English

On combinatorial structures in linear codes

Information Theory 2023-09-29 v1 math.IT Quantum Physics

Abstract

In this work we show that given a connectivity graph GG of a [[n,k,d]][[n,k,d]] quantum code, there exists {Ki}i,KiG\{K_i\}_i, K_i \subset G, such that iKiΩ(k), KiΩ(d)\sum_i |K_i|\in \Omega(k), \ |K_i| \in \Omega(d), and the KiK_i's are Ω~(k/n)\tilde{\Omega}( \sqrt{{k}/{n}})-expander. If the codes are classical we show instead that the KiK_i's are Ω~(k/n)\tilde{\Omega}\left({{k}/{n}}\right)-expander. We also show converses to these bounds. In particular, we show that the BPT bound for classical codes is tight in all Euclidean dimensions. Finally, we prove structural theorems for graphs with no "dense" subgraphs which might be of independent interest.

Keywords

Cite

@article{arxiv.2309.16411,
  title  = {On combinatorial structures in linear codes},
  author = {Nouédyn Baspin},
  journal= {arXiv preprint arXiv:2309.16411},
  year   = {2023}
}
R2 v1 2026-06-28T12:34:54.080Z