Matrix-Product Codes over Commutative Rings and Constructions Arising from σ,δ-Codes
A well-known lower bound (over finite fields and some special finite commutative rings) on the Hamming distance of a matrix-product code (MPC) is shown to remain valid over any commutative ring R. A sufficient condition is given, as well, for such a bound to be sharp. It is also shown that an MPC is...
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| Format: | Article |
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Hindawi Limited
2021-01-01
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| Series: | Journal of Mathematics |
| Online Access: | http://dx.doi.org/10.1155/2021/5521067 |
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doaj-d6e66441cf374477adfc2fc785e319382021-03-15T00:00:44ZengHindawi LimitedJournal of Mathematics2314-47852021-01-01202110.1155/2021/5521067Matrix-Product Codes over Commutative Rings and Constructions Arising from σ,δ-CodesMhammed Boulagouaz0Abdulaziz Deajim1Department of MathematicsDepartment of MathematicsA well-known lower bound (over finite fields and some special finite commutative rings) on the Hamming distance of a matrix-product code (MPC) is shown to remain valid over any commutative ring R. A sufficient condition is given, as well, for such a bound to be sharp. It is also shown that an MPC is free when its input codes are all free, in which case a generator matrix is given. If R is finite, a sufficient condition is provided for the dual of an MPC to be an MPC, a generator matrix for such a dual is given, and characterizations of LCD, self-dual, and self-orthogonal MPCs are presented. Finally, the results of this paper are used along with previous results of the authors to construct novel MPCs arising from σ,δ-codes. Some properties of such constructions are also studied.http://dx.doi.org/10.1155/2021/5521067 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Mhammed Boulagouaz Abdulaziz Deajim |
| spellingShingle |
Mhammed Boulagouaz Abdulaziz Deajim Matrix-Product Codes over Commutative Rings and Constructions Arising from σ,δ-Codes Journal of Mathematics |
| author_facet |
Mhammed Boulagouaz Abdulaziz Deajim |
| author_sort |
Mhammed Boulagouaz |
| title |
Matrix-Product Codes over Commutative Rings and Constructions Arising from σ,δ-Codes |
| title_short |
Matrix-Product Codes over Commutative Rings and Constructions Arising from σ,δ-Codes |
| title_full |
Matrix-Product Codes over Commutative Rings and Constructions Arising from σ,δ-Codes |
| title_fullStr |
Matrix-Product Codes over Commutative Rings and Constructions Arising from σ,δ-Codes |
| title_full_unstemmed |
Matrix-Product Codes over Commutative Rings and Constructions Arising from σ,δ-Codes |
| title_sort |
matrix-product codes over commutative rings and constructions arising from σ,δ-codes |
| publisher |
Hindawi Limited |
| series |
Journal of Mathematics |
| issn |
2314-4785 |
| publishDate |
2021-01-01 |
| description |
A well-known lower bound (over finite fields and some special finite commutative rings) on the Hamming distance of a matrix-product code (MPC) is shown to remain valid over any commutative ring R. A sufficient condition is given, as well, for such a bound to be sharp. It is also shown that an MPC is free when its input codes are all free, in which case a generator matrix is given. If R is finite, a sufficient condition is provided for the dual of an MPC to be an MPC, a generator matrix for such a dual is given, and characterizations of LCD, self-dual, and self-orthogonal MPCs are presented. Finally, the results of this paper are used along with previous results of the authors to construct novel MPCs arising from σ,δ-codes. Some properties of such constructions are also studied. |
| url |
http://dx.doi.org/10.1155/2021/5521067 |
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AT mhammedboulagouaz matrixproductcodesovercommutativeringsandconstructionsarisingfromsdcodes AT abdulazizdeajim matrixproductcodesovercommutativeringsandconstructionsarisingfromsdcodes |
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