English

Strict Half-Singleton Bound, Strict Direct Upper Bound for Linear Insertion-Deletion Codes and Optimal Codes

Information Theory 2022-06-02 v1 math.IT

Abstract

Insertion-deletion codes (insdel codes for short) are used for correcting synchronization errors in communications, and in other many interesting fields such as DNA storage, date analysis, race-track memory error correction and language processing, and have recently gained a lot of attention. To determine the insdel distances of linear codes is a very challenging problem. The half-Singleton bound on the insdel distances of linear codes due to Cheng-Guruswami-Haeupler-Li is a basic upper bound on the insertion-deletion error-correcting capabilities of linear codes. On the other hand the natural direct upper bound dI(C)2dH(C)d_I(\mathcal C) \leq 2d_H(\mathcal C) is valid for any insdel code. In this paper, for a linear insdel code C\mathcal C we propose a strict half-Singleton upper bound dI(C)2(n2k+1)d_I(\mathcal C) \leq 2(n-2k+1) if C\mathcal C does not contain the codeword with all 1s, and a stronger direct upper bound dI(C)2(dH(C)t)d_I(\mathcal C) \leq 2(d_H(\mathcal C)-t) under a weak condition, where t1t\geq 1 is a positive integer determined by the generator matrix. We also give optimal linear insdel codes attaining our strict half-Singleton bound and direct upper bound, and show that the code length of optimal binary linear insdel codes with respect to the (strict) half-Singleton bound is about twice the dimension. Interestingly explicit optimal linear insdel codes attaining the (strict) half-Singleton bound, with the code length being independent of the finite field size, are given.

Keywords

Cite

@article{arxiv.2206.00287,
  title  = {Strict Half-Singleton Bound, Strict Direct Upper Bound for Linear Insertion-Deletion Codes and Optimal Codes},
  author = {Qinqin Ji and Dabin Zheng and Hao Chen and Xiaoqiang Wang},
  journal= {arXiv preprint arXiv:2206.00287},
  year   = {2022}
}
R2 v1 2026-06-24T11:35:35.512Z