Optimality of spherical codes via exact semidefinite programming bounds
Abstract
We show that the spectral embeddings of all known triangle-free strongly regular graphs are optimal spherical codes (the new cases are points in dimensions, points in dimensions, and points in dimensions), as are certain mutually unbiased basis arrangements constructed using Kerdock codes in up to dimensions (namely, points in dimensions for ). As a consequence of the latter, we obtain optimality of the Kerdock binary codes of block length , , and , as well as uniqueness for block length . We also prove universal optimality for points on a sphere in dimensions. To prove these results, we use three-point semidefinite programming bounds, for which only a few sharp cases were known previously. To obtain rigorous results, we develop improved techniques for rounding approximate solutions of semidefinite programs to produce exact optimal solutions.
Cite
@article{arxiv.2403.16874,
title = {Optimality of spherical codes via exact semidefinite programming bounds},
author = {Henry Cohn and David de Laat and Nando Leijenhorst},
journal= {arXiv preprint arXiv:2403.16874},
year = {2024}
}
Comments
32 pages, 1 figure