德利涅-卢斯齐格变上的投影束上的纠错码

arXiv - CS - Information Theory Pub Date : 2024-01-21 DOI:arxiv-2401.11433

Daniel Camazón Portela, Juan Antonio López Ramos

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摘要

本文的目的是给出由 Deligne--Lusztig 曲面上的投影束构造的代数几何纠错码的参数下限。基于密集使用交集理论的方法使我们能够扩展以前从高维变体构造的编码，以及从曲线构造的编码。我们得到了秩为 2$ 的投影束在标准德利尼-鲁兹提格曲面上的一般界限，并给出了一些来自 $A_{2}$ 和 ${}^{2}A_{4}$ 类型曲面的明确例子。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Error-Correcting Codes on Projective Bundles over Deligne-Lusztig varieties

The aim of this article is to give lower bounds on the parameters of algebraic geometric error-correcting codes constructed from projective bundles over Deligne--Lusztig surfaces. The methods based on an intensive use of the intersection theory allow us to extend the codes previously constructed from higher-dimensional varieties, as well as those coming from curves. General bounds are obtained for the case of projective bundles of rank $2$ over standard Deligne-Lusztig surfaces, and some explicit examples coming from surfaces of type $A_{2}$ and ${}^{2}A_{4}$ are given.

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arXiv - CS - Information Theory

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