Semidefinite Programming Bounds For Spherical Three-distance Sets

Abstract

A spherical three-distance set is a finite collection X of unit vectors in Rn such that for each pair of distinct vectors has three inner product values. We use the semidefinite programming method to improve the upper bounds of spherical three-distance sets for several dimensions. We obtain better bounds in R7, R20, R21, R23, R24 and R25. In particular, we prove that maximum size of spherical three-distance sets is 2300 in R23.