Continuant, Chebyshev polynomials, and Riley polynomials

Abstract

In the previous paper, we showed that the Riley polynomial RK(λ) of each 2-bridge knot K is split into RK(-u2)= g(u)g(-u), for some integral coefficient polynomial g(u)∈ Z[u]. In this paper, we study this splitting property of the Riley polynomial. We show that the Riley polynomial can be expressed by `ε-Chebyshev polynomials', which is a generalization of Chebyshev polynomials containing the information of εi-sequence (εi=(-1)[iβα]) of the 2-bridge knot K=S(α,β), and then we give an explicit formula for the splitting polynomial g(u) also as ε-Chebyshev polynomials. As applications, we find a sufficient condition for the irreducibility of the Riley polynomials and show the unimodal property of the symmetrized Riley polynomial.