Abstract: In this paper we study a Numerical Method based on Finite Difference to the Boundary Exact Controllability problem for the Wave Equation. We consider the one-dimensional problem. A regularity result is proven in order to allow us to use the Finite Difference Method. Numerical results are shown and compared to the exact solution of some particular problems, computed by the Fourier Serie
This thesis is devoted to the solution of optimal control problems governed by linear and nonlinear ...
This paper studies (global) exact controllability of abstract semilinear equations. Applications inc...
We propose a finite difference semi-discrete scheme for the approximation of the boundary exact con...
In this paper we study a Numerical Method based on Finite Difference to the Boundary Exact Controlla...
AbstractThe computational approximation of exact boundary controllability problems for the wave equa...
Abstract. Numerical solutions of optimal Dirichlet boundary control problems for linear and semiline...
This paper studies the exact controllability of a finite dimensional system obtained by discretizing...
This essentially numerical study, sets out to investigate various geometrical properties of exact bo...
We consider the linear wave equation with Dirichlet boundary conditions in a bounded interval, and w...
AbstractA unified constructive method is given to establish the local exact boundary controllability...
We propose a numerical method to approximate the exact averaged boundary control of a family of wave...
AbstractIn this paper, a Fourier spectral method is used to reduce the optimal boundary control prob...
In this article we study the exact controllability of a one-dimensional wave equation with mixed b...
This paper studies the exact controllability of a finite dimensional system obtained by discretizing...
AbstractWe present two regularity results concerning the solutions of the wave equation with homogen...
This thesis is devoted to the solution of optimal control problems governed by linear and nonlinear ...
This paper studies (global) exact controllability of abstract semilinear equations. Applications inc...
We propose a finite difference semi-discrete scheme for the approximation of the boundary exact con...
In this paper we study a Numerical Method based on Finite Difference to the Boundary Exact Controlla...
AbstractThe computational approximation of exact boundary controllability problems for the wave equa...
Abstract. Numerical solutions of optimal Dirichlet boundary control problems for linear and semiline...
This paper studies the exact controllability of a finite dimensional system obtained by discretizing...
This essentially numerical study, sets out to investigate various geometrical properties of exact bo...
We consider the linear wave equation with Dirichlet boundary conditions in a bounded interval, and w...
AbstractA unified constructive method is given to establish the local exact boundary controllability...
We propose a numerical method to approximate the exact averaged boundary control of a family of wave...
AbstractIn this paper, a Fourier spectral method is used to reduce the optimal boundary control prob...
In this article we study the exact controllability of a one-dimensional wave equation with mixed b...
This paper studies the exact controllability of a finite dimensional system obtained by discretizing...
AbstractWe present two regularity results concerning the solutions of the wave equation with homogen...
This thesis is devoted to the solution of optimal control problems governed by linear and nonlinear ...
This paper studies (global) exact controllability of abstract semilinear equations. Applications inc...
We propose a finite difference semi-discrete scheme for the approximation of the boundary exact con...