New constructions of MSRD codes

Umberto Martínez-Peñas
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Abstract

In this work, we provide four methods for constructing new maximum sum-rank distance (MSRD) codes. The first method, a variant of cartesian products, allows faster decoding than known MSRD codes of the same parameters. The other three methods allow us to extend or modify existing MSRD codes in order to obtain new explicit MSRD codes for sets of matrix sizes (numbers of rows and columns in different blocks) that were not attainable by previous constructions. In this way, we show that MSRD codes exist (by giving explicit constructions) for new ranges of parameters, in particular with different numbers of rows and columns at different positions.

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MSRD 代码的新结构
在这项工作中,我们提供了四种构建新的最大和秩距离(MSRD)编码的方法。第一种方法是笛卡尔乘积的一种变体,与相同参数的已知 MSRD 码相比,它的解码速度更快。其他三种方法允许我们扩展或修改现有的 MSRD 码,以获得新的显式 MSRD 码,适用于矩阵大小(不同块中的行数和列数)的集合,而这些集合是以前的构造无法实现的。通过这种方法,我们证明了 MSRD 代码(通过给出明确的构造)适用于新的参数范围,特别是不同位置的不同行数和列数。
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自引率
11.50%
发文量
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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