Constructions of complex equiangular lines from mutually unbiased bases

Abstract

A set of vectors of equal norm in Cd represents equiangular lines if the magnitudes of the Hermitian inner product of every pair of distinct vectors in the set are equal. The maximum size of such a set is d2, and it is conjectured that sets of this maximum size exist in Cd for every d ≥ 2. We take a combinatorial approach to this conjecture, using mutually unbiased bases (MUBs) in the following 3 constructions of equiangular lines: (1) adapting a set of d MUBs in Cd to obtain d2 equiangular lines in Cd, (2) using a set of d MUBs in Cd to build (2d)2 equiangular lines in C2d, (3) combining two copies of a set of d MUBs in Cd to build (2d)2 equiangular lines in C2d. For each construction, we give the dimensions d for which we currently know that the construction produces a maximum-sized set of equiangular lines.