Infinitely many roots of unity are zeros of some Jones polynomials

Abstract

Let N=2n2-1 or N=n2+n-1, for any n 2. Let M=N-12. We construct families of prime knots with Jones polynomials (-1)MΣk=-MM (-1)ktk. Such polynomials have Mahler measure equal to 1. If N is prime, these are cyclotomic polynomials 2N(t), up to some shift in the powers of t. Otherwise, they are products of such polynomials, including 2N(t). In particular, all roots of unity ζ2N occur as roots of Jones polynomials. We also show that some roots of unity cannot be zeros of Jones polynomials.