English

Equiangular lines via improved eigenvalue multiplicity

Combinatorics 2025-02-19 v3

Abstract

A family of lines passing through the origin in an inner product space is said to be equiangular if every pair of lines defines the same angle. In 1973, Lemmens and Seidel raised what has since become a central question in the study of equiangular lines in Euclidean spaces. They asked for the maximum number of equiangular lines in Rr\mathbb{R}^r with a common angle of arccos12k1\arccos{\frac{1}{2k-1}} for any integer k2k \geq 2. We show that the answer equals r1+r1k1,r-1+\left\lfloor\frac{r-1}{k-1}\right\rfloor, provided that rr is at least exponential in a polynomial in kk. This improves upon a recent breakthrough of Jiang, Tidor, Yao, Zhang, and Zhao [Ann. of Math. (2) 194 (2021), no. 3, 729-743], who showed that this holds for rr at least doubly exponential in a polynomial in kk. We also show that for any common angle arccosα\arccos{\alpha}, the answer equals r+o(r)r+o(r) already when rr is superpolynomial in 1/α1/\alpha \to \infty. The key new ingredient underlying our results is an improved upper bound on the multiplicity of the second-largest eigenvalue of a graph. In one of the regimes, this improves and significantly extends a result of McKenzie, Rasmussen, and Srivastava [STOC 2021, pp. 396-407].

Keywords

Cite

@article{arxiv.2409.16219,
  title  = {Equiangular lines via improved eigenvalue multiplicity},
  author = {Igor Balla and Matija Bucić},
  journal= {arXiv preprint arXiv:2409.16219},
  year   = {2025}
}
R2 v1 2026-06-28T18:55:30.751Z