论文信息 - Analysis on the Empirical Spectral Distribution of Large Sample Covariance Matrix and Applications for Large Antenna Array Processing

Analysis on the Empirical Spectral Distribution of Large Sample Covariance Matrix and Applications for Large Antenna Array Processing

This paper addresses the asymptotic behavior of a particular type of information-plus-noise-type matrices, where the column and row numbers of the matrices are large and of the same order, while signals have diverged and the time delays of the channel are fixed. We prove that the empirical spectral distribution of the large dimension sample covariance matrix and a well-studied spiked central Wishart matrix converge to the same distribution. As an application, an asymptotic power function is presented for the generalized likelihood ratio statistics for testing the presence of the signal in large array signal processing.

[1] Rendong Ying,et al. Filtered multitone transmission with variable subcarrier bandwidths , 2015, 2015 IEEE International Conference on Communication Workshop (ICCW).

[2] Anja Vogler,et al. An Introduction to Multivariate Statistical Analysis , 2004 .

[3] J. W. Silverstein,et al. Eigenvalues of large sample covariance matrices of spiked population models , 2004, math/0408165.

[4] Harrison H. Zhou,et al. Optimal rates of convergence for covariance matrix estimation , 2010, 1010.3866.

[5] V. Marčenko,et al. DISTRIBUTION OF EIGENVALUES FOR SOME SETS OF RANDOM MATRICES , 1967 .

[6] Jianfeng Yao,et al. A CLT for linear spectral statistics of large random information-plus-noise matrices , 2020 .

[7] Jian-Feng Yao,et al. A note on the CLT of the LSS for sample covariance matrix from a spiked population model , 2013, J. Multivar. Anal..

[8] T. W. Anderson,et al. An Introduction to Multivariate Statistical Analysis , 1959 .

[9] Feng Lin,et al. Generalized FMD Detection for Spectrum Sensing under Low Signal-to-Noise Ratio , 2012, IEEE Communications Letters.

[10] Pascal Bianchi,et al. Performance of Statistical Tests for Single-Source Detection Using Random Matrix Theory , 2009, IEEE Transactions on Information Theory.

[11] Jack W. Silverstein,et al. THE STIELTJES TRANSFORM AND ITS ROLE IN EIGENVALUE BEHAVIOR OF LARGE DIMENSIONAL RANDOM MATRICES , 2009 .