Constructions of Spherical 3-Designs

Abstract

Spherical t-designs are Chebyshev-type averaging sets on the d-sphere S^d which are exact for polynomials of degree at most t. This concept was introduced in 1977 by Delsarte, Goethals, and Seidel, who also found the minimum possible size of such designs, in particular, that the number of points in a 3-design on S^d must be at least n>=2d+2. In this paper we give explicit constructions for spherical 3-designs on S^d consisting of n points for d=1 and n>=4; d=2 and n=6; 8; >= 10; d=3 and n=8; >=10; d = 4 and n = 10; 12; >= 14; d>=5 and n>=5(d+1)/2 odd or n>=2d+2 even. We also provide some evidence that 3-designs of other sizes do not exist.