Experimental Confirmation of a PDE-Based Approach to Design of Feedback Controls

Issues regarding the experimental implementation of PDE-based controllers are discussed in this work. While the motivating application involves the reduction of vibration levels for a circular plate through excitation of surface-mounted piezoceramic patches, the general techniques described here will extend to a variety of applications. The initial step is the development of a PDE model which accurately captures the physics of the underlying process. This model is then discretized to yield a vector-valued initial value problem. Optimal control theory is used to determine continuous-time voltages to the patches, and the approximations needed to facilitate discrete-time implementation are addressed. Finally, experimental results demonstrating the control of both transient and steady-state vibrations through these techniques are presented.

[1]  Scott D. Snyder,et al.  Active control of interior noise in model aircraft fuselages using piezoceramic actuators , 1990 .

[2]  J. S. Gibson,et al.  Approximation theory for LQG (Linear-Quadratic-Gaussian) optimal control of flexible structures , 1988 .

[3]  Huibert Kwakernaak,et al.  Linear Optimal Control Systems , 1972 .

[4]  Karl Kunisch,et al.  The linear regulator problem for parabolic systems , 1984 .

[5]  J. W. Murdock,et al.  A unified analysis of both active and passive damping for a plate with piezoelectric transducers , 1993 .

[6]  C. FULLER,et al.  Active control of interior noise in model aircraft fuselages using piezoceramic actuators , 1990 .

[7]  William Hallauer,et al.  Experimental active vibration damping of a plane truss using hybrid actuation , 1989 .

[8]  H. Banks,et al.  Hereditary Control Problems: Numerical Methods Based on Averaging Approximations , 1978 .

[9]  Michael A. Demetriou,et al.  Robustness studies forH∞ feedback control in a structural acoustic model with periodic excitation , 1996 .

[10]  R. Smith A GALERKIN METHOD FOR LINEAR PDE SYSTEMS IN CIRCULAR GEOMETRIES WITH STRUCTURAL ACOUSTIC APPLICATIONS , 1994 .

[11]  Irena Lasiecka Finite Element Approximations of Compensator Design for Analytic Generators with Fully Unbounded Controls/Observations , 1995 .

[12]  B. Craven Control and optimization , 2019, Mathematical Modelling of the Human Cardiovascular System.

[13]  Harvey Thomas Banks,et al.  Vibration suppression with approximate finite dimensional compensators for distributed systems: Computational methods and experimental results , 1994 .

[14]  T. Bailey,et al.  Distributed Piezoelectric-Polymer Active Vibration Control of a Cantilever Beam , 1985 .

[15]  H. T. Banksy,et al.  Approximation in Lqr Problems for Innnite Dimensional Systems with Unbounded Input Operators , 1990 .

[16]  Yun Wang,et al.  PDE-based methodology for modeling, parameter estimation and feedback control in structural and structural acoustic systems , 1994, Smart Structures.

[17]  Ralph C. Smith,et al.  Modeling and Parameter Estimation for an Imperfectly Clamped Plate , 1995 .

[18]  Richard J. Silcox,et al.  Simultaneous Active Control of Flexural and Extensional Waves in Beams , 1990 .

[19]  D. Bernstein,et al.  The optimal projection equations for finite-dimensional fixed-order dynamic compensation of infinite-dimensional systems , 1986 .

[20]  Kazufumi Ito,et al.  Approximation in LQR problems for infinite dimensional systems with unbounded input operators , 1994 .

[21]  J. Lambert Numerical Methods for Ordinary Differential Systems: The Initial Value Problem , 1991 .

[22]  Harvey Thomas Banks,et al.  Approximation methods for control of acoustic/structure models with piezoceramic actuators , 1991 .

[23]  H. Banks Center for Research in Scientific Computationにおける研究活動 , 1999 .

[24]  H. Banks,et al.  Computational Methods for Identiication and Feedback Control in Structures with Piezoceramic Actuators and Sensors Computational Methods for Identiication and Feedback Control in Structures with Piezoceramic Actuators and Sensors , 2007 .

[25]  Irena Lasiecka Galerkin approximations of infinite-dimensional compensators for flexible structures with unbounded control action , 1992 .

[26]  Kazumfumi Lto,et al.  Finite-dimensional compensators for infinite-dimensional systems via Galerkin-type approximation , 1990 .

[27]  J. D'cruz,et al.  The Active Control of Panel Vibrations with Piezoelectric Actuators , 1993 .

[28]  Harvey Thomas Banks,et al.  The estimation of material and patch parameters in a PDE-based circular plate model , 1997 .

[29]  V. Rich Personal communication , 1989, Nature.

[30]  Kazufumi Ito,et al.  Theoretical and Computational Aspects of Feedback in Structural Systems with Piezoceramic Controllers , 1993 .

[31]  I. G. Rosen,et al.  A Spline Based Technique for Computing Riccati Operators and Feedback Controls in Regulator Problems for Delay Equations , 1984 .

[32]  Harvey Thomas Banks,et al.  The modeling of piezoceramic patch interactions with shells, plates, and beams , 1995 .

[33]  G. Da Prato Synthesis of optimal control for an infinite dimensional periodic problem , 1987 .

[34]  Harvey Thomas Banks,et al.  Smart material structures: Modeling, estimation, and control , 1996 .

[35]  Michael A. Demetriou,et al.  An H-infinity/MinMax periodic control in a 2-D structural acoustic model with piezoceramic actuators , 1994 .

[36]  Tamer Başar,et al.  H1-Optimal Control and Related Minimax Design Problems , 1995 .

[37]  Kazufumi Ito,et al.  On nonconvergence of adjoint semigroups for control systems with delays , 1988 .