We consider the iterative solution of algebraic systems, arising in optimal control problems constrained by a partial differential equation with additional box constraints on the state and the control variables, and sparsity imposed on the control. A nonsymmetric two-by-two block preconditioner is analysed and tested for a wide range of problem, regularization and discretization parameters. The constraint equation characterizes convection-diffusion processes
Motivated by an application to energy efficient building, in this thesis optimal control of a linear...
We consider the iterative solution of the linear systems arising from four convection-diffusion mode...
The fast iterative solution of optimal control problems, and in particular PDE-constrained optimizat...
We consider the iterative solution of algebraic systems, arising in optimal control problems constra...
The governing dynamics of simple and complex processes, whether physical, biological, social, econom...
Optimal control problems for the heat equation with pointwise bilateral control-state constraints ar...
Many real-life applications such as the shape optimization of technological devices, the identificat...
We study a posteriori error estimates for the numerical approximations of state constrained optimal ...
Solving problems regarding the optimal control of partial differential equations (PDEs)—also known ...
Solving problems regarding the optimal control of partial differential equations (PDEs)-also known a...
We study the numerical solution of control constrained optimal control problems governed by a system...
In this thesis, we develop preconditioned iterative methods for the solution of matrix systems arisi...
In this manuscript, we describe effective solvers for the optimal control of stabilized convectiondi...
In this thesis we consider the numerical treatment of mixed-integer optimal control problems governe...
PDE-constrained optimization problems are a class of problems which have attracted much recent atten...
Motivated by an application to energy efficient building, in this thesis optimal control of a linear...
We consider the iterative solution of the linear systems arising from four convection-diffusion mode...
The fast iterative solution of optimal control problems, and in particular PDE-constrained optimizat...
We consider the iterative solution of algebraic systems, arising in optimal control problems constra...
The governing dynamics of simple and complex processes, whether physical, biological, social, econom...
Optimal control problems for the heat equation with pointwise bilateral control-state constraints ar...
Many real-life applications such as the shape optimization of technological devices, the identificat...
We study a posteriori error estimates for the numerical approximations of state constrained optimal ...
Solving problems regarding the optimal control of partial differential equations (PDEs)—also known ...
Solving problems regarding the optimal control of partial differential equations (PDEs)-also known a...
We study the numerical solution of control constrained optimal control problems governed by a system...
In this thesis, we develop preconditioned iterative methods for the solution of matrix systems arisi...
In this manuscript, we describe effective solvers for the optimal control of stabilized convectiondi...
In this thesis we consider the numerical treatment of mixed-integer optimal control problems governe...
PDE-constrained optimization problems are a class of problems which have attracted much recent atten...
Motivated by an application to energy efficient building, in this thesis optimal control of a linear...
We consider the iterative solution of the linear systems arising from four convection-diffusion mode...
The fast iterative solution of optimal control problems, and in particular PDE-constrained optimizat...