Output feedback stabilization of linear PDEs with finite dimensional input-output maps and Kelvin-Voigt damping

In this paper, we consider systems of partial differential equations with a finite relative degree between the input and the output. In such systems, an output feedback controller can be constructed to regulate the output with the desired convergence properties. Although the zero dynamics are infinite dimensional, we show that the controller alters the boundary conditions in such a way that it leads to a predictable expansion in the stable operating envelope of the system. Moreover, the expansion of the stable envelope depends only on the boundary conditions and the structure of the PDE, and is independent of the system parameters. The methodology is extended to output tracking and time-varying forcing functions as well. The phenomenon investigated in the paper is quite unique to partial differential equations and without any parallel in systems of ODEs.

[1]  Miroslav Krstic,et al.  Stabilization of an ODE-Schrödinger cascade , 2012, 2012 American Control Conference (ACC).

[2]  Miroslav Krstic,et al.  Control of PDE-ODE cascades with Neumann interconnections , 2010, J. Frankl. Inst..

[3]  Shuxia Tang,et al.  State and output feedback boundary control for a coupled PDE-ODE system , 2011, Syst. Control. Lett..

[4]  Ilan Kroo,et al.  Flutter Suppression Using Micro-Trailing Edge Effectors , 2003 .

[5]  G. Fix,et al.  Asymptotic eigenvalues of Sturm-Liouville systems , 1967 .

[6]  Dewey H. Hodges,et al.  Introduction to Structural Dynamics and Aeroelasticity , 2002 .

[7]  Shuxia Tang,et al.  Stabilization for a coupled PDE-ODE control system , 2011, J. Frankl. Inst..

[8]  Hans Zwart,et al.  An Introduction to Infinite-Dimensional Linear Systems Theory , 1995, Texts in Applied Mathematics.

[9]  Dewey H. Hodges,et al.  Introduction to Structural Dynamics and Aeroelasticity: Contents , 2002 .

[10]  Jakob Kuttenkeuler,et al.  ACTIVE WING FLUTTER SUPPRESSION USING A TRAILING EDGE FLAP , 2002 .

[11]  Qingkai Kong,et al.  Inequalities Among Eigenvalues of Sturm-Liouville Problems , 1999 .

[12]  Miroslav Krstic,et al.  Control of a Tip-Force Destabilized Shear Beam by Observer-Based Boundary Feedback , 2008, SIAM J. Control. Optim..

[13]  D. Owens,et al.  Sufficient conditions for stability of linear time-varying systems , 1987 .

[14]  Miroslav Krstic,et al.  PDE Boundary Control for Flexible Articulated Wings on a Robotic Aircraft , 2013, IEEE Transactions on Robotics.