Group codes over crystallographic point groups

Yanyan Gao, Xiaomeng Zhu
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Abstract

Consider a finite field \({\mathbb {F}}_{q}\) with characteristic p, where G is a crystallographic point group satisfying \(p \not \mid |G|\) and \(q=p^n\). In this paper, we propose studying group codes in the crystallographic point group algebras \({\mathbb {F}}_{q}G\) for the point groups \(C_{2h}\), \(C_{6v}\), and \(D_{6h}\). We compute the unique (linear and nonlinear) idempotents of \({\mathbb {F}}_{q}G\) that correspond to the characters of the crystallographic point groups. These idempotents play a crucial role in characterizing the properties of the group codes. Based on the above results, we characterize the minimum distances and dimensions of the group codes. This provides valuable information about the error-correcting capabilities and the amount of information that can be transmitted through these codes. Furthermore, we construct MDS (Maximum Distance Separable) group codes and almost MDS group codes.

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晶体学点群上的群编码
考虑一个特征为 p 的有限域 \({\mathbb {F}}_{q}\) ,其中 G 是一个满足 \(p \not \mid |G|\) 和 \(q=p^n\) 的结晶点群。在本文中,我们提出在晶体学点群代数中研究点群 \(C_{2h}\)、\(C_{6v}\)和\(D_{6h}\)的群编码。我们计算了 \({\mathbb {F}}_{q}G\) 的唯一(线性和非线性)幂函数,这些幂函数与晶体学点群的特征相对应。这些幂等子在描述群编码的性质时起着至关重要的作用。基于上述结果,我们确定了群码的最小距离和维数。这提供了有关纠错能力和通过这些编码可传输信息量的宝贵信息。此外,我们还构建了 MDS(最大距离可分离)分组码和近似 MDS 分组码。
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11.50%
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352
期刊介绍: Computational & Applied Mathematics began to be published in 1981. This journal was conceived as the main scientific publication of SBMAC (Brazilian Society of Computational and Applied Mathematics). The objective of the journal is the publication of original research in Applied and Computational Mathematics, with interfaces in Physics, Engineering, Chemistry, Biology, Operations Research, Statistics, Social Sciences and Economy. The journal has the usual quality standards of scientific international journals and we aim high level of contributions in terms of originality, depth and relevance.
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