On linear codes whose hermitian hulls are MDS
Hermitian hulls of linear codes are interesting for theoretical and practical reasons alike. In terms of recent application, linear codes whose hulls meet certain conditions have been utilized as ingredients to construct entanglement-assisted quantum error correcting codes. This family of quantum co...
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sg-ntu-dr.10356-1749972024-04-22T15:36:38Z On linear codes whose hermitian hulls are MDS Luo, Gaojun Sok, Lin Ezerman, Martianus Frederic Ling, San School of Physical and Mathematical Sciences Division of Mathematical Sciences Mathematical Sciences Algebraic geometry codes Hermitian inner product Hull of linear code MDS codes Generalized reed-solomon codes Hermitian hulls of linear codes are interesting for theoretical and practical reasons alike. In terms of recent application, linear codes whose hulls meet certain conditions have been utilized as ingredients to construct entanglement-assisted quantum error correcting codes. This family of quantum codes is often seen as a generalization of quantum stabilizer codes. Theoretically, compared with the Euclidean setup, the Hermitian case is much harder to deal with. Hermitian hulls of MDS linear codes with low dimensions have been explored, mostly from generalized Reed-Solomon codes. Characterizing Hermitian hulls which themselves are MDS appears to be more involved and has not been extensively studied. This paper introduces some tools to study linear codes whose Hermitian hulls are MDS. Using the tools, we then propose explicit constructions of such codes. We consider Hermitian hulls of both Reed-Solomon and non Reed-Solomon types of linear MDS codes. We demonstrate that, given the same Hermitian hull dimensions, the codes from our constructions have dimensions which are larger than those in the literature. Nanyang Technological University Submitted/Accepted version G. Luo, L. Sok, M. F. Ezerman, and S. Ling are supported by Nanyang Technological University Research Grant No. 04INS000047C230GRT01. G. Luo is also supported by Natural Science Foundation of Jiangsu Province Grant No. BK20230867. 2024-04-18T07:35:08Z 2024-04-18T07:35:08Z 2024 Journal Article Luo, G., Sok, L., Ezerman, M. F. & Ling, S. (2024). On linear codes whose hermitian hulls are MDS. IEEE Transactions On Information Theory. https://dx.doi.org/10.1109/TIT.2024.3387316 0018-9448 https://hdl.handle.net/10356/174997 10.1109/TIT.2024.3387316 en 04INS000047C230GRT01 IEEE Transactions on Information Theory © 2024 IEEE. All rights reserved. This article may be downloaded for personal use only. Any other use requires prior permission of the copyright holder. The Version of Record is available online at http://doi.org/10.1109/TIT.2024.3387316. application/pdf |
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Mathematical Sciences Algebraic geometry codes Hermitian inner product Hull of linear code MDS codes Generalized reed-solomon codes |
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Mathematical Sciences Algebraic geometry codes Hermitian inner product Hull of linear code MDS codes Generalized reed-solomon codes Luo, Gaojun Sok, Lin Ezerman, Martianus Frederic Ling, San On linear codes whose hermitian hulls are MDS |
| description |
Hermitian hulls of linear codes are interesting for theoretical and practical reasons alike. In terms of recent application, linear codes whose hulls meet certain conditions have been utilized as ingredients to construct entanglement-assisted quantum error correcting codes. This family of quantum codes is often seen as a generalization of quantum stabilizer codes. Theoretically, compared with the Euclidean setup, the Hermitian case is much harder to deal with. Hermitian hulls of MDS linear codes with low dimensions have been explored, mostly from generalized Reed-Solomon codes. Characterizing Hermitian hulls which themselves are MDS appears to be more involved and has not been extensively studied. This paper introduces some tools to study linear codes whose Hermitian hulls are MDS. Using the tools, we then propose explicit constructions of such codes. We consider Hermitian hulls of both Reed-Solomon and non Reed-Solomon types of linear MDS codes. We demonstrate that, given the same Hermitian hull dimensions, the codes from our constructions have dimensions which are larger than those in the literature. |
| author2 |
School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Luo, Gaojun Sok, Lin Ezerman, Martianus Frederic Ling, San |
| format |
Article |
| author |
Luo, Gaojun Sok, Lin Ezerman, Martianus Frederic Ling, San |
| author_sort |
Luo, Gaojun |
| title |
On linear codes whose hermitian hulls are MDS |
| title_short |
On linear codes whose hermitian hulls are MDS |
| title_full |
On linear codes whose hermitian hulls are MDS |
| title_fullStr |
On linear codes whose hermitian hulls are MDS |
| title_full_unstemmed |
On linear codes whose hermitian hulls are MDS |
| title_sort |
on linear codes whose hermitian hulls are mds |
| publishDate |
2024 |
| url |
https://hdl.handle.net/10356/174997 |
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1800916414532419584 |