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Composite Constructions of Self-Dual Codes from Group Rings and New Extremal Self-Dual Binary Codes of Length 68
Dougherty, Steven Gildea, Joe Kaya, Abidin Korban, Adrian
Dougherty, Steven
Gildea, Joe
Kaya, Abidin
Korban, Adrian
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2019-11-30
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Abstract
We describe eight composite constructions from group rings where the orders of
the groups are 4 and 8, which are then applied to find self-dual codes of length 16 over
F4. These codes have binary images with parameters [32, 16, 8] or [32, 16, 6]. These
are lifted to codes over F4 + uF4, to obtain codes with Gray images extremal self-dual
binary codes of length 64. Finally, we use a building-up method over F2 + uF2 to
obtain new extremal binary self-dual codes of length 68. We construct 11 new codes
via the building-up method and 2 new codes by considering possible neighbors.
Citation
Dougherty, S, T., Gildea, J., Korban, A. & Kaya, A. (2019). Composite Constructions of Self-Dual Codes from Group Rings and New Extremal Self-Dual Binary Codes of Length 68. Advances in Mathematics of Communications.
Publisher
American Institute of Mathematical Sciences
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Advances in Mathematics of Communications
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Article
Language
en
Description
This is a pre-copy-editing, author-produced PDF of an article accepted for publication in Advances in Mathematics of Communications following peer review. The definitive publisher-authenticated version Dougherty, S, T., Gildea, J., Korban, A. & Kaya, A. (2019 - forthcoming). Composite Constructions of Self-Dual Codes from Group Rings and New Extremal Self-Dual Binary Codes of Length 68. Advances in Mathematics of Communications, is available online at: 10.3934/amc.2020037.
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1930-5338