On generalized eigenvector space for target detection in reduced dimensions

The detection and estimation problems with large dimensional vectors frequently appear in the phased array radar systems equipped with, possibly, several hundreds of receiving elements. For such systems, a preprocessing stage reducing the large dimensional input to a manageable dimension is required. The present work shows that the subspace spanned by the generalized eigenvectors of signal and noise covariance matrices is the optimal subspace to this aim from several different viewpoints. Numerical results on the subspace selection for the radar target detection problem is provided to examine the performance of detectors with reduced dimensions.

[1]  Louis L. Scharf,et al.  Low rank detectors for Gaussian random vectors , 1987, IEEE Trans. Acoust. Speech Signal Process..

[2]  Holger Boche,et al.  Downlink MMSE Transceiver Optimization for Multiuser MIMO Systems: Duality and Sum-MSE Minimization , 2007, IEEE Transactions on Signal Processing.

[3]  Don H. Johnson,et al.  Statistical Signal Processing , 2009, Encyclopedia of Biometrics.

[4]  Louis L. Scharf,et al.  A Multistage Representation of the Wiener Filter Based on Orthogonal Projections , 1998, IEEE Trans. Inf. Theory.

[5]  John K. Thomas,et al.  Canonical Coordinates are the Right Coordinates for Low-Rank Gauss–Gauss Detection and Estimation , 2006, IEEE Transactions on Signal Processing.

[6]  Thomas M. Cover,et al.  Elements of Information Theory , 2005 .

[7]  Edward J. Wegman,et al.  Statistical Signal Processing , 1985 .

[8]  Michael D. Zoltowski,et al.  Subspace Expansion and the Equivalence of Conjugate Direction and Multistage Wiener Filters , 2008, IEEE Transactions on Signal Processing.

[9]  Holger Boche,et al.  Downlink MMSE Transceiver Optimization for Multiuser MIMO Systems: MMSE Balancing , 2008, IEEE Transactions on Signal Processing.

[10]  Emre Telatar,et al.  Capacity of Multi-antenna Gaussian Channels , 1999, Eur. Trans. Telecommun..

[11]  John M. Cioffi,et al.  Joint Tx-Rx beamforming design for multicarrier MIMO channels: a unified framework for convex optimization , 2003, IEEE Trans. Signal Process..

[12]  Louis L. Scharf,et al.  Canonical coordinates and the geometry of inference, rate, and capacity , 2000, IEEE Trans. Signal Process..

[13]  P. Stoica,et al.  On MIMO channel capacity: an intuitive discussion , 2005, IEEE Signal Processing Magazine.

[14]  Urbashi Mitra,et al.  On the equivalence of three reduced rank linear estimators with applications to DS-CDMA , 2002, IEEE Trans. Inf. Theory.