Title :
MUSICs and Cramer-Rao bound in fourth-order cumulant domain
Author :
Wu, Huan ; Bao, Zheng ; Yang, Kehu
Author_Institution :
Inst. of Electron. Eng., Xidian Univ., Xi´´an, China
Abstract :
A unifying asymptotic performance analysis of a class of MUSIC algorithms for direction-of-arrival (DOA) estimation in fourth-order cumulant domain (FOCD-MUSIC) is presented in this paper. A simple and explicit formula for the asymptotic variances of DOA estimation by FOCD-MUSIC´s is given. The Cramer-Rao bound for DOA estimation in fourth-order cumulant domain (FOCD-CRB) is also derived. The performances of three typical FOCD-MUSICs and the conventional covariance-based MUSIC are compared. It is shown that the FOCD-MUSICs are inefficient and they are not superior to the conventional MUSIC algorithm in any case. Nevertheless, the FOCD-MUSICs outperform the conventional MUSIC with reduced variances and improved robustness when the spatial sources are closely spaced and the signal-to-noise ratios (SNRs) are relatively low. Simulations are included to validate the analytical results
Keywords :
covariance analysis; direction-of-arrival estimation; higher order statistics; Cramer-Rao bound; DOA estimation; MUSIC algorithms; asymptotic variances; covariance-based MUSIC; fourth-order cumulant domain; performance; robustness; signal-to-noise ratios; simulations; spatial sources; unifying asymptotic performance analysis; Analytical models; Covariance matrix; Direction of arrival estimation; Multiple signal classification; Performance analysis; Robustness; Sensor arrays; Sensor phenomena and characterization; Signal to noise ratio; Smoothing methods;
Conference_Titel :
Higher-Order Statistics, 1997., Proceedings of the IEEE Signal Processing Workshop on
Conference_Location :
Banff, Alta.
Print_ISBN :
0-8186-8005-9
DOI :
10.1109/HOST.1997.613533
