Covariance Intersection for Partially Correlated Random Vectors

This paper generalizes the well-known covariance intersection algorithm for distributed estimation and information fusion of random vectors. Our focus will be on partially correlated random vectors. This is motivated by the restriction of the standard covariance intersection algorithm, which treats...

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Bibliographic Details
Published in:IEEE transactions on automatic control 2018-03, Vol.63 (3), p.619-629
Main Authors: Wu, Zongze, Cai, Qianqian, Fu, Minyue
Format: Article
Language:English
Subjects:
Correlation
Covariance intersection (CI)
distributed estimation
Estimation
Lead
multisensor data fusion
multisensor information fusion
Sensor fusion
Upper bound
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Summary:This paper generalizes the well-known covariance intersection algorithm for distributed estimation and information fusion of random vectors. Our focus will be on partially correlated random vectors. This is motivated by the restriction of the standard covariance intersection algorithm, which treats all random vectors with arbitrary cross correlations and the restriction of the classical Kalman filter, which requires complete knowledge of the cross correlations. We first give a result to characterize the conservatism of the standard covariance intersection algorithm. We then generalize the covariance intersection algorithm to two random vectors with a given correlation coefficient bound and show in what sense the resulting covariance bound is tight. Finally, we generalize the notion of correlation coefficient bound to multiple random vectors and provide a covariance intersection algorithm for this general case. Our results will make the already popular covariance intersection more applicable and more accurate for distributed estimation and information fusion problems.
ISSN:0018-9286
1558-2523
DOI:10.1109/TAC.2017.2718243