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On triply even binary codes

A triply even code is a binary linear code in which the weight of every codeword is divisible by 8. We show how two doubly even codes of lengths m_1 and m_2 can be combined to make a triply even code of length m_1+m_2, and then prove that every maximal triply even code of length 48 can be obtained by combining two doubly even codes of length 24 in a certain way. Using this result, we show that there are exactly 10 maximal triply even codes of length 48 up to equivalence.

preprint2011arXivOpen access
Koichi BetsumiyaAkihiro Munemasa
math.CO
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Imported metadata coverageMissing code, dataset, citation and institution fields are tracked without dominating the paper.Details
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Koichi BetsumiyaAkihiro Munemasa

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