Chebyshev diagrams for two-bridge knots

Abstract

We show that every two-bridge knot K of crossing number N admits a polynomial parametrization x=T3(t), y = Tb(t), z =C(t) where Tk(t) are the Chebyshev polynomials and b+ C = 3N. If C (t)= Tc(t) is a Chebyshev polynomial, we call such a knot a harmonic knot. We give the classification of harmonic knots for a 3. Most results are derived from continued fractions and their matrix representations.