Unity of Jones polynomials in the unit circle and the plane
Abstract
In this note, we study solutions of the equation JK(t)=1 for the Jones polynomial of knots and links. For the family Kn of double-twist knots, we show that every root of unity (except -1) satisfies JKn(ζ)=1 for some n. Consequently, the set of solutions to JKn(t)=1 arising from this family is dense in the unit circle. We further show that there exists a family of links for which the zeros of JL(t)-1 are dense in the complex plane, adapting the density mechanism of Jin--Zhang--Dong--Tay for Jones polynomial zeros.
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