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Structured Covariance Matrix Estimation With Missing-(Complex) Data for Radar Applications via Expectation-Maximization

Augusto Aubry, Antonio De Maio, Stefano Maranò, Massimo Rosamilia

2021IEEE Transactions on Signal Processing32 citationsDOI

Abstract

Structured covariance matrix estimation in the presence of missing-(complex) data is addressed in this paper with emphasis on radar signal processing applications. After a motivation of the study, the array model is specified and the problem of computing the maximum likelihood estimate of a structured covariance matrix is formulated. A general procedure to optimize the observed-data likelihood function is developed resorting to the expectation-maximization algorithm. The corresponding convergence properties are thoroughly established and the rate of convergence is analyzed. The estimation technique is contextualized for two practically relevant radar problems: beamforming and detection of the number of sources. In the former case an adaptive beamformer leveraging the EM-based estimator is presented; in the latter, detection techniques generalizing the classic Akaike information criterion, minimum description length, and HannanQuinn information criterion, are introduced. Numerical results are finally presented to corroborate the theoretical study.

Topics & Concepts

Akaike information criterionCovariance matrixEstimatorRadarAlgorithmComputer scienceEstimation theoryEstimation of covariance matricesExpectation–maximization algorithmMathematical optimizationCMA-ESBeamformingCovarianceBayesian information criterionLikelihood functionMathematicsMinimum description lengthMissing dataStatisticsMaximum likelihoodArtificial intelligenceTelecommunicationsDirection-of-Arrival Estimation TechniquesRadar Systems and Signal ProcessingTarget Tracking and Data Fusion in Sensor Networks
Structured Covariance Matrix Estimation With Missing-(Complex) Data for Radar Applications via Expectation-Maximization | Litcius