论文信息 - Repeated-Root Isodual Cyclic Codes over Finite Fields

Repeated-Root Isodual Cyclic Codes over Finite Fields

In this paper we give several constructions of cyclic codes over finite fields that are monomially equivalent to their dual, where the characteristic of the field divides the length of the code. These are called repeated-root cyclic isodual codes over finite fields. The constructions are based on the field characteristic, the generator polynomial and the length of the code.

T. Aaron Gulliver | Kenza Guenda | Aicha Batoul

[1] W. Cary Huffman,et al. Fundamentals of Error-Correcting Codes , 1975 .

[2] Masaaki Harada,et al. Isodual Codes over ℤ2k and Isodual Lattices , 2000 .

[3] M. Smid. Duadic codes (Corresp.) , 1987 .

[4] Chaoping Xing,et al. On Self-Dual Cyclic Codes Over Finite Fields , 2011, IEEE Transactions on Information Theory.

[5] Vera Pless,et al. Duadic Codes , 1984, IEEE Trans. Inf. Theory.

[6] T. Aaron Gulliver,et al. On Isodual Cyclic Codes over Finite Fields and Finite Chain Rings: Monomial Equivalence , 2013, ArXiv.

[7] Kenza Guenda. New MDS self-dual codes over finite fields , 2012, Des. Codes Cryptogr..