Add to ORKGDiese Dissertation befasst mit der Minimierung von Funktionalen derForm $int_0 T f (y(t), u(t)) dt$ unter der Restriktion der Wellengleichung.$y_This thesis deals with minimizing functionals of the form$int_0 T f (y(t), u(t)) dt$ subject to the wave equation $y_Stefan ReitererAbweichender Titel laut Übersetzung der Verfasserin/des VerfassersZsfassung in dt. und engl. SpracheGraz, Univ., Diss., 2013OeBB(VLID)22685
The receding horizon control strategy for dynamical systems posed in infinite dimensional spaces is ...
The present study introduces a real-time control algorithm for applications involving energy maximis...
Johannes Andreas SchwaighoferUniversität Innsbruck, Masterarbeit, 2015(VLID)85170
Abstract—We present a receding horizon optimal control approach for the one-dimensional linear wave ...
Stabilization of the wave equation by the receding horizon framework is investigated. Distributed co...
We consider in this paper the homogeneous 2-D wave equation defined on Ω ⊂ R2. Using the Hilbert Uni...
We consider control problems associated with nonlinear wave equa-tions, in which the slope of the ad...
Time optimal control of the wave equation is analyzed on thebasis of a regularized formulation which...
This thesis is devoted to the solution of optimal control problems governed by linear and nonlinear ...
We consider in this paper the homogeneous 1-D wave equation defined on Ω ⊂ R. Using the Hilbert Uniq...
We consider control problems associated with nonlinear wave equations, in which the slope of the adm...
The receding horizon control strategy for dynamical systems posed in infinite dimensional spaces is ...
In this paper we eliminate altogether geometrical conditions that were assumed (even) with control a...
In this Ph.D thesis, we deal with the optimization of the uniform exponential decay rate of the wave...
International audienceA minimum effort optimal control problem for the undamped waveequation is cons...
The receding horizon control strategy for dynamical systems posed in infinite dimensional spaces is ...
The present study introduces a real-time control algorithm for applications involving energy maximis...
Johannes Andreas SchwaighoferUniversität Innsbruck, Masterarbeit, 2015(VLID)85170
Abstract—We present a receding horizon optimal control approach for the one-dimensional linear wave ...
Stabilization of the wave equation by the receding horizon framework is investigated. Distributed co...
We consider in this paper the homogeneous 2-D wave equation defined on Ω ⊂ R2. Using the Hilbert Uni...
We consider control problems associated with nonlinear wave equa-tions, in which the slope of the ad...
Time optimal control of the wave equation is analyzed on thebasis of a regularized formulation which...
This thesis is devoted to the solution of optimal control problems governed by linear and nonlinear ...
We consider in this paper the homogeneous 1-D wave equation defined on Ω ⊂ R. Using the Hilbert Uniq...
We consider control problems associated with nonlinear wave equations, in which the slope of the adm...
The receding horizon control strategy for dynamical systems posed in infinite dimensional spaces is ...
In this paper we eliminate altogether geometrical conditions that were assumed (even) with control a...
In this Ph.D thesis, we deal with the optimization of the uniform exponential decay rate of the wave...
International audienceA minimum effort optimal control problem for the undamped waveequation is cons...
The receding horizon control strategy for dynamical systems posed in infinite dimensional spaces is ...
The present study introduces a real-time control algorithm for applications involving energy maximis...
Johannes Andreas SchwaighoferUniversität Innsbruck, Masterarbeit, 2015(VLID)85170