Sets of equiangular lines in dimension 18 constructed from A53 A14

Abstract

In 2023, Greaves, Syatriadi, and Yatsyna found a set of 57 equiangular lines in R18, breaking the previous record. In 2025, Lin, Munemasa, Taniguchi, and Yoshino constructed a large number of sets of 57 equiangular lines in R18 as affine equiangular sets in an integral overlattice of A92 A1. In this paper, we construct further sets of 57 equiangular lines in R18 from Latin squares of order 6 and Pasch configurations, realized as affine equiangular sets in an integral overlattice of A53 A14. Unlike the previously known examples, these sets are not strongly maximal. Moreover, some of them have only five distinct Seidel eigenvalues, fewer than any previously known examples.