从帕利设计和帕利图中获得的自双码块设计

Pub Date : 2023-12-27 DOI:10.3336/gm.58.2.02

Dean Crnkovi c, Ana Grbac, Andrea v Svob

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引用次数: 0

摘要

2002 年，P. Gaborit 提出了两种使用二次残差的自偶码构造，即所谓的纯构造和有边构造，作为对 Pless 对称码的概括。在本文中，我们进一步研究了使用帕利设计和帕利图的纯构造和有边构造产生自偶码的条件。本文特别关注二元码和三元码。此外，我们还从二元码和三元码中特定权重的码字的支持来构造 \(t\)- 设计。

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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Block designs from self-dual codes obtained from Paley designs and Paley graphs

In 2002, P. Gaborit introduced two constructions of self-dual codes using quadratic residues, so-called pure and bordered construction, as a generalization of the Pless symmetry codes. In this paper, we further study conditions under which the pure and the bordered construction using Paley designs and Paley graphs yield self-dual codes. Special attention is given to the binary and ternary codes. Further, we construct \(t\)-designs from supports of the codewords of a particular weight in the binary and ternary codes obtained.

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