A Note On Characterizations of Spherical t-Designs

Abstract

A set XN=\x1,…,xN\ of N points on the unit sphere Sd,\,d≥ 2 is a spherical t-design if the average of any polynomial of degree at most t over the sphere is equal to the average value of the polynomial over XN. This paper extends characterizations of spherical t-designs in previous paper from S2 to general Sd. We show that for N≥(Pt+1), XN is a stationary point set of a certain non-negative quantity AN,\,t and a fundamental system for polynomial space over Sd with degree at most t, then XN is a spherical t-design. In contrast, we present that with N ≥ ( Pt), a fundamental system XN is a spherical t-design if and only if non-negative quantity DN,\,t vanishes. In addition, the still unanswered questions about construction of spherical t-designs are discussed.