论文信息 - Computational methods for the control of distributed parameter systems

Computational methods for the control of distributed parameter systems

It is shown that care must be taken to ensure that finite dimensional approximations of distributed parameter systems preserve important system properties (i.e., controllability, observability, stabilizability, detectability, etc.). It is noted that, if the particular scheme used to construct the finite dimensional model does not take into account these system properties, the model may not be suitable for control design and analysis. These ideas are illustrated by a simple example, i.e., a cable-spring-mass system.

[1] J. Burns,et al. Chandrasekhar equations and computational algorithms for distributed parameter systems , 1984, The 23rd IEEE Conference on Decision and Control.

[2] Irena Lasiecka. Approximations of riccati equation for abstract boundary control problems applications to hyperbolic systems , 1986 .

[3] J. Gibson. Linear-Quadratic Optimal Control of Hereditary Differential Systems: Infinite Dimensional Riccati Equations and Numerical Approximations , 1983 .

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

[5] M. Crisfield. A quadratic mindlin element using shear constraints , 1984 .

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