Аннотация:
We consider $q$-difference relations for the colored Jones polynomials. These
sequences of polynomials are invariants for the knots and their asymptotics
plays an important role in the famous volume conjecture for the complement of
the knot to the 3D sphere. We give an introduction to the theory of
hyperbolic volume of the knot complements and study the asymptotics of the
solutions of the $q$-recurrence equations of higher order.