AbstractThe computational approximation of exact boundary controllability problems for the wave equation in two dimensions is studied. A numerical method is defined that is based on the direct solution of optimization problems that are introduced in order to determine unique solutions of the controllability problem. The uniqueness of the discrete finite-difference solutions obtained in this manner is demonstrated. The convergence properties of the method are illustrated through computational experiments. Efficient implementation strategies for the method are also discussed. It is shown that for smooth, minimum L2-norm Dirichlet controls, the method results in convergent approximations without the need to introduce regularization. Furthermor...
AbstractThe wave equation in an N-dimensional parallelepiped with boundary control equal zero everyw...
We consider the one-dimensional linear wave equation with Dirichlet boundary conditions in a bounded...
In this paper we eliminate altogether geometrical conditions that were assumed (even) with control a...
AbstractThe computational approximation of exact boundary controllability problems for the wave equa...
In this paper we study a Numerical Method based on Finite Difference to the Boundary Exact Controlla...
Abstract. Numerical solutions of optimal Dirichlet boundary control problems for linear and semiline...
Abstract: In this paper we study a Numerical Method based on Finite Difference to the Boundary Exact...
This paper studies the numerical approximation of the boundary control for the wave equation in a sq...
AbstractThe problem of computing numerically the boundary exact control for the system of linear ela...
AbstractIn this paper, a Fourier spectral method is used to reduce the optimal boundary control prob...
We analyze the problem of boundary observability of the finite-difference space semidiscretizations ...
This paper studies the exact controllability of a finite dimensional system obtained by discretizing...
This paper deals with the numerical computation of null controls for the wave equation with a potent...
International audienceWe consider a finite-differences semi-discrete scheme for the approximation of...
This paper studies (global) exact controllability of abstract semilinear equations. Applications inc...
AbstractThe wave equation in an N-dimensional parallelepiped with boundary control equal zero everyw...
We consider the one-dimensional linear wave equation with Dirichlet boundary conditions in a bounded...
In this paper we eliminate altogether geometrical conditions that were assumed (even) with control a...
AbstractThe computational approximation of exact boundary controllability problems for the wave equa...
In this paper we study a Numerical Method based on Finite Difference to the Boundary Exact Controlla...
Abstract. Numerical solutions of optimal Dirichlet boundary control problems for linear and semiline...
Abstract: In this paper we study a Numerical Method based on Finite Difference to the Boundary Exact...
This paper studies the numerical approximation of the boundary control for the wave equation in a sq...
AbstractThe problem of computing numerically the boundary exact control for the system of linear ela...
AbstractIn this paper, a Fourier spectral method is used to reduce the optimal boundary control prob...
We analyze the problem of boundary observability of the finite-difference space semidiscretizations ...
This paper studies the exact controllability of a finite dimensional system obtained by discretizing...
This paper deals with the numerical computation of null controls for the wave equation with a potent...
International audienceWe consider a finite-differences semi-discrete scheme for the approximation of...
This paper studies (global) exact controllability of abstract semilinear equations. Applications inc...
AbstractThe wave equation in an N-dimensional parallelepiped with boundary control equal zero everyw...
We consider the one-dimensional linear wave equation with Dirichlet boundary conditions in a bounded...
In this paper we eliminate altogether geometrical conditions that were assumed (even) with control a...