English

Nearly Orthogonal Sets over Finite Fields

Computational Geometry 2024-05-21 v2 Discrete Mathematics Information Theory Combinatorics math.IT

Abstract

For a field F\mathbb{F} and integers dd and kk, a set of vectors of Fd\mathbb{F}^d is called kk-nearly orthogonal if its members are non-self-orthogonal and every k+1k+1 of them include an orthogonal pair. We prove that for every prime pp there exists a positive constant δ=δ(p)\delta = \delta (p), such that for every field F\mathbb{F} of characteristic pp and for all integers k2k \geq 2 and dk1/(p1)d \geq k^{1/(p-1)}, there exists a kk-nearly orthogonal set of at least dδk1/(p1)/logkd^{\delta \cdot k^{1/(p-1)}/ \log k} vectors of Fd\mathbb{F}^d. In particular, for the binary field we obtain a set of dΩ(k/logk)d^{\Omega( k /\log k)} vectors, and this is tight up to the logk\log k term in the exponent. For comparison, the best known lower bound over the reals is dΩ(logk/loglogk)d^{\Omega( \log k / \log \log k)} (Alon and Szegedy, Graphs and Combin., 1999). The proof combines probabilistic and spectral arguments.

Keywords

Cite

@article{arxiv.2402.08274,
  title  = {Nearly Orthogonal Sets over Finite Fields},
  author = {Dror Chawin and Ishay Haviv},
  journal= {arXiv preprint arXiv:2402.08274},
  year   = {2024}
}

Comments

19 pages

R2 v1 2026-06-28T14:47:03.188Z