Convex duality is a powerful framework for solving non-smooth optimal control problems. However, for problems set in non-reflexive Banach spaces such as L1(Ω) or BV(Ω), the dual problem is formulated in a space which has difficult measure theoretic structure. The predual problem, on the other hand, can be formulated in a Hilbert space and entails the minimization of a smooth functional with box constraints, for which efficient numerical methods exist. In this work, elliptic control problems with measures and functions of bounded variation as controls are considered. Existence and uniqueness of the corresponding predual problems are discussed, as is the solution of the optimality systems by a semismooth Newton method. Numerical examples illu...
Abstract. We investigate optimal control problems subject to mixed control-state constraints. The ne...
This book introduces the basic concepts of real and functional analysis. It presents the fundamental...
This paper deals with a minimax control problem for semilinear elliptic variational inequal-ities as...
Convex duality is a powerful framework for solving non-smooth optimal control problems. However, for...
Second and higher order dualities for the variational control problems are introduced in general Ban...
In this note, we consider a control theory problem involving a strictly convex energy functional, wh...
AbstractA necessary condition is established for optimality in the case of problems where the constr...
Optimal control problems in measure spaces governed by semilinear elliptic equations are considered....
Optimal control problems in measure spaces governed by elliptic equations are consid-ered for distri...
We present a new duality theory for non-convex variational problems, under possibly mixed Dirichlet ...
The well known De Giorgi result on Hölder continuity for solutions of the Dirichlet problem is re-es...
Abstract. In this paper we consider optimal control problems subject to a semilinear elliptic state ...
We study the minimization of the cost functional $F(\mu) = ||u-u_d||_{L^p(\Omega)}+\alpha||\mu||_{{\...
Optimal control for an elliptic system with pointwise Euclidean norm constraints on the control vari...
Mathematical programs in which the constraint set is partially defined by the solutions of an ellipt...
Abstract. We investigate optimal control problems subject to mixed control-state constraints. The ne...
This book introduces the basic concepts of real and functional analysis. It presents the fundamental...
This paper deals with a minimax control problem for semilinear elliptic variational inequal-ities as...
Convex duality is a powerful framework for solving non-smooth optimal control problems. However, for...
Second and higher order dualities for the variational control problems are introduced in general Ban...
In this note, we consider a control theory problem involving a strictly convex energy functional, wh...
AbstractA necessary condition is established for optimality in the case of problems where the constr...
Optimal control problems in measure spaces governed by semilinear elliptic equations are considered....
Optimal control problems in measure spaces governed by elliptic equations are consid-ered for distri...
We present a new duality theory for non-convex variational problems, under possibly mixed Dirichlet ...
The well known De Giorgi result on Hölder continuity for solutions of the Dirichlet problem is re-es...
Abstract. In this paper we consider optimal control problems subject to a semilinear elliptic state ...
We study the minimization of the cost functional $F(\mu) = ||u-u_d||_{L^p(\Omega)}+\alpha||\mu||_{{\...
Optimal control for an elliptic system with pointwise Euclidean norm constraints on the control vari...
Mathematical programs in which the constraint set is partially defined by the solutions of an ellipt...
Abstract. We investigate optimal control problems subject to mixed control-state constraints. The ne...
This book introduces the basic concepts of real and functional analysis. It presents the fundamental...
This paper deals with a minimax control problem for semilinear elliptic variational inequal-ities as...