Stabilization of flexible structures : third working conference Montpellier, France, January 1989
著者
書誌事項
Stabilization of flexible structures : third working conference Montpellier, France, January 1989
(Lecture notes in control and information sciences, 147)
Springer-Verlag, c1990
- : gw
- : us
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注記
"The third working conference "Stabilization of Flexible Structures""--Foreword
Includes bibliograpical references
内容説明・目次
内容説明
This volume contains the proceedings of a conference on optimal control and partial differential equation mechanics, designed specifically for researchers and engineers working in these fields.
目次
Recent work on the scole model.- Mathematical study of large space structures.- Symbolic formulation of dynamic equations for interconnected flexible bodies: The GEMMES software.- Adaptive optics - Shape control of an adaptive mirror.- Energy decay estimates for a beam with nonlinear boundary feedback.- Uniform stabilization of the wave equation with dirichlet-feedback control without geometrical conditions.- Actuators and controllability of distributed systems.- Linear quadratic control problem without stabilizability.- Riccati equations in noncylindrical domains.- Boundary control problems for non-autonomous parabolic systems.- Existence and optimal control for wave equation in moving domain.- Galerkine approximation for wave equation in moving domain.- Further results on exact controllability of the Euler-Bernoulli equation with controls on the dirichlet and neumann boundary conditions.- Some properties of the value function of a nonlinear control problem in infinite dimensions.- Identification of coefficients with bounded variation in the wave equation.- Shape hessian by the velocity method: A Lagrangian approach.- Shape sensitivity analysis of hyperbolic problems.- Differential stability of perturbed optimization with applications to parameter estimation.- A numerical method for drag minimization via the suction and injection of mass through the boundary.- Using the physical properties of systems for control: An illustration.
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