes for AKT-170110-1/0:43:57

Kauffman often defines his bracket using the variable ${\displaystyle A}$, it is not invariant under Reidemeister 1, a positive curl spits out ${\displaystyle -A^{3}}$. Multiplying through the relation for the ${\displaystyle \pm }$ crossing by ${\displaystyle -A^{\mp 3}}$ and absorbing that factor into the crossing, we get Dror's Kauffman bracket with ${\displaystyle q=-A^{-2}}$.