Almost Sure Stability of Nonlinear Systems Under Random and Impulsive Sequential Attacks

This article is concerned with the stability problem for a class of Lipschitz-type nonlinear systems in networked environments, which are suffered from random and impulsive deception attacks. The attack is modeled as a randomly destabilizing impulsive sequence, whose impulsive instants and impulsive...

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Bibliographic Details
Published inIEEE transactions on automatic control Vol. 65; no. 9; pp. 3879 - 3886
Main Authors He, Wangli, Qian, Feng, Han, Qing-Long, Chen, Guanrong
Format Journal Article
LanguageEnglish
Published New York IEEE 01.09.2020
The Institute of Electrical and Electronics Engineers, Inc. (IEEE)
Subjects
Almost sure stability
deception attack
Martingales
nonlinear system
Nonlinear systems
Power system stability
randomly impulsive sequence
Sensors
Stability
Stability criteria
State estimation
Stochastic processes
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Summary:This article is concerned with the stability problem for a class of Lipschitz-type nonlinear systems in networked environments, which are suffered from random and impulsive deception attacks. The attack is modeled as a randomly destabilizing impulsive sequence, whose impulsive instants and impulsive gains are both random with only the expectations available. Almost sure stability is ensured based on Doob's Martingale Convergence Theorem. Sufficient conditions are derived for the solution of the nonlinear system to be almost surely stable. An example is given to verify the effectiveness of the theoretical results. It is shown that the random attack will be able to destroy the stability, therefore, a large feedback gain may be necessary.
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content type line 14
ISSN:0018-9286
1558-2523
DOI:10.1109/TAC.2020.2972220