Abstract In this paper we elucidate the advantage of examining the connections between Hilbert-Kamke equations and geometric designs, or Chebyshev-type quadrature, for classical orthogonal polynomials. We first establish that if a 5-design with 6 rational points for a symmetric classical measure is parametrized by rational functions, then the corresponding measure should be the Chebyshev measure (1-t²) ^-1/2dt/ (1 - t 2) - 1 / 2 d t / π on (-1, 1) (- 1, 1). Our proof is based on the collaboration of a certain polynomial identity and some advanced techniques on the computation of the genus of a certain irreducible curve. Next, we prove a necessary and sufficient condition for the existence of rational 5-designs for the Chebyshev measure. Moreover, as one of our main theorems, we construct an infinite family of ideal solutions for the Prouhet-Tarry-Escott (PTE) problem by utilizing rational 5-designs for the Chebyshev measure, and then establish that, up to affine equivalence over Q Q, such ideal solutions are included in the famous parametric solutions found by Borwein (2002).
Mishima et al. (Tue,) studied this question.