Minimum-Variance Recursive Filtering Over Sensor Networks With Stochastic Sensor Gain Degradation: Algorithms and Performance Analysis

This paper is concerned with the minimum variance filtering problem for a class of time-varying systems with both additive and multiplicative stochastic noises through a sensor network with a given topology. The measurements collected via the sensor network are subject to stochastic sensor gain degradation, and the gain degradation phenomenon for each individual sensor occurs in a random way governed by a random variable distributed over the interval [0, 1]. The purpose of the addressed problem is to design a distributed filter for each sensor such that the overall estimation error variance is minimized at each time step via a novel recursive algorithm. By solving a set of Riccati-like matrix equations, the parameters of the desired filters are calculated recursively. The performance of the designed filters is analyzed in terms of the boundedness and monotonicity. Specifically, sufficient conditions are obtained under which the estimation error is exponentially bounded in mean square. Moreover, the monotonicity property for the error variance with respect to the sensor gain degradation is thoroughly discussed. Numerical simulations are exploited to illustrate the effectiveness of the proposed filtering algorithm and the performance of the developed filter.

[1]  Giuseppe Carlo Calafiore,et al.  Distributed linear estimation over sensor networks , 2009, Int. J. Control.

[2]  Zidong Wang,et al.  Distributed State Estimation for Discrete-Time Sensor Networks With Randomly Varying Nonlinearities and Missing Measurements , 2011, IEEE Transactions on Neural Networks.

[3]  G. Ferrari-Trecate,et al.  Distributed moving horizon estimation for nonlinear constrained systems , 2010 .

[4]  E. Jury,et al.  ALMOST SURE BOUNDEDNESS OF RANDOMLY SAMPLED SYSTEMS , 1971 .

[5]  Shu-Li Sun,et al.  Distributed optimal fusion steady-state Kalman filter for systems with coloured measurement noises , 2005, Int. J. Syst. Sci..

[6]  Seiichi Nakamori,et al.  Signal estimation with multiple delayed sensors using covariance information , 2010, Digit. Signal Process..

[7]  V A Ugrinovskii,et al.  Distributed robust filtering with H∞ consensus of estimates , 2010, Proceedings of the 2010 American Control Conference.

[8]  Reza Olfati-Saber,et al.  Distributed Kalman filtering for sensor networks , 2007, 2007 46th IEEE Conference on Decision and Control.

[9]  Donghua Zhou,et al.  State estimation for time-delay systems with probabilistic sensor gain reductions , 2008 .

[10]  Soummya Kar,et al.  Distributed Kalman Filtering : Weak Consensus Under Weak Detectability , 2011 .

[11]  Raquel Caballero-Águila,et al.  Least-squares linear filtering using observations coming from multiple sensors with one- or two-step random delay , 2009, Signal Process..

[12]  Huijun Gao,et al.  Distributed Filtering for a Class of Time-Varying Systems Over Sensor Networks With Quantization Errors and Successive Packet Dropouts , 2012, IEEE Transactions on Signal Processing.

[13]  Lihua Xie,et al.  Distributed consensus for multi-agent systems with delays and noises in transmission channels , 2011, Autom..

[14]  A. Manor,et al.  Compensation of scintillation sensor gain variation during temperature transient conditions using signal processing techniques , 2009, 2009 IEEE Nuclear Science Symposium Conference Record (NSS/MIC).

[15]  A. J. Knight,et al.  Spatial processing of signals received by platform mounted sonar , 2002 .

[16]  Ruggero Carli,et al.  Distributed Kalman filtering based on consensus strategies , 2008, IEEE Journal on Selected Areas in Communications.

[17]  Christopher Edwards,et al.  Sliding mode observers for detection and reconstruction of sensor faults , 2002, Autom..

[18]  Yang Liu,et al.  Optimal filtering for networked systems with stochastic sensor gain degradation , 2014, Autom..

[19]  Ali H. Sayed,et al.  Diffusion Strategies for Distributed Kalman Filtering and Smoothing , 2010, IEEE Transactions on Automatic Control.

[20]  Konrad Reif,et al.  Stochastic Stability of the Extended Kalman Filter With Intermittent Observations , 2010, IEEE Transactions on Automatic Control.

[21]  H. F. Durrant-Whyte,et al.  Fully decentralised algorithm for multisensor Kalman filtering , 1991 .

[22]  R. Olfati-Saber,et al.  Consensus Filters for Sensor Networks and Distributed Sensor Fusion , 2005, Proceedings of the 44th IEEE Conference on Decision and Control.

[23]  José M. F. Moura,et al.  Distributing the Kalman Filter for Large-Scale Systems , 2007, IEEE Transactions on Signal Processing.

[24]  Naomi Ehrich Leonard,et al.  IEEE Transactions on Control of Network Systems , 2018, IEEE Transactions on Control of Network Systems.

[25]  Konrad Reif,et al.  Stochastic stability of the discrete-time extended Kalman filter , 1999, IEEE Trans. Autom. Control..

[26]  Martial Hebert,et al.  Background Estimation under Rapid Gain Change in Thermal Imagery , 2005, 2005 IEEE Computer Society Conference on Computer Vision and Pattern Recognition (CVPR'05) - Workshops.

[27]  Yingmin Jia,et al.  Consensus-Based Distributed Multiple Model UKF for Jump Markov Nonlinear Systems , 2012, IEEE Transactions on Automatic Control.

[28]  T. Tarn,et al.  Observers for nonlinear stochastic systems , 1975, 1975 IEEE Conference on Decision and Control including the 14th Symposium on Adaptive Processes.

[29]  Wei Wang,et al.  Distributed H ∞ filtering with consensus in sensor networks: a two-dimensional system-based approach , 2011, Int. J. Syst. Sci..

[30]  Carlo Fischione,et al.  A distributed minimum variance estimator for sensor networks , 2008, IEEE Journal on Selected Areas in Communications.

[31]  Wenwu Yu,et al.  Distributed Consensus Filtering in Sensor Networks , 2009, IEEE Transactions on Systems, Man, and Cybernetics, Part B (Cybernetics).

[32]  Lihua Xie,et al.  Distributed Consensus With Limited Communication Data Rate , 2011, IEEE Transactions on Automatic Control.

[33]  Valery A. Ugrinovskii,et al.  Distributed robust filtering with Hinfinity consensus of estimates , 2011, Autom..

[34]  H. Karimi Robust H 1 Filter Design for Uncertain Linear Systems Over Network with Network-Induced Delays and Output Quantization , 2009 .

[35]  Ali H. Sayed,et al.  Diffusion LMS Strategies for Distributed Estimation , 2010, IEEE Transactions on Signal Processing.

[36]  Xiao Fan Wang,et al.  Optimal consensus-based distributed estimation with intermittent communication , 2011, Int. J. Syst. Sci..