Spectral Factorization and Hypergeometric Representations of the Alexander Polynomials of Th(4,2n+1)

Abstract

We study the Alexander polynomials of the 4-strand Turk's head knots Th(4,2n+1), defined as the closures of the braid (σ1σ2-1σ3)2n+1. Using the reduced Burau representation, we derive an annihilating recurrence of order at most 8 and a rational generating function for the resulting polynomial sequence. By executing a multivariable resultant elimination over the reciprocal constraint, we obtain an exact factorization of the normalized Alexander polynomial in terms of Chebyshev polynomials. This factorization produces a binomial convolution formula for an associated coefficient sequence and a representation by a terminating 4F3 hypergeometric series. We evaluate the continuous approximation of this representation using the saddle-point method, demonstrating negative curvature in the asymptotic main term. Finally, we describe analytic obstructions to extracting global discrete error bounds via this method, leaving the formal proof of Fox's Trapezoidal Conjecture for this family open.