近场目标方位和距离估计的克拉美-罗界研究

doi:10.11999/JEIT150578

摘要
图/表
参考文献(10)
相关文章 (15)

全文: PDF (939 KB)
输出: BibTeX | EndNote (RIS)

摘要

针对现有单源情况下近场目标定位的窄带克拉美-罗界(Cramér-Rao Bound, CRB)都是基于均匀直线阵模型，且没能全面分析其CRB的特性和具体的影响因素。该文首先推导了基于窄带模型的单源费雪信息矩阵，进而通过求舒尔补和雅克比变换，得到非均匀线阵条件下近场测距和测向的非矩阵形式的闭式CRB解析式。通过对该式从阵列相关因素(如阵列结构、阵列孔径等)和目标信号相关因素(如目标信号频率和信噪比等)两方面进行分析，揭示了影响目标角度和距离估计性能的物理因素，为后续阵列及信号的设计提供了理论指导。在最大孔径给定的情况下，可通过设计合理的阵元配置方式，实现最优的测距和测向效果。蒙特卡洛仿真结果验证了理论分析和上述结论的正确性。

	服务

	把本文推荐给朋友
	加入我的书架
	加入引用管理器
	E-mail Alert
	RSS
	作者相关文章
	包涛
	周德云
	李立欣
	胡楚锋

关键词 ：信号处理, 克拉美罗-界, 角度和距离估计, 近场, 源定位, 非均匀线阵, 稀布率

Abstract：

In view of the existing CRB (Cramér-Rao Bound) for near-field single source is based on the uniform linear array, and analyzes less fully the CRB's characteristics and the influence factors of specific. In this paper, non-matrix, closed-form expression of the deterministic CRB for the near-field narrow band model is deduced based on Fisher information matrix, Schur complement and Jacobi transform with non-uniform linear array. The behavior of the performance with respect to some features of interest are discussed, namely, the array geometry, the array aperture, the thinned factor, the target signal frequency and the signal to noise ratio. Through the reasonable array design scheme, the direction and range of the target are both estimated. The Monte-Carlo simulation results validate the effectiveness of the theoretical analysis and the conclusion.

Key words： Signal processing Cramér-Rao bound Direction and range estimation Near field Source localization Non-uniform linear array Thinned factor

收稿日期: 2015-05-15 出版日期: 2016-01-14

PACS:

TN911.7

基金资助:

国家自然科学基金(61201320)，中央高校基本科研业务费专项资金(3102014JCQ01052)，中国博士后科学基金面上项目(2014M552489)，上海航天科技创新基金(SAST201455)

通讯作者: 包涛：女，1983年生，工程师，研究方向为阵列信号中的高分辨率参数估计方法. E-mail: baotao@nwpu.edu.cn

作者简介: 包涛：女，1983年生，工程师，研究方向为阵列信号中的高分辨率参数估计方法. 周德云：男，1964年生，教授，研究方向为航空电子系统，火力与指挥系统，飞行器导航、制导与控制，系统建模、仿真、测试与评估等. 李立欣：男，1979年生，副教授，研究方向为信息网络的信道编码理论及多用户信息传输理论. 胡楚锋：男，1982年生，副教授，研究方向为微波测量及雷达成像、微波遥感.

引用本文:

包涛,周德云,李立欣,胡楚锋. 近场目标方位和距离估计的克拉美-罗界研究[J]. 电子与信息学报, 2016, 38(3): 758-762. BAO Tao, ZHOU Deyun, LI Lixin, HU Chufeng. Cramér-Rao Bound for Near-field Source Localization. JEIT, 2016, 38(3): 758-762.

链接本文:

http://jeit.ie.ac.cn/CN/10.11999/JEIT150578 或 http://jeit.ie.ac.cn/CN/Y2016/V38/I3/758

[1]	郑志东, 袁红刚, 张剑云, 等. 运动双基地MIMO雷达参数估计的克拉美罗界[J]. 电子与信息学报, 2014, 36(11): 2678-2683. doi: 10.3724/SP.J.1146.2013.01895.
	ZHENG Zhidong, YUAN Honggang, ZHANG Jianyun, et al. Cramér-Rao bounds for estimating parameter in the moving bistatic MIMO radar[J]. Journal of Electronics & Information Technology, 2014, 36(11): 2678-2683. doi: 10.3724/SP.J.1146.2013.01895.
[2]	方庆园, 韩勇, 金铭, 等. 基于噪声子空间特征值重构的DOA估计算法[J]. 电子与信息学报, 2014, 36(12): 2876-2881. doi: 10.3724/SP.J.1146.2013.02014.
	FANG Qingyuan, HAN Yong, JIN Ming, et al. DOA estimation based on eigenvalue reconstruction of noise subspace[J]. Journal of Electronics & Information Technology, 2014, 36(12): 2876-2881. doi: 10.3724/SP.J.1146.2013.02014.
[3]	HAARDT M, PESAVENTO M, ROEMER F, et al. Subspace Methods and Exploitation of Special Array Structures, Electronic Reference in Signal Processing: Array and Statistical Signal Processing[M]. Vol. 3, Academic Press Library in Signal Processing. PL: Elsevier Ltd., 2014: 651-717. doi: 10.1016/B978-0-12-411597-2.00015-1.
[4]	ZHANG X, EL KORSO M N, and PESAVENTO M. On the asymptotic resolvability of far-field stochastic sources[C]. Proceedings of the 20th European Signal Processing Conference (EUSIPCO), Bucharest, 2012: 889-893.
[5]	GROSICKI E, ABED MERAIM K, and HUA Y. A weighted linear prediction method for near-field source localization[J]. IEEE Transactions on Signal Processing, 2005, 53(10): 3651-3660. doi: 10.1109/TSP.2005.855100.
[6]	DELMAS J P and GAZZAH H. CRB analysis of near-field source localization using uniform circular arrays[C]. Proceedings of the IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP), Vancouver, 2013: 3396-3400. doi: 10.1109/ICASSP.2013. 6638409.
[7]	BEGRICHE Y, THAMERI M, and ABEDMERAIM K. Exact Cramér Rao bound for near field source localization[C]. Proceedings of the 11th IEEE International Conference on Information Science, Signal Processing and their Applications (ISSPA), Montreal, 2012: 718-721. doi: 10.1109/ISSPA.2012.6310646.
[8]	曾雄飞, 孙贵青, 黄海宁. 水下目标方位估计的克拉美罗界研究[J]. 电子与信息学报, 2013, 35(1): 92-98. doi: 10.3724/ SP.J.1146.2011.01224.
	ZENG Xiongfei, SUN Guiqing, and HUANG Haining.
	Cramér-Rao bound of position estimation for underwater source[J]. Journal of Electronics & Information Technology, 2013, 35(1): 92-98. doi: 10.3724/SP.J.1146.2011.01224.
[9]	EL KORSO M N, BOYER R, RENAUX A, et al. Nonmatrix closed-form expressions of the Cramér-Rao bounds for near-field localization parameters[C]. Proceedings of the IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP), Taipei, 2009: 3277-3280. doi: 10.1109/ICASSP.2009.4960324.
[10]	KAY S M. Fundamentals of Statistical Signal Processing: Estimation Theory[M]. N J, Prentice Hall, 1993, Vol. 1: 147-169.