In this paper, we introduce the neighborhood of binary self-dual codes. Further, we show that for codelength divisible by $8$ such a neighborhood consists of three self-dual codes, two of them are doubly-even and one is always singly-even. We investigate the relationship between neighboring codes. Finally, we prove that no better Type I code exists than the best possible Type II code of the same length.
翻译:在本文中,我们引入了二元自定义代码的周边。 此外,我们显示,对于代码长度除以8美元,这样的邻里由三种自定义代码组成,其中两种是双双代码,一种是单对齐代码。我们调查了邻里代码之间的关系。最后,我们证明一型代码的存在比二型代码的长度可能最好。
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Arxiv
0+阅读 · 2022年7月30日
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