Linear Codes over the Finite Ring Z15

Linear Codes over the Finite Ring Z15

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摘要 In this paper, the structure of the non-chain ring Z15 is studied. The ideals of the ring Z15 are obtained through its non-units and the Lee weights of elements in Z15 are presented. On this basis, by the Chinese Remainder Theorem, we construct a unique expression of an element in Z15. Further, the Gray mapping from Zn15 to Z2n15 is defined and it’s shown to be distance preserved. The relationship between the minimum Lee weight and the minimum Hamming weight of the linear code over the ring Z15 is also obtained and we prove that the Gray map of the linear code over the ring Z15 is also linear. In this paper, the structure of the non-chain ring Z15 is studied. The ideals of the ring Z15 are obtained through its non-units and the Lee weights of elements in Z15 are presented. On this basis, by the Chinese Remainder Theorem, we construct a unique expression of an element in Z15. Further, the Gray mapping from Zn15 to Z2n15 is defined and it’s shown to be distance preserved. The relationship between the minimum Lee weight and the minimum Hamming weight of the linear code over the ring Z15 is also obtained and we prove that the Gray map of the linear code over the ring Z15 is also linear.

作者 Wensheng Li Lingyu Wan Mengtian Yue Wei Chen Xuedong Zhang

机构地区 Langfang Normal University

出处《Advances in Linear Algebra & Matrix Theory》 2020年第1期1-5,共5页 线性代数与矩阵理论研究进展（英文）

关键词 LEE WEIGHT Hamming WEIGHT GRAY Map Dual Code Lee Weight Hamming Weight Gray Map Dual Code

分类号 O15 [理学—基础数学]

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参考文献1

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