Output-Feedback Adaptive Control for Parabolic PDEs with Spatially Varying Coefficients

All of the existing results in adaptive control for parabolic PDEs rely on full state measurement. For the first time, we consider a problem of output feedback stabilization of distributed parameter systems with unknown reaction, advection, and diffusion parameters. Both sensing and actuation are performed at the boundary and the unknown parameters are allowed to be spatially varying. First we construct a special transformation of the original system into the PDE analog of "observer canonical form," with unknown parameters multiplying the measured output. We then use the so-called swapping method for parameter estimation. Input and output filters are implemented so that a dynamic parameterization of the problem is converted into a static parameterization where a gradient estimation algorithm is used. The control gain is computed through the numerical solution of an ordinary integro-differential equation. The results are illustrated by simulations

[1]  M. Krstić,et al.  Adaptive control of Burgers' equation with unknown viscosity , 2001 .

[2]  Aaas News,et al.  Book Reviews , 1893, Buffalo Medical and Surgical Journal.

[3]  Joseph Bentsman,et al.  Reduced spatial order model reference adaptive control of spatially varying distributed parameter systems of parabolic and hyperbolic types , 2001 .

[4]  Mark J. Balas,et al.  Robust Adaptive Control In Hilbert Space , 1989 .

[5]  Mihailo R. Jovanovic,et al.  Lyapunov-based distributed control of systems on lattices , 2005, IEEE Transactions on Automatic Control.

[6]  Keum-Shik Hong,et al.  Direct adaptive control of parabolic systems: algorithm synthesis, and convergence and stability analysis , 1993, Proceedings of 32nd IEEE Conference on Decision and Control.

[7]  Yury Orlov Sliding Mode Observer-Based Synthesis of State Derivative-Free Model Reference Adaptive Control of Distributed Parameter Systems , 2000 .

[8]  Anuradha M. Annaswamy,et al.  Robust Adaptive Control , 1984, 1984 American Control Conference.

[9]  M. Krstić,et al.  Title Closed-Form Boundary State Feedbacks for a Class of 1-D Partial Integro-Differential Equations Permalink , 2004 .

[10]  Stuart Townley,et al.  Adaptive control of infinite-dimensional systems without parameter estimation: an overview , 1997 .

[11]  M. Krstic Lyapunov Adaptive Stabilization of Parabolic PDEs— Part II: Output Feedback and Other Benchmark Problems , 2005, Proceedings of the 44th IEEE Conference on Decision and Control.

[12]  M. Krstić,et al.  Backstepping observers for a class of parabolic PDEs , 2005, Syst. Control. Lett..

[13]  Kevin Barraclough,et al.  I and i , 2001, BMJ : British Medical Journal.

[14]  M. Krstic,et al.  Lyapunov Adaptive Stabilization of Parabolic PDEs— Part I: A Benchmark for Boundary Control , 2005, Proceedings of the 44th IEEE Conference on Decision and Control.

[15]  M. Krstic,et al.  Output Feedback Adaptive Controllers with Swapping Identifiers for Two Unstable PDEs with Infinite Relative Degree , 2005, Proceedings of the 44th IEEE Conference on Decision and Control.

[16]  Keum-Shik Hong,et al.  Direct adaptive control of parabolic systems: algorithm synthesis and convergence and stability analysis , 1994, IEEE Trans. Autom. Control..

[17]  Michael A. Demetriou,et al.  Model Reference Adaptive Control of Distributed Parameter Systems , 1998 .

[18]  M. Krstic,et al.  Passive Identifiers for Boundary Adaptive Control of 3D Reaction-Advection-Diffusion PDEs , 2005, Proceedings of the 44th IEEE Conference on Decision and Control.

[19]  D. Mayne Nonlinear and Adaptive Control Design [Book Review] , 1996, IEEE Transactions on Automatic Control.

[20]  Bassam Bamieh,et al.  Adaptive distributed control of a parabolic system with spatially varying parameters , 1999, Proceedings of the 38th IEEE Conference on Decision and Control (Cat. No.99CH36304).

[21]  Miroslav Krstic,et al.  Lyapunov Adaptive Boundary Control for Parabolic PDEs with Spatially Varying Coefficients , 2006, 2006 American Control Conference.

[22]  Yu.V. Orlov Sliding mode-model reference adaptive control of distributed parameter systems , 1993, Proceedings of 32nd IEEE Conference on Decision and Control.

[23]  A. Polyanin Handbook of Linear Partial Differential Equations for Engineers and Scientists , 2001 .

[24]  Tyrone E. Duncan,et al.  Adaptive Boundary and Point Control of Linear Stochastic Distributed Parameter Systems , 1994 .

[25]  Andrei D. Polyanin,et al.  Polyanin, A. D. and Zaitsev, V. F., Handbook of Nonlinear Partial Differential Equations , Chapman & Hall/CRC, Boca , 2004 .