第一部分是以循环相关函数为准则对最佳离散信号进行设计。
The designs of the perfect discrete single based on the rule of periodic correlative function are discussed in the first part of the paper.
最佳离散信号一般以循环相关、非循环相关、并元相关等为设计准则。
The design rules of the perfect discrete single usually include periodic correlation and aperiodic correlation, dyadic correlation, etc.
因此,深入研究各种最佳离散信号,在理论上和应用上都有非常重要的意义。
Therefore, the study of the perfect discrete signals is of vital importance both in theory and applications.
这是一类比普通并元码概念更加广泛,但同样具有良好并元相关特性的最佳离散信号。
This is a kind of perfect discrete signal with more extensive concept than the common dyadic code but with the same good dyadic relative properties.
本文提出的几乎最佳二元阵列偶与几乎最佳三元阵列偶的构造方法为最佳离散信号的设计提供了更广的地址码选择范围。
The constructions of the almost perfect binary arrays pairs and the almost perfect ternary arrays pairs provide broader choice range of the address yard.
本文提出的几乎最佳二元阵列偶与几乎最佳三元阵列偶的构造方法为最佳离散信号的设计提供了更广的地址码选择范围。
The constructions of the almost perfect binary arrays pairs and the almost perfect ternary arrays pairs provide broader choice range of the address yard.
应用推荐