Maximum correntropy square-root cubature Kalman filter with application to SINS/GPS integrated systems.

For a nonlinear system, the cubature Kalman filter (CKF) and its square-root version are useful methods to solve the state estimation problems, and both can obtain good performance in Gaussian noises. However, their performances often degrade significantly in the face of non-Gaussian noises, particularly when the measurements are contaminated by some heavy-tailed impulsive noises. By utilizing the maximum correntropy criterion (MCC) to improve the robust performance instead of traditional minimum mean square error (MMSE) criterion, a new square-root nonlinear filter is proposed in this study, named as the maximum correntropy square-root cubature Kalman filter (MCSCKF). The new filter not only retains the advantage of square-root cubature Kalman filter (SCKF), but also exhibits robust performance against heavy-tailed non-Gaussian noises. A judgment condition that avoids numerical problem is also given. The results of two illustrative examples, especially the SINS/GPS integrated systems, demonstrate the desirable performance of the proposed filter.

[1]  John Weston,et al.  Strapdown Inertial Navigation Technology , 1997 .

[2]  Wang Qi,et al.  SINS/GPS Integrated Navigation for Autonomous Underwater Vehicle with Wavelet Package Analysis and Neural Networks , 2007, Eighth ACIS International Conference on Software Engineering, Artificial Intelligence, Networking, and Parallel/Distributed Computing (SNPD 2007).

[3]  Fredrik Gustafsson,et al.  A Student's t filter for heavy tailed process and measurement noise , 2013, 2013 IEEE International Conference on Acoustics, Speech and Signal Processing.

[4]  V. Miranda,et al.  Entropy and Correntropy Against Minimum Square Error in Offline and Online Three-Day Ahead Wind Power Forecasting , 2009, IEEE Transactions on Power Systems.

[5]  Ienkaran Arasaratnam Cubature Kalman Filtering Theory & Applications , 2009 .

[6]  Jose C. Principe,et al.  Information Theoretic Learning - Renyi's Entropy and Kernel Perspectives , 2010, Information Theoretic Learning.

[7]  Nanning Zheng,et al.  Steady-State Mean-Square Error Analysis for Adaptive Filtering under the Maximum Correntropy Criterion , 2014, IEEE Signal Processing Letters.

[8]  Petar M. Djuric,et al.  Gaussian particle filtering , 2003, IEEE Trans. Signal Process..

[9]  Tang Li-jun Cubature particle filter , 2011 .

[10]  M. V. Kulikova,et al.  Square-root algorithms for maximum correntropy estimation of linear discrete-time systems in presence of non-Gaussian noise , 2016, Syst. Control. Lett..

[11]  Dongpu Cao,et al.  Levenberg–Marquardt Backpropagation Training of Multilayer Neural Networks for State Estimation of a Safety-Critical Cyber-Physical System , 2018, IEEE Transactions on Industrial Informatics.

[12]  Dan Simon,et al.  Kalman filtering based on the maximum correntropy criterion in the presence of non-Gaussian noise , 2016 .

[13]  Seid Miad Zandavi,et al.  Simplex filter: A novel heuristic filter for nonlinear systems state estimation , 2016, Appl. Soft Comput..

[14]  Meng Wang,et al.  Maximum Correntropy Unscented Kalman Filter for Spacecraft Relative State Estimation , 2016, Sensors.

[15]  Mohinder S. Grewal,et al.  Global Positioning Systems, Inertial Navigation, and Integration , 2000 .

[16]  Liming Shi,et al.  Convex Combination of Adaptive Filters under the Maximum Correntropy Criterion in Impulsive Interference , 2014, IEEE Signal Processing Letters.

[17]  Wentao Ma,et al.  Maximum correntropy criterion based sparse adaptive filtering algorithms for robust channel estimation under non-Gaussian environments , 2015, J. Frankl. Inst..

[18]  Nanning Zheng,et al.  Convergence of a Fixed-Point Algorithm under Maximum Correntropy Criterion , 2015, IEEE Signal Processing Letters.

[19]  S. Haykin,et al.  Cubature Kalman Filters , 2009, IEEE Transactions on Automatic Control.

[20]  Dongpu Cao,et al.  Simultaneous Observation of Hybrid States for Cyber-Physical Systems: A Case Study of Electric Vehicle Powertrain , 2018, IEEE Transactions on Cybernetics.

[21]  Hugh F. Durrant-Whyte,et al.  A new method for the nonlinear transformation of means and covariances in filters and estimators , 2000, IEEE Trans. Autom. Control..

[22]  Badong Chen,et al.  Efficient and robust deep learning with Correntropy-induced loss function , 2015, Neural Computing and Applications.

[23]  Badong Chen,et al.  System Parameter Identification: Information Criteria and Algorithms , 2013 .

[24]  Sun Li-qun Application of Integrated Navigation System to Vehicle-Carried Mobile Satellite Communication , 2005 .

[25]  Li Heng,et al.  Error estimation method of SINS based on UKF in terrain-aided navigation , 2011, 2011 International Conference on Mechatronic Science, Electric Engineering and Computer (MEC).

[26]  Ran He,et al.  Robust Principal Component Analysis Based on Maximum Correntropy Criterion , 2011, IEEE Transactions on Image Processing.

[27]  Xi Liu,et al.  > Replace This Line with Your Paper Identification Number (double-click Here to Edit) < , 2022 .

[28]  Xiyuan Chen,et al.  Improved Cubature Kalman Filter for GNSS/INS Based on Transformation of Posterior Sigma-Points Error , 2017, IEEE Transactions on Signal Processing.

[29]  Nasser E. Nahi,et al.  Estimation Theory and Applications , 1969 .

[30]  S. Mitter,et al.  Robust Recursive Estimation in the Presence of Heavy-Tailed Observation Noise , 1994 .

[31]  Nanning Zheng,et al.  Generalized Correntropy for Robust Adaptive Filtering , 2015, IEEE Transactions on Signal Processing.

[32]  Jian Yang,et al.  Recursive robust least squares support vector regression based on maximum correntropy criterion , 2012, Neurocomputing.

[33]  Baiqing Hu,et al.  Unscented Attitude Estimator Based on Dual Attitude Representations , 2015, IEEE Transactions on Instrumentation and Measurement.

[34]  Badong Chen,et al.  Correntropy induced joint power and admission control algorithm for dense small cell network , 2016, IET Commun..

[35]  Badong Chen,et al.  Maximum Correntropy Estimation Is a Smoothed MAP Estimation , 2012, IEEE Signal Processing Letters.

[36]  Xiaolin Gong,et al.  Airborne Earth Observation Positioning and Orientation by SINS/GPS Integration Using CD R-T-S Smoothing , 2013, Journal of Navigation.

[37]  Yonggang Zhang,et al.  Robust student’s t based nonlinear filter and smoother , 2016, IEEE Transactions on Aerospace and Electronic Systems.

[38]  Joel Barnes,et al.  Experimental Analysis of GPS/Pseudolite/INS Integration for Aircraft Precision Approach and Landing , 2008, Journal of Navigation.

[39]  George M. Siouris,et al.  Applied Optimal Control: Optimization, Estimation, and Control , 1979, IEEE Transactions on Systems, Man, and Cybernetics.

[40]  R. E. Kalman,et al.  A New Approach to Linear Filtering and Prediction Problems , 2002 .

[41]  Neil J. Gordon,et al.  A tutorial on particle filters for online nonlinear/non-Gaussian Bayesian tracking , 2002, IEEE Trans. Signal Process..

[42]  Weifeng Liu,et al.  Correntropy: Properties and Applications in Non-Gaussian Signal Processing , 2007, IEEE Transactions on Signal Processing.

[43]  Yonggang Zhang,et al.  Maximum correntropy unscented Kalman and information filters for non-Gaussian measurement noise , 2017, J. Frankl. Inst..