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Adaptive Fault Estimation for Hyperbolic PDEs

Author

Listed:
  • Yuan Yuan

    (School of Automatin, Central South University, Changsha 480013, China)

  • Xiaodong Xu

    (School of Automatin, Central South University, Changsha 480013, China)

  • Stevan Dubljevic

    (Department of Chemical & Materials Engineering, University of Alberta, Edmonton, AB T6G 2V4, Canada)

Abstract

The new adaptive fault estimation scheme is proposed for a class of hyperbolic partial differential equations in this paper. The multiplicative actuator and sensor faults are considered. There are two cases that require special consideration: (1). only one type of fault (actuator or sensor) occurs; (2). two types of faults occurred simultaneously. To solve the problem of fault estimation, three challenges need to be solved: (1). No prior information of fault type is known; (2). Unknown faults are always coupled with state and input; (3). Only one boundary measurement is available. The original plant is converted to Observer canonical form . Two filters are proposed and novel adaptive laws are developed to estimate unknown fault parameters. With the help of the proposed update laws, the true state of the faulty plant can be estimated by the proposed observers composed of two filters. By selecting a suitable Lyapunov function, it is proved that under unknown external disturbance, the estimation errors of state parameters and fault parameters decay to arbitrarily small value. Finally, the validity of the proposed observer and adaptive laws is verified by numerical simulation.

Suggested Citation

  • Yuan Yuan & Xiaodong Xu & Stevan Dubljevic, 2021. "Adaptive Fault Estimation for Hyperbolic PDEs," Mathematics, MDPI, vol. 9(14), pages 1-17, July.
  • Handle: RePEc:gam:jmathe:v:9:y:2021:i:14:p:1613-:d:590811
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