Algebra of quantum C-polynomials

Abstract

Knot polynomials colored with symmetric representations of SLq(N) satisfy difference equations as functions of representation parameter, which look like quantization of classical A-polynomials. However, they are quite difficult to derive and investigate. Much simpler should be the equations for coefficients of differential expansion nicknamed quantum C-polynomials. It turns out that, for each knot, one can actually derive two difference equations of a finite order for these coefficients, those with shifts in spin n of the representation and in A=qN. Thus, the C-polynomials are much richer and form an entire ring. We demonstrate this with the examples of various defect zero knots, mostly discussing the entire twist family.