广义二元Rudin-Shapiro序列的非周期性质及二次相函数序列的一些最新结果

S. Stańczak, H. Boche
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引用次数: 9

摘要

本文研究了具有小值自相关和互相关功能的CDMA系统的良好扩频序列设计问题。与常用的最小-最大准则不同,本文采用l/sup / 2/优度准则来评价扩展序列的相关特性。为了激励它,给出了直接证据来证明l/sup 2/标准在CDMA性能方面的效用。下面,将这些准则应用于两种已知的单位量级序列:广义二值Rudin-Shapiro序列和二次相函数序列。众所周知的二元Rudin-Shapiro序列的构造规则是基于从Kronecker序列开始的递归公式。证明了对于原始Rudin-Shapiro序列所得到的l/sup 2/准则的渐近极限(N/spl rarr//spl infin/)对于用相同递推公式得到的任意两个序列,只要初始序列是互补的,也是成立的。对于具有二次相函数的序列,证明了逆优点因子的上界和下界随着阶/spl径向/N+1的减小而减小,表明序列具有良好的自相关特性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Aperiodic properties of generalized binary Rudin-Shapiro sequences and some recent results on sequences with a quadratic phase function
This paper addresses the problem of designing good spreading sequences for CDMA systems that have small-valued auto- and cross-correlation functions. In contrast to the usual mini-max criteria, the l/sup 2/ criteria of goodness are used to assess correlation properties of spreading sequences. To motivate it, direct evidence is given to demonstrate the utility of the l/sup 2/ criteria in the context of CDMA performance. Following, these criteria are applied to two types of known unit-magnitude sequences: generalized binary Rudin-Shapiro sequences, and sequences with quadratic phase function. The construction rule of the well-known binary Rudin-Shapiro sequences is based on a recursion formula that starts with the Kronecker sequences. It is shown that the asymptotic limits (N/spl rarr//spl infin/) of l/sup 2/ criteria obtained for original Rudin-Shapiro sequences are also valid in case of two arbitrary sequences obtained by means of the same recursion formula as long as the initial sequences are complementary. As to the sequences with quadratic phase function, the upper and lower bounds on the inverse merit-factor are proved to decrease with the order /spl radic/N+1, which indicates excellent auto-correlation properties of the sequence.
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