English

Universal optimality of $T$-avoiding spherical codes and designs

Combinatorics 2026-05-19 v2 Information Theory math.IT Metric Geometry

Abstract

Given an open set T[1,1)T\subset [-1,1), we introduce the concepts of TT-avoiding spherical codes and designs, that is, spherical codes that have no inner products in the set TT. We show that certain codes found in the minimal vectors of the Leech lattice, as well as the minimal vectors of the Barnes--Wall lattice and codes derived from strongly regular graphs, are universally optimal in the restricted class of TT-avoiding codes. We also extend a result of Delsarte--Goethals--Seidel about codes with three inner products α,β,γ\alpha, \beta, \gamma (in our terminology (α,β)(\alpha,\beta)-avoiding γ\gamma-codes). Parallel to the notion of tight spherical designs, we also derive that these codes are minimal (tight) TT-avoiding spherical designs of fixed dimension and strength. In some cases, we also find that codes under consideration have maximal cardinality in their TT-avoiding class for given dimension and minimum distance.

Keywords

Cite

@article{arxiv.2501.13906,
  title  = {Universal optimality of $T$-avoiding spherical codes and designs},
  author = {P. G. Boyvalenkov and D. D. Cherkashin and P. D. Dragnev},
  journal= {arXiv preprint arXiv:2501.13906},
  year   = {2026}
}

Comments

32 pages

R2 v1 2026-06-28T21:15:13.579Z