Approximate generalized Steiner systems and near-optimal constant weight codes

IF 0.9 2区 数学 Q2 MATHEMATICS
Miao Liu , Chong Shangguan
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引用次数: 0

Abstract

Constant weight codes (CWCs) and constant composition codes (CCCs) are two important classes of codes that have been studied extensively in both combinatorics and coding theory for nearly sixty years. In this paper we show that for all fixed odd distances, there exist near-optimal CWCs and CCCs asymptotically achieving the classic Johnson-type upper bounds.

Let Aq(n,d,w) denote the maximum size of q-ary CWCs of length n with constant weight w and minimum distance d. One of our main results shows that for all fixed q,w and odd d, one has limnAq(n,d,w)(nt)=(q1)t(wt), where t=2wd+12. This implies the existence of near-optimal generalized Steiner systems originally introduced by Etzion, and can be viewed as a counterpart of a celebrated result of Rödl on the existence of near-optimal Steiner systems. Note that prior to our work, very little is known about Aq(n,d,w) for q3. A similar result is proved for the maximum size of CCCs.

We provide different proofs for our two main results, based on two strengthenings of the well-known Frankl-Rödl-Pippenger theorem on the existence of near-optimal matchings in hypergraphs: the first proof follows by Kahn's linear programming variation of the above theorem, and the second follows by the recent independent work of Delcourt-Postle, and Glock-Joos-Kim-Kühn-Lichev on the existence of near-optimal matchings avoiding certain forbidden configurations.

We also present several intriguing open questions for future research.

近似广义斯泰纳系统和近优恒定权重码
恒重码(CWC)和恒组成码(CCC)是组合学和编码理论近六十年来广泛研究的两类重要编码。本文证明,对于所有固定奇数距离,存在近似达到经典约翰逊型上界的近优 CWC 和 CCC。让 Aq(n,d,w) 表示长度为 n、权重为 w、距离为 d 的 q-ary CWCs 的最大尺寸。我们的一个主要结果表明,对于所有固定的 q、w 和奇数 d,都有 limn→∞Aq(n,d,w)(nt)=(q-1)t(wt),其中 t=2w-d+12。这意味着最初由埃齐昂提出的近优广义斯坦纳系统的存在,可以看作是罗德尔关于近优斯坦纳系统存在的著名结果的对应物。请注意,在我们的研究之前,人们对 q≥3 时的 Aq(n,d,w) 知之甚少。我们基于著名的弗兰克尔-罗德尔-皮彭格(Frankl-Rödl-Pippenger)超图中近优匹配存在性定理的两个加强版,为我们的两个主要结果提供了不同的证明:第一个证明基于卡恩(Kahn)对上述定理的线性规划变式,第二个证明基于德尔库特-波斯特尔(Delcourt-Postle)和格洛克-朱斯-金-金-利切夫(Glock-Joos-Kim-Kühn-Lichev)最近关于避免某些禁止配置的近优匹配存在性的独立工作。我们还为未来研究提出了几个引人入胜的开放性问题。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
2.90
自引率
9.10%
发文量
94
审稿时长
12 months
期刊介绍: The Journal of Combinatorial Theory publishes original mathematical research concerned with theoretical and physical aspects of the study of finite and discrete structures in all branches of science. Series A is concerned primarily with structures, designs, and applications of combinatorics and is a valuable tool for mathematicians and computer scientists.
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