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Modified Kalman Filtering for Stochastic Nonlinear Systems Under Non-Gaussian–Lévy Noise and Cyber Attacks

Xiuxiu Ren, Guang‐Hong Yang

2022IEEE Transactions on Systems Man and Cybernetics Systems26 citationsDOI

Abstract

This article studies the filtering problem for a class of stochastic nonlinear system under non-Gaussian–Lévy noise and cyber attacks, where the denial-of-service (DoS) attacks and the false data-injection (FDI) attacks are both considered. Since the covariance of the Lévy noise is unknown and infinite, the standard Kalman filter fails to estimate system states. By exploiting saturation functions, a modified Kalman filter is proposed, where the extremely large values of the measurement outputs caused by the Lévy noises can be clipped. In the presence of Lévy noise and cyber attacks, an upper bound for the error covariance is guaranteed and can be minimized via designing the filter parameter. Besides, a sufficient condition is provided to guarantee the boundedness of the upper bound, and the convergence analysis of the filtering error is presented. Finally, the simulation results are given to verify the algorithm.

Topics & Concepts

Kalman filterCovarianceUpper and lower boundsControl theory (sociology)Computer scienceNonlinear filterGaussian noiseNoise (video)GaussianNonlinear systemExtended Kalman filterConvergence (economics)Filtering problemDenial-of-service attackMathematicsFilter (signal processing)AlgorithmStatisticsFilter designArtificial intelligencePhysicsMathematical analysisEconomic growthControl (management)Image (mathematics)World Wide WebEconomicsComputer visionQuantum mechanicsThe InternetTarget Tracking and Data Fusion in Sensor NetworksFault Detection and Control SystemsStability and Control of Uncertain Systems
Modified Kalman Filtering for Stochastic Nonlinear Systems Under Non-Gaussian–Lévy Noise and Cyber Attacks | Litcius