共查询到16条相似文献,搜索用时 171 毫秒
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基于周期为2m-1的二元伪随机序列,利用交织法构造了一类满足一定条件的周期为2m+1-1的基序列集,进而利用这些基序列集构造得到了一类参数达到Tang-Fan-Matsufuji界的二元最佳低相关区序列集。这类低相关区序列集具有更多的序列数目,应用到准同步CDMA系统可以支持更多的用户。 相似文献
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零相关区非周期互补序列集在多载波码分多址通信系统中有着重要应用.已有的四元零相关区非周期互补序列集构造方法都是基于二元或四元零相关区互补序列集,得到的序列集参数受到初始互补序列集参数的限制.该文给出了一种构造法,利用四元正交序列集来构造四元非周期互补序列集.本文方法得到的序列集参数达到理论界限,并且零相关区长度可以灵活设定以满足不同的应用场合.另外给出了两类基于二元正交矩阵的四元正交序列集的构造方法,得到的四元正交序列集可以用于构造四元零相关区非周期互补序列集.二元正交矩阵存在数目很多,因此本文方法可以为多载波码分多址系统提供大量四元非周期互补序列集. 相似文献
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为解决相互正交互补码集中序列数目受限及多载波码分多址(MC-CDMA)系统信号峰均功率比(PAPR)过高的问题,提出一类具有低列向量PAPR且参数渐进达到最优的非周期二元准互补序列集(QCSS)的构造。通过设计一类新的映射函数集,得到的参数渐进最优的非周期二元QCSS与已有二元QCSS相比具有更多的序列数目。并将正交Golay序列集作为初始矩阵,构造得到的非周期QCSS列向量为Golay序列,进而保证了其列向量PAPR不超过2。实验仿真结果表明,所构造的互补序列集可以有效地将时域MC-CDMA信号PAPR降低到3 dB,同时系统具有良好的误码率性能。 相似文献
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为解决传统互补序列集中序列数目受限的问题,近年来有学者提出集间低相关性完全互补码(CCC,Complete Complementary Code)的概念.集间低相关性的完全互补码具有良好的非周期自相关和互相关特性,作为多小区多载波码分多址(MC-CDMA,Multi-Carrier Code Division Multiple Access)通信系统中的扩频码可有效消除小区内的干扰,同时也可以抑制小区间的干扰.该文提出两类具有集间低相关性的完全互补码集的构造方法,得到的序列集具有以下特性:(1)每个码集都是一个参数为(N,N,N)-CCC的完全互补码集;(2)不同集合的互补序列具有低相关性.将多个完全互补码集合并,可以得到参数达到渐进最优的准互补序列集(QCSS,Quasi-Complementary Sequence Set). 相似文献
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The construction of zero correlation zone (ZCZ) Gaussian integer sequence set was researched.Based on binary orthogonal matrices,ZCZ ternary sequence sets were constructed by adding zeros at first.Then the ternary ZCZ squences were transformed into Gaussian integer sequences by using a perfect Gaussian integer sequence without changing the ideal autocorrelation functions and crosscorrelation functions in the zero correlation zone.The proposed ZCZ Gaussian integer sequence sets are optimal or almost optimal with respect to the Tang-Fan-Matsufuji bound. 相似文献
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Lower Bounds on Correlation of Z-Complementary Code Sets 总被引:1,自引:0,他引:1
A set of binary codes is called a Z-complementary code set if the sum of the autocorrelation functions of the codes involved is zero in the zero correlation zone (ZCZ) except at zero shift. Comparing to the traditional complementary code sets, the Z-complementary code sets not only have more freedom on the code length, but also have much more mates. In this paper, lower bounds on periodic/aperiodic correlation of Z-complementary binary code sets with respect to the number of mates, family size, sequence length, the length of ZCZ, maximum periodic/aperiodic autocorrelation sidelobe inside the ZCZ and maximum periodic/aperiodic crosscorrelation value inside the ZCZ, are derived. The proposed lower bounds provide theoretical criteria for designing, optimizing and choosing Z-complementary code set in applications. 相似文献
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