Structure Analysis on the $k$-error Linear Complexity for $2^n$-periodic Binary Sequences

arXiv: Cryptography and Security Pub Date : 2013-12-24 DOI:10.3934/JIMO.2017016

Jianqin Zhou, Wanquan Liu, Xifeng Wang

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Abstract

In this paper, in order to characterize the critical error linear complexity spectrum (CELCS) for $2^n$-periodic binary sequences, we first propose a decomposition based on the cube theory. Based on the proposed $k$-error cube decomposition, and the famous inclusion-exclusion principle, we obtain the complete characterization of $i$th descent point (critical point) of the k-error linear complexity for $i=2,3$. Second, by using the sieve method and Games-Chan algorithm, we characterize the second descent point (critical point) distribution of the $k$-error linear complexity for $2^n$-periodic binary sequences. As a consequence, we obtain the complete counting functions on the $k$-error linear complexity of $2^n$-periodic binary sequences as the second descent point for $k=3,4$. This is the first time for the second and the third descent points to be completely characterized. In fact, the proposed constructive approach has the potential to be used for constructing $2^n$-periodic binary sequences with the given linear complexity and $k$-error linear complexity (or CELCS), which is a challenging problem to be deserved for further investigation in future.

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$2^n$周期二元序列$k$误差线性复杂度的结构分析

为了表征$2^n$-周期二元序列的临界误差线性复杂度谱(CELCS)，我们首先提出了一种基于立方体理论的分解方法。基于提出的k误差立方分解和著名的包含-不相容原理，我们得到了k误差线性复杂度$i=2,3$的第i个下降点(临界点)的完整表征。其次，利用筛法和game - chan算法，刻画了$2^n$周期二进制序列$k$误差线性复杂度的第二个下降点(临界点)分布。因此，我们得到了$2^n$-周期二进制序列的$k$-误差线性复杂度作为$k=3,4$的第二个下降点的完备计数函数。这是第一次对第二和第三下降点进行完整的描述。事实上，所提出的构造方法有可能用于构造具有给定线性复杂度和$k$误差线性复杂度(CELCS)的$2^n$-周期二元序列，这是一个值得进一步研究的具有挑战性的问题。

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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arXiv: Cryptography and Security

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