| 2~n周期二元序列的伪随机性质研究 |
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| 引用本文: | 薛庆平. 2~n周期二元序列的伪随机性质研究[J]. 科技信息, 2010, 0(23): 180-182 |
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| 作者姓名: | 薛庆平 |
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| 作者单位: | 郑州大学数学系,河南郑州450044 |
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| 摘 要: | 密码学意义上强的序列不仅应该具有足够高的线性复杂度,而且当少量比特发生变化时不会引起线性复杂度的急剧下降,即具有足够高的k-错线性复杂度。本文研究了一种简单易行的方法计算GF(2)上周期为2n的序列的线性复杂度,给出了k=minerror(Y)时,LCk(Y)的上界,同时,计算了在特殊情况下LCk(Y)的确切表达式。
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| 关 键 词: | 线性复杂度 k-错线性复杂度 多项式重量 |
Investigation on Pseudorandom Properties of Binary 2~n-periodic Sequence |
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| XUE Qing-ping. Investigation on Pseudorandom Properties of Binary 2~n-periodic Sequence[J]. Science, 2010, 0(23): 180-182 |
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| Authors: | XUE Qing-ping |
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| Affiliation: | XUE Qing-ping (Department of Mathematics, Zhengzhou University,Zhengzhou Henan,450044) |
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| Abstract: | Not only should cryptographically strong sequences have a large linear complexity ,but also the change of a few terms should not cause a significant decrease in linear complexity .In this paper ,A fast algorithm for determining the complexity of a binary sequence with period 2 n is determined ,and this way is easy to implement; we give the upper bounds of LCk(Y) when k=min error(Y);In some case , we give the expression of LCk (Y). |
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| Keywords: | Linear complexity k-error linear complexity Polynomial weights |
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