Four-point semidefinite bound for equiangular lines

Abstract

A set of lines in Rd passing through the origin is called equiangular if any two lines in the set form the same angle. We proved an alternative version of the three-point semidefinite constraints developed by Bachoc and Vallentin, and the multi-point semidefinite constraints developed by Musin for spherical codes. The alternative semidefinite constraints are simpler when the concerned object is a spherical s-distance set. Using the alternative four-point semidefinite constraints, we found the four-point semidefinite bound for equiangular lines. This result improves the upper bounds for infinitely many dimensions d with prescribed angles. As a corollary of the bound, we proved the uniqueness of the maximum construction of equiangular lines in Rd for 7 ≤ d ≤ 14 with inner product α = 1/3, and for 23 ≤ d ≤ 64 with α = 1/5.