Factorization of colored knot polynomials at roots of unity

Abstract

From analysis of a big variety of different knots we conclude that at q which is an root of unity, q2m=1, HOMFLY polynomials in symmetric representations [r] satisfy recursion identity: Hr+m = Hr Hm for any A, which is a generalization of the property Hr = (H1)r for special polynomials at q=1. We conjecture a natural generalization to arbitrary representation R, which, however, is checked only for torus knots. Next, Kashaev polynomial, which arises from HR at q=exp(iπ/|R|), turns equal to the special polynomial with A substituted by A|R|, provided R is a single-hook representations (e.g. arbitrary symmetric) -- what provides a q-A dual to the similar property of Alexander polynomial. All this implies non-trivial relations for the coefficients of the differential expansions, which are believed to provide reasonable coordinates in the space of knots -- existence of such universal relations means that these variables are still not unconstrained.