Cn-moves and the difference of Jones polynomials for links

Abstract

The Jones polynomial VL(t) for an oriented link L is a one-variable Laurent polynomial link invariant discovered by Jones. For any integer n 3, we show that: (1) the difference of Jones polynomials for two oriented links which are Cn-equivalent is divisible by (t-1)n(t2+t+1)(t2+1), and (2) there exists a pair of two oriented knots which are Cn-equivalent such that the difference of the Jones polynomials for them equals (t-1)n(t2+t+1)(t2+1).