The novel algebraic structure for the cyclic codes, Cyclic Multiplicative Groups (CMGs) over polynomial ring, is proposed in this paper.
The novel algebraic structure for the cyclic codes, Cyclic. Multiplicative Groups (CMGs) over polynomial ring, is proposed in this paper. According to this ...
The novel algebraic structure for the cyclic codes, Cyclic Multiplicative Groups (CMGs) over polynomial ring, is proposed in this paper.
The novel algebraic structure for the cyclic codes, Cyclic Multiplicative Groups (CMGs) over polynomial ring, is proposed in this paper.
The structure of quasicyclic codes was explored by Séguin and others [4], [26], [27], [28], and Tanner [31]. We adopt a new approach based on the construction ...
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WebWe generalise structure theorems of Calderbank and Sloane for linear and cyclic codes over ℤ pa to a finite chain ring. Our results are more detailed and ...
The benefits of this novel approach are twofold. Firstly, we can investigate self- dual quasi-cyclic codes in a systematic way. Secondly, we can decompose ...
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Feb 27, 2024 · The benefits of this novel approach are twofold. Firstly, we can investigate self- dual quasi-cyclic codes in a systematic way. Secondly, we ...
The novel algebraic structure for the cyclic codes, Cyclic Multiplicative Groups (CMGs) over polynomial ring, is proposed in this paper. According to this ...