Equiangular lines, Incoherent sets and Quasi-symmetric designs

Abstract

The absolute upper bound on the number of equiangular lines that can be found in Rd is d(d+1)/2. Examples of sets of lines that saturate this bound are only known to exist in dimensions d=2,3,7 or 23. By considering the additional property of incoherence, we prove that there exists a set of equiangular lines that saturates the absolute bound and the incoherence bound if and only if d=2,3,7 or 23. This allows us classify all tight spherical 5-designs X in Sd-1, the unit sphere, with the property that there exists a set of d points in X whose pairwise inner products are positive. For a given angle , there exists a relative upper bound on the number of equiangular lines in Rd with common angle . We prove that classifying sets of lines that saturate this bound along with the incoherence bound is equivalent to classifying certain quasi-symmetric designs, which are combinatorial designs with two block intersection numbers. Given a further natural assumption, we classify the known sets of lines that saturate these two bounds. This family comprises of the lines mentioned above and the maximal set of 16 equiangular lines found in R6. There are infinitely many known sets of lines that saturate the relative bound, so this result is surprising. To shed some light on this, we identify the E8 lattice with the projection onto an 8-dimensional subspace of a sublattice of the Leech lattice defined by 276 equiangular lines in R23. This identification leads us to observe a correspondence between sets of equiangular lines in small dimensions and the exceptional curves of del Pezzo surfaces.