[1] |
MASSEY J L. Linear codes with complementary duals[J]. Discrete Mathematics, 1992,106-107: 337-342.
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[2] |
GNERI C, ZKAYA B, SOL P. Quasi-cyclic complementary dual codes[J]. Finite Fields and Their Applications, 2016, 42: 67-80.
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[3] |
ALAHMADI A, GNERI C, ZKAYA B, et al. On self-dual double negacirculant codes[J]. Discrete Applied Mathematics, 2017, 222: 205-212.
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[4] |
ALAHMADI A, OZDEMIR F, SOL P. On self-dual double circulant codes[J]. Designs, Codes and Cryptography, 2018, 86:1257-1265.
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[5] |
SHI M J, HUANG D T, SOK L, et al. Double circulant self-dual and LCD codes over Galois rings[EB/OL]. [2018-02-01] https://arxiv.org/abs/1801.06624.
|
[6] |
SHI M J, QIAN L Q, SOL P. On self-dual negacirculant codes of index two and four[J]. Designs, Codes and Cryptography, 2018, 86: 2485-2494.
|
[7] |
LIU Y, SHI M J, SOL P. Two-weight and three-weight codes from trace codes over Fp+ uFp+ vFp+ uvFp [J]. Discrete Mathematics, 2018, 341: 350-357.
|
[8] |
ZHU S X, KAI X S. (1-uv)-constacyclic codes over Fp +uFp+vFp+uvFp[J]. Journal of Systems Science Complexity, 2014, 27(4): 811-816.
|
[9] |
LING S, SOL P. On the algebraic structure of quasi-cyclic codes Ⅰ: Finite fields[J]. IEEE Transactions on Information Theory, 2001, 47: 2751-2760.
|
[10] |
JIA Y. On quasi-twisted codes over finite fields[J]. Finite Fields and Their Applications, 2012, 18: 237-257.
|
[11] |
LING S, SOL P. On the algebraic structure of quasi-cyclic codes Ⅱ: Chain rings[J]. Designs, Codes and Cryptography, 2003, 30(1): 113-130.
|
[12] |
MOREE P. Artin’s primitive root conjecture a survey[J]. Integers, 2012, 10(6): 1305-1416.
|
[13] |
HOOLEY C. On Artin’s conjecture[J]. Journal Für Die Reine Und Angewandte Mathematik, 1967, 225: 209-220.
|
[14] |
HUFFMAN W C, PLESS V. Fundamentals of Error-Correcting Codes [M]. Cambridge: Cambridge University Press, 2003.)
|
[1] |
MASSEY J L. Linear codes with complementary duals[J]. Discrete Mathematics, 1992,106-107: 337-342.
|
[2] |
GNERI C, ZKAYA B, SOL P. Quasi-cyclic complementary dual codes[J]. Finite Fields and Their Applications, 2016, 42: 67-80.
|
[3] |
ALAHMADI A, GNERI C, ZKAYA B, et al. On self-dual double negacirculant codes[J]. Discrete Applied Mathematics, 2017, 222: 205-212.
|
[4] |
ALAHMADI A, OZDEMIR F, SOL P. On self-dual double circulant codes[J]. Designs, Codes and Cryptography, 2018, 86:1257-1265.
|
[5] |
SHI M J, HUANG D T, SOK L, et al. Double circulant self-dual and LCD codes over Galois rings[EB/OL]. [2018-02-01] https://arxiv.org/abs/1801.06624.
|
[6] |
SHI M J, QIAN L Q, SOL P. On self-dual negacirculant codes of index two and four[J]. Designs, Codes and Cryptography, 2018, 86: 2485-2494.
|
[7] |
LIU Y, SHI M J, SOL P. Two-weight and three-weight codes from trace codes over Fp+ uFp+ vFp+ uvFp [J]. Discrete Mathematics, 2018, 341: 350-357.
|
[8] |
ZHU S X, KAI X S. (1-uv)-constacyclic codes over Fp +uFp+vFp+uvFp[J]. Journal of Systems Science Complexity, 2014, 27(4): 811-816.
|
[9] |
LING S, SOL P. On the algebraic structure of quasi-cyclic codes Ⅰ: Finite fields[J]. IEEE Transactions on Information Theory, 2001, 47: 2751-2760.
|
[10] |
JIA Y. On quasi-twisted codes over finite fields[J]. Finite Fields and Their Applications, 2012, 18: 237-257.
|
[11] |
LING S, SOL P. On the algebraic structure of quasi-cyclic codes Ⅱ: Chain rings[J]. Designs, Codes and Cryptography, 2003, 30(1): 113-130.
|
[12] |
MOREE P. Artin’s primitive root conjecture a survey[J]. Integers, 2012, 10(6): 1305-1416.
|
[13] |
HOOLEY C. On Artin’s conjecture[J]. Journal Für Die Reine Und Angewandte Mathematik, 1967, 225: 209-220.
|
[14] |
HUFFMAN W C, PLESS V. Fundamentals of Error-Correcting Codes [M]. Cambridge: Cambridge University Press, 2003.)
|