Weighted Measurement Fusion White Noise Deconvolution Filter with Correlated Noise for Multisensor Stochastic Systems

For the multisensor linear discrete time-invariant stochastic control systems with different measurement matrices and correlated noises, the centralized measurement fusion white noise estimators are presented by the linear minimum variance criterion under the condition that noise input matrix is full column rank. They have the expensive computing burden due to the high-dimension extended measurement matrix. To reduce the computing burden, the weighted measurement fusion white noise estimators are presented. It is proved that weighted measurement fusion white noise estimators have the same accuracy as the centralized measurement fusion white noise estimators, so it has global optimality. It can be applied to signal processing in oil seismic exploration. A simulation example for Bernoulli-Gaussian white noise deconvolution filter verifies the effectiveness.

[1]  Jerry M. Mendel,et al.  New Fast Optimal White-Noise Estimators for Deconvolution , 1977 .

[2]  J. Mendel White-noise estimators for seismic data processing in oil exploration , 1977 .

[3]  John Kormylo,et al.  New Fast Optimal White-Noise Estimators for Deconvolution , 1977, IEEE Transactions on Geoscience Electronics.

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

[5]  Peter C. Müller,et al.  Minimum-variance deconvolution for noncausal wavelets , 1994, IEEE Trans. Geosci. Remote. Sens..

[6]  A. J. Fossard,et al.  Modeling and estimation , 1995 .

[7]  C. J. Harris,et al.  Comparison of two measurement fusion methods for Kalman-filter-based multisensor data fusion , 2001 .

[8]  Deng Zil Two-Sensor Information Fusion Optimal White Noise Deconvolution Wiener Filter , 2003 .

[9]  Shu-Li Sun Multi-sensor information fusion white noise filter weighted by scalars based on Kalman predictor , 2004, Autom..

[10]  Zhang Hong-yue Multiple Correlated Measurements Fusion Algorithm and Its Optimality , 2005 .

[11]  Li Yun Multisensor Optimal Information Fusion White Noise Deconvolution Filter , 2005 .

[12]  Z. Deng,et al.  Multisensor Information Fusion White Noise Estimator , 2006, 2006 6th World Congress on Intelligent Control and Automation.

[13]  Ran Chen Correlated Measurement Fusion Steady-state Kalman Filtering Algorithms and Their Optimality , 2008 .

[14]  Zili Deng,et al.  Information fusion steady-state white noise deconvolution estimators with time-delayed measurements and colored measurement noises , 2009 .

[15]  D. Zili Correlated measurement fusion Kalman estimators and their global optimality , 2009 .

[16]  Yuan Gao,et al.  Self-Tuning Multisensor Weighted Measurement Fusion Kalman Filter , 2009, IEEE Transactions on Aerospace and Electronic Systems.

[17]  Sun Shu-li Weighted measurement fusion estimation algorithm with correlated noises and its global optimality , 2010 .

[18]  Lin Yun,et al.  Model of optimal design of logistics network for remanufacturing of waste products , 2010 .

[19]  Xin Wang,et al.  Measurement Feedback Self-Tuning Weighted Measurement Fusion Kalman Filter for Systems with Correlated Noises , 2012, J. Appl. Math..

[20]  Zi-Li Deng,et al.  Self-tuning weighted measurement fusion Kalman filtering algorithm , 2012, Comput. Stat. Data Anal..