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Generalized Kasami Sequences: The Large Set

Information Theory 2007-07-13 v1 Cryptography and Security math.IT

Abstract

In this paper new binary sequence families Fk\mathcal{F}^k of period 2n12^n-1 are constructed for even nn and any kk with gcd(k,n)=2{\rm gcd}(k,n)=2 if n/2n/2 is odd or gcd(k,n)=1{\rm gcd}(k,n)=1 if n/2n/2 is even. The distribution of their correlation values is completely determined. These families have maximum correlation 2n/2+1+12^{n/2+1}+1 and family size 23n/2+2n/22^{3n/2}+2^{n/2} for odd n/2n/2 or 23n/2+2n/212^{3n/2}+2^{n/2}-1 for even n/2n/2. The construction of the large set of Kasami sequences which is exactly the Fk\mathcal{F}^{k} with k=n/2+1k=n/2+1 is generalized.

Keywords

Cite

@article{arxiv.cs/0511046,
  title  = {Generalized Kasami Sequences: The Large Set},
  author = {Xiangyong Zeng and Qingchong Liu and Lei Hu},
  journal= {arXiv preprint arXiv:cs/0511046},
  year   = {2007}
}

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30 pages