Optimality Claims for the FML Covariance Estimator with respect to Two Matrix Norms

In this correspondence we prove two interesting properties of the fast maximum likelihood (FML) covariance matrix estimator proposed in [1] under the assumption of zero-mean complex circular Gaussian training data sharing the same covariance matrix. The new properties represent optimality claims regardless of the statistical characterization of the data and, in particular, of the multivariate Gaussian assumption for the observables. The optimality is proved with respect to two cost functions involving either the Frobenius or the spectral norm of an Hermitian matrix.

[1]  A. De Maio,et al.  Robust adaptive radar detection in the presence of steering vector mismatches , 2005, IEEE Transactions on Aerospace and Electronic Systems.

[2]  Charles R. Johnson,et al.  Matrix analysis , 1985, Statistical Inference for Engineers and Data Scientists.

[3]  Aharon Ben-Tal,et al.  Lectures on modern convex optimization , 1987 .

[4]  Antonio De Maio,et al.  On the Invariance, Coincidence, and Statistical Equivalence of the GLRT, Rao Test, and Wald Test , 2010, IEEE Transactions on Signal Processing.

[5]  Karl Gerlach,et al.  Fast converging adaptive processor or a structured covariance matrix , 2000, IEEE Trans. Aerosp. Electron. Syst..

[6]  E. J. Kelly An Adaptive Detection Algorithm , 1986, IEEE Transactions on Aerospace and Electronic Systems.

[7]  William L. Melvin,et al.  Screening among Multivariate Normal Data , 1999 .

[8]  Stephen P. Boyd,et al.  Convex Optimization , 2004, Algorithms and Theory of Computation Handbook.

[9]  Alfonso Farina,et al.  Antenna-Based Signal Processing Techniques for Radar Systems , 1992 .