English

Improved Bounds for Codes over Trees

Combinatorics 2025-04-10 v1

Abstract

Codes over trees were introduced recently to bridge graph theory and coding theory with diverse applications in computer science and beyond. A central challenge lies in determining the maximum number of labelled trees over nn nodes with pairwise distance at least dd, denoted by A(n,d)A(n,d), where the distance between any two labelled trees is the minimum number of edit edge operations in order to transform one tree to another. By various tools from graph theory and algebra, we show that when nn is large, A(n,d)=O((Cn)nd)A(n,d)=O((Cn)^{n-d}) for any dn2d\leq n-2, and A(n,d)=Ω((cn)nd)A(n,d)=\Omega((cn)^{n-d}) for any dd linear with nn, where constants c(0,1)c\in(0,1) and C[1/2,1)C\in [1/2,1) depending on dd. Previously, only A(n,d)=O(nnd1)A(n,d)=O(n^{n-d-1}) for fixed dd and A(n,d)=Ω(nn2d)A(n,d)=\Omega(n^{n-2d}) for dn/2d\leq n/2 were known, while the upper bound is improved for any dd and the lower bound is improved for d2nd\geq 2\sqrt{n}. Further, for any fixed integer kk, we prove the existence of codes of size Ω(nk)\Omega(n^k) when nd=o(n)n-d=o(n), and give explicit constructions of codes which show A(n,n4)=Ω(n2)A(n,n-4)=\Omega(n^2) and A(n,n13)=Ω(n3)A(n,n-13)=\Omega(n^3).

Keywords

Cite

@article{arxiv.2504.06556,
  title  = {Improved Bounds for Codes over Trees},
  author = {Yanzhi Li and Wenjie Zhong and Tingting Chen and Xiande Zhang},
  journal= {arXiv preprint arXiv:2504.06556},
  year   = {2025}
}

Comments

15 pages, 2 figures and 3 tables

R2 v1 2026-06-28T22:51:47.667Z