Hadamard matrices of order 32 and extremal ternary self-dual codes

Koichi Betsumiya; Masaaki Harada; Hiroshi Kimura

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Hadamard matrices of order 32 and extremal ternary self-dual codes

机译：32阶Hadamard矩阵和极值三元自对偶码

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摘要

A ternary self-dual code can be constructed from a Hadamard matrix of order congruent to 8 modulo 12. In this paper,we show that the Paley-Hadamard matrix is the only Hadamard matrix of order 32 which gives an extremal self-dual code of length 64.This gives a coding theoretic characterization of the Paley-Hadamard matrix of order 32.

机译：可以用与8模为12的阶的Hadamard矩阵构造三进制自对偶码。在本文中，我们证明Paley-Hadamard矩阵是唯一的阶32的Hadamard矩阵，它给出了极值的对偶码。长度为64，这给出了32阶Paley-Hadamard矩阵的编码理论特征。

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来源
《Designs, Codes and Crytography》 |2011年第2期|p.203-214|共12页
作者
Koichi Betsumiya; Masaaki Harada; Hiroshi Kimura;
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作者单位

Graduate School of Science and Technology, Hirosaki University, Hirosaki 036-8561, Japan;

Department of Mathematical Sciences, Yamagata University,Yamagata 990-8560 Japan PRESTO, Japan Science and Technology Agency, Kawaguchi, Saitama 332-0012, Japan;

2900-2 Oka, Fukaya 369-0201, Japan;

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收录信息美国《科学引文索引》(SCI);美国《工程索引》(EI);
原文格式 PDF
正文语种 eng
中图分类
关键词
hadamard matrix; paley-hadamard matrix; extremal self-dual code; ternary code;

机译：哈达玛矩阵;佩利-哈达玛矩阵;极值自对偶码;三进制码;

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专利

1. Hadamard matrices of order 32 and extremal ternary self-dual codes [J] . Koichi Betsumiya, Masaaki Harada, Hiroshi Kimura Designs, Codes and Cryptography . 2011,第2期

机译：32阶Hadamard矩阵和极值三元自对偶码
2. Extremal Ternary Self-Dual Codes Constructed from Negacirculant Matrices [J] . Masaaki Harada, W. Holzmann, H. Kharaghani, Graphs and Combinatorics . 2007,第4期

机译：从负循环矩阵构造的极值三元自对偶代码
3. New extremal Type II ?4-codes of length 32 obtained from Hadamard matrices [J] . Sara Ban, Dean Crnkovi?, Matteo Mravi?, Discrete mathematics, algorithms, and applications . 2019,第5期

机译：新的极值II型？从Hadamard矩阵获得的长度32代码
4. Computer Based Reconstruction of Binary Extremal Self-dual Codes of Length 32 [C] . Jon-Lark Kim Mathematical software - ICMS 2014 . 2014

机译：基于计算机的长度为32的二进制极值自对偶码的重构
5. Existence of certain extremal self-dual codes. [D] . Tsai, Han-Ping. 1992

机译：存在某些极端的自我对偶代码。
6. Finding Hadamard Matrices by a Quantum Annealing Machine [O] . Andriyan Bayu Suksmono, Yuichiro Minato -1

机译：用量子退火机寻找Hadamard矩阵
7. Classification of generalized Hadamard matrices H(6,3) and quaternary Hermitian self-dual codes of length 18 [O] . Harada, Masaaki, Lam, Clement, Munemasa, Akihiro, 2010

机译：广义Hadamard矩阵H（6,3）和第四类的分类 Hermitian自我双重代码，长度为18
8. OSp(32 vertical stroke 1) versus OSp(8 vertical stroke 2) supersymmetric M-brane action from self-dual (2,2) strings [R] . Ketov, S. V. 1996

机译：Osp（32垂直笔划1）与Osp（8垂直笔划2）自对偶（2,2）弦的超对称m-brane动作

Hadamard matrices of order 32 and extremal ternary self-dual codes

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