倾斜对称对偶上的 ACD 编码

Astha Agrawal, R. K. Sharma
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摘要

由于在量子纠错和量子计算中的应用,加法码在代数编码理论中变得越来越重要。文章首先介绍了加法互补对偶(ACD)码在有限无性群上任意对偶方面的一些特性。此外,我们还介绍了一种非对称对偶性子类,称为偏斜对称对偶性。然后,我们精确计算了有限域上的对称和偏斜对称对偶性。我们得到了两个条件:一个是必要充分条件,另一个是必要条件。必要和充分条件是在任意对偶性上加法码是 ACD 码。必要条件是在偏斜对称对偶性上的 ACD 码的生成矩阵。我们提供了斜对称对偶性上 ACD 码的最大可能最小距离的边界。最后,我们发现了一些新的非对称对偶上的四元 ACD 码,其参数优于对称码。
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ACD codes over skew-symmetric dualities

Additive codes have gained importance in algebraic coding theory due to their applications in quantum error correction and quantum computing. The article begins by developing some properties of Additive Complementary Dual (ACD) codes with respect to arbitrary dualities over finite abelian groups. Further, we introduce a subclass of non-symmetric dualities referred to as the skew-symmetric dualities. Then, we precisely count symmetric and skew-symmetric dualities over finite fields. Two conditions have been obtained: one is a necessary and sufficient condition, and the other is a necessary condition. The necessary and sufficient condition is for an additive code to be an ACD code over arbitrary dualities. The necessary condition is on a generator matrix of an ACD code over skew-symmetric dualities. We provide bounds for the highest possible minimum distance of ACD codes over skew-symmetric dualities. Finally, we find some new quaternary ACD codes over non-symmetric dualities with better parameters than the symmetric ones.

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