International audienceA theoretical framework and numerical techniques to solve optimal control problems with a spatial trace term in the terminal cost and governed by regularized nonlinear hyperbolic conservation laws are provided. Depending on the spatial dimension, the set at which the optimum of the trace term is reached under the action of the control function can be a point, a curve or a hypersurface. The set is determined by geometric parameters. Theoretically the lack of a convenient functional framework in the context of optimal control for hyperbolic systems leads us to consider a parabolic regularization for the state equation, in order to derive optimality conditions. For deriving these conditions, we use a change of variables e...
Optimal control problems for partial differential equations of evolution, mostly of parabolic type, ...
This thesis presents different control design approaches for stabilizing networks of quasi-linear hy...
We are interested in a class of numerical schemes for the optimization of nonlinear hyperbolic parti...
International audienceA theoretical framework and numerical techniques to solve optimal control prob...
Abstract The optimal control problem for a shallow water equation with a viscous term is analyzed. T...
This paper is concerned with a viscous shallow water equation, which includes both the viscous Camas...
International audienceIn this paper we present a method of optimal control developed in order to cal...
We are interested in the development of a numerical method for solving optimal control problems gove...
Proposed by SIAM Journal on Control and OptimizationInternational audienceWe develop methods of cont...
This brief considers recent results on optimal control and stabilization of systems governed by hype...
In this paper we consider dynamic optimization problems for hyperbolic systems with boundary control...
Abstract. We consider optimal control problems for hyperbolic systems with controls in Neumann bound...
Johannes Andreas SchwaighoferUniversität Innsbruck, Masterarbeit, 2015(VLID)85170
Abstract. We consider the problem of an optimal control of the wave equation with a localized nonlin...
The aim of this paper is to perform sensitivity analysis of optimal control problems defined for the...
Optimal control problems for partial differential equations of evolution, mostly of parabolic type, ...
This thesis presents different control design approaches for stabilizing networks of quasi-linear hy...
We are interested in a class of numerical schemes for the optimization of nonlinear hyperbolic parti...
International audienceA theoretical framework and numerical techniques to solve optimal control prob...
Abstract The optimal control problem for a shallow water equation with a viscous term is analyzed. T...
This paper is concerned with a viscous shallow water equation, which includes both the viscous Camas...
International audienceIn this paper we present a method of optimal control developed in order to cal...
We are interested in the development of a numerical method for solving optimal control problems gove...
Proposed by SIAM Journal on Control and OptimizationInternational audienceWe develop methods of cont...
This brief considers recent results on optimal control and stabilization of systems governed by hype...
In this paper we consider dynamic optimization problems for hyperbolic systems with boundary control...
Abstract. We consider optimal control problems for hyperbolic systems with controls in Neumann bound...
Johannes Andreas SchwaighoferUniversität Innsbruck, Masterarbeit, 2015(VLID)85170
Abstract. We consider the problem of an optimal control of the wave equation with a localized nonlin...
The aim of this paper is to perform sensitivity analysis of optimal control problems defined for the...
Optimal control problems for partial differential equations of evolution, mostly of parabolic type, ...
This thesis presents different control design approaches for stabilizing networks of quasi-linear hy...
We are interested in a class of numerical schemes for the optimization of nonlinear hyperbolic parti...