Trace dual of additive cyclic codes over finite fields

Gyanendra K. Verma, R. K. Sharma
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Abstract

In (Shi et al. Finite Fields Appl. 80, 102087 2022) studied additive cyclic complementary dual codes with respect to trace Euclidean and trace Hermitian inner products over the finite field \(\mathbb {F}_4\). In this article, we extend their results over \(\mathbb {F}_{q^2},\) where q is an odd prime power. We describe the algebraic structure of additive cyclic codes and obtain the dual of a class of these codes with respect to the trace inner products. We also use generating polynomials to construct several examples of additive cyclic codes over \(\mathbb {F}_9.\) These codes are better than linear codes of the same length and size. Furthermore, we describe the subfield codes and the trace codes of these codes as linear cyclic codes over \(\mathbb {F}_q\).

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有限域上可加循环码的迹对偶
Shi et al. 有限域应用 80, 102087 2022)研究了有限域 \(\mathbb {F}_4\) 上关于痕欧几里得和痕赫尔墨特内积的加循环互补对偶码。在本文中,我们扩展了他们在 \(\mathbb {F}_{q^2},\) 上的研究成果,其中 q 是奇素数幂。我们描述了可加循环码的代数结构,并得到了这些码的一类关于迹内积的对偶码。我们还利用生成多项式构造了几个在 \(\mathbb {F}_9.\) 上的加循环码的例子,这些码比相同长度和大小的线性码更好。此外,我们将这些码的子域码和痕码描述为 \(\mathbb {F}_q\) 上的线性循环码。
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