Proof of a stronger version of the AJ conjecture for torus knots

Abstract

For a knot K in S3, the sl2-colored Jones function JK(n) is a sequence of Laurent polynomials in the variable t, which is known to satisfy non-trivial linear recurrence relations. The operator corresponding to the minimal linear recurrence relation is called the recurrence polynomial of K. The AJ conjecture Ga04 states that when reducing t=-1, the recurrence polynomial is essentially equal to the A-polynomial of K. In this paper we consider a stronger version of the AJ conjecture, proposed by Sikora Si, and confirm it for all torus knots.