Quaternary quasi-cyclic codes 被引量：1

Quaternary quasi-cyclic codes

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摘要 Quasi-cyclic codes of length mn over Z4 are shown to be equivalent to A-submodules of A^n, where A = Z4[x]/（x^m - 1）. In the case of m being odd, all quasi-cyclic codes are shown to be decomposable into the direct sum of a fixed number of cyclic irreducible A-submodules. Finally the distinct quasi-cyclic codes as well as some specific subclasses are enumerated. Quasi-cyclic codes of length mn over Z4 are shown to be equivalent to A-submodules of A^n, where A = Z4[x]/（x^m - 1）. In the case of m being odd, all quasi-cyclic codes are shown to be decomposable into the direct sum of a fixed number of cyclic irreducible A-submodules. Finally the distinct quasi-cyclic codes as well as some specific subclasses are enumerated.

作者 PEI Jun-ying ZHANG Xue-jun

机构地区 Dept. of Math.

出处《Applied Mathematics(A Journal of Chinese Universities)》 SCIE CSCD 2008年第3期359-365,共7页 高校应用数学学报（英文版）（B辑）

基金 the National Natural Science Foundation of China (60603016)

关键词 quasi-cyclic code primary component TYPE quasi-cyclic code, primary component, type

分类号 O174 [理学—基础数学]

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参考文献8

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Applied Mathematics(A Journal of Chinese Universities)

2008年第3期

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Quaternary quasi-cyclic codes 被引量：1

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