Binary sequence/array pairs via diference set pairs: A recursive approach
IF 0.6
Q3 MATHEMATICS
引用次数: 1
Abstract
Binary array pairs with optimal/ideal correlation values and their algebraic counterparts textquotedblleft difference set pairstextquotedblright;(DSPs) in abelian groups are studied. In addition to generalizing known 1-dimensional (sequences) examples, we provide four new recursive constructions, unifying previously obtained ones. Any further advancements in the construction of binary sequences/arrays with optimal/ideal correlation values (equivalently cyclic/abelian difference sets) would give rise to richer classes of DSPs (and hence binary perfect array pairs). Discrete signals arising from DSPs find applications in cryptography, CDMA systems, radar and wireless communications.通过差集对的二进制序列/数组对:一种递归方法
具有最优/理想相关值的二进制数组对及其代数对应物textquotedbylet差集对textquotedByright;研究阿贝尔群中的(DSP). 除了推广已知的一维(序列)例子之外, 我们提供了四种新的递归构造, 统一先前获得的. 在构造具有最佳/理想相关值的二进制序列/阵列(等效循环/阿贝尔差集)方面的任何进一步进步都将产生更丰富的DSP类(从而产生二进制完美阵列对). DSP产生的离散信号在密码学中的应用, CDMA系统, 雷达和无线通信.
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