AbstractWe extend the result of the null controllability property of the heat equation, obtained as limit, when ϵ tends to zero, of the exact controllability of a singularly perturbed damped wave equation depending on a parameter ϵ > 0, described in [1], to bounded domains which satisfy the Bardos-Lebeau-Rauch geometric control condition [2]. We add to the method of Lopez, Zhang and Zuazua in [1] an explicit in ϵ > 0 observability estimate for the singularly perturbed damped wave equation under the Bardos-Lebeau-Rauch geometric control condition. Here the geometric conditions are more optimal than in [1] and the proof is simpler than in [1]. Instead of using global Carleman inequalities as in [1], we apply an integral representation formula
This paper is devoted to recall several recent results concerning the null controllability of some ...
In this thesis, we investigate controllability and observability properties of Partial Differential ...
Earlier version on arXiv:math.AP/0307158Given a control region $\Omega$ on a compact Riemannian mani...
References [CdMZ01, dTZ00] added, abstract modified.We make two remarks about the null-controllabili...
This article is devoted to the analysis of control properties for a heat equation with a singular po...
AbstractWe make two remarks about the null-controllability of the heat equation with Dirichlet condi...
In this paper, we consider the null controllability problem for the semilinear heat equation in an u...
We consider symmetric systems of two wave-type equations only one of them being controlled. The two ...
In this paper we focus on the null controllability problem for the heat equation with the so-called ...
This paper deals with the numerical computation of distributed null controls for the 1D heat equatio...
We address three null controllability problems related to the $1-d$ heat equation. First we show tha...
This paper deals with the numerical computation of boundary null controls for the 1D wave equation w...
In this paper, we study the null controllability of linear heat and wave equations with spatial nonl...
Motivated by two recent works of Micu and Zuazua and Cabanillas, De Menezes and Zuazua, we study t...
Abstract: We study the null-controllability property of the linear heat equation on the half-space w...
This paper is devoted to recall several recent results concerning the null controllability of some ...
In this thesis, we investigate controllability and observability properties of Partial Differential ...
Earlier version on arXiv:math.AP/0307158Given a control region $\Omega$ on a compact Riemannian mani...
References [CdMZ01, dTZ00] added, abstract modified.We make two remarks about the null-controllabili...
This article is devoted to the analysis of control properties for a heat equation with a singular po...
AbstractWe make two remarks about the null-controllability of the heat equation with Dirichlet condi...
In this paper, we consider the null controllability problem for the semilinear heat equation in an u...
We consider symmetric systems of two wave-type equations only one of them being controlled. The two ...
In this paper we focus on the null controllability problem for the heat equation with the so-called ...
This paper deals with the numerical computation of distributed null controls for the 1D heat equatio...
We address three null controllability problems related to the $1-d$ heat equation. First we show tha...
This paper deals with the numerical computation of boundary null controls for the 1D wave equation w...
In this paper, we study the null controllability of linear heat and wave equations with spatial nonl...
Motivated by two recent works of Micu and Zuazua and Cabanillas, De Menezes and Zuazua, we study t...
Abstract: We study the null-controllability property of the linear heat equation on the half-space w...
This paper is devoted to recall several recent results concerning the null controllability of some ...
In this thesis, we investigate controllability and observability properties of Partial Differential ...
Earlier version on arXiv:math.AP/0307158Given a control region $\Omega$ on a compact Riemannian mani...