关于纠错码的数目

IF 0.9 4区 数学 Q3 COMPUTER SCIENCE, THEORY & METHODS Combinatorics, Probability & Computing Pub Date : 2023-06-09 DOI:10.1017/s0963548323000111
Dingding Dong, Nitya Mani, Yufei Zhao
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引用次数: 0

摘要

摘要对于一个固定的$q$,对于所有$t \leq (1 - q^{-1})n - 2\sqrt{n \log n}$,长度为$n$的$q$ -任意$t$ -纠错码的数量最多为$2^{(1 + o(1)) H_q(n,t)}$,其中$H_q(n, t) = q^n/ V_q(n,t)$为Hamming界,$V_q(n,t)$为半径$t$的Hamming球的基数。这证明了巴洛格、特雷格伦和瓦格纳的一个猜想,他们在$t = o(n^{1/3} (\log n)^{-2/3})$上给出了结果。
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On the number of error correcting codes
Abstract We show that for a fixed $q$ , the number of $q$ -ary $t$ -error correcting codes of length $n$ is at most $2^{(1 + o(1)) H_q(n,t)}$ for all $t \leq (1 - q^{-1})n - 2\sqrt{n \log n}$ , where $H_q(n, t) = q^n/ V_q(n,t)$ is the Hamming bound and $V_q(n,t)$ is the cardinality of the radius $t$ Hamming ball. This proves a conjecture of Balogh, Treglown, and Wagner, who showed the result for $t = o(n^{1/3} (\log n)^{-2/3})$ .
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来源期刊
Combinatorics, Probability & Computing
Combinatorics, Probability & Computing 数学-计算机:理论方法
CiteScore
2.40
自引率
11.10%
发文量
33
审稿时长
6-12 weeks
期刊介绍: Published bimonthly, Combinatorics, Probability & Computing is devoted to the three areas of combinatorics, probability theory and theoretical computer science. Topics covered include classical and algebraic graph theory, extremal set theory, matroid theory, probabilistic methods and random combinatorial structures; combinatorial probability and limit theorems for random combinatorial structures; the theory of algorithms (including complexity theory), randomised algorithms, probabilistic analysis of algorithms, computational learning theory and optimisation.
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