A Proof of the Weak Simplex Conjecture
Information Theory
2023-11-14 v2 math.IT
Metric Geometry
Abstract
We solve a long-standing open problem about the optimal codebook structure of codes in -dimensional Euclidean space that consist of codewords subject to a codeword energy constraint, in terms of minimizing the average decoding error probability. The conjecture states that optimal codebooks are formed by the vertices of a regular simplex (the -dimensional generalization of a regular tetrahedron) inscribed in the unit sphere. A self-contained proof of this conjecture is provided that hinges on symmetry arguments and leverages a relaxation approach that consists in jointly optimizing the codebook and the decision regions, rather than the codeword locations alone.
Cite
@article{arxiv.2306.13478,
title = {A Proof of the Weak Simplex Conjecture},
author = {Adriano Pastore},
journal= {arXiv preprint arXiv:2306.13478},
year = {2023}
}
Comments
7 pages, submitted for peer review