We study exact boundary controllability for a two-dimensional wave equation in a region which is an angular sector of a circle or an angular sector of an annular region. The control, of Neumann type, acts on the curved part of the boundary, while in the straight part we impose homogeneous Dirichlet boundary condition. The initial state has finite energy and the control is square integrable. (c) 2005 Elsevier B.V. All rights reserved
We describe some results on the exact boundary controllability of the wave equation on an orientable...
Let OMEGA be an open bounded domain in R**n with sufficiently smooth boundary GAMMA . The authors st...
This paper studies (global) exact controllability of abstract semilinear equations. Applications inc...
In this paper we study exact boundary controllability for a system of two linear wave equations coup...
In this article we study the exact controllability of a one-dimensional wave equation with mixed b...
This essentially numerical study, sets out to investigate various geometrical properties of exact bo...
In this paper we eliminate altogether geometrical conditions that were assumed (even) with control a...
We describe some results on the exact boundary controllability of the wave equation on an orientabl...
AbstractIn this article, we work to discern exact controllability properties of two coupled wave equ...
In this article we study the exact controllability with Neumann boundary controls for a system of l...
We consider the wave equation defined on a smooth bounded domain Ω⊂Rn with boundary Γ=Γ0{n-ary union...
AbstractThe wave equation in an N-dimensional parallelepiped with boundary control equal zero everyw...
We establish exact boundary controllability for the wave equation in a polyhedral domain where a par...
Abstract In this paper, we shall be concerned with interior controllability for a one-dimensional wa...
We consider the linear wave equation with Dirichlet boundary conditions in a bounded interval, and w...
We describe some results on the exact boundary controllability of the wave equation on an orientable...
Let OMEGA be an open bounded domain in R**n with sufficiently smooth boundary GAMMA . The authors st...
This paper studies (global) exact controllability of abstract semilinear equations. Applications inc...
In this paper we study exact boundary controllability for a system of two linear wave equations coup...
In this article we study the exact controllability of a one-dimensional wave equation with mixed b...
This essentially numerical study, sets out to investigate various geometrical properties of exact bo...
In this paper we eliminate altogether geometrical conditions that were assumed (even) with control a...
We describe some results on the exact boundary controllability of the wave equation on an orientabl...
AbstractIn this article, we work to discern exact controllability properties of two coupled wave equ...
In this article we study the exact controllability with Neumann boundary controls for a system of l...
We consider the wave equation defined on a smooth bounded domain Ω⊂Rn with boundary Γ=Γ0{n-ary union...
AbstractThe wave equation in an N-dimensional parallelepiped with boundary control equal zero everyw...
We establish exact boundary controllability for the wave equation in a polyhedral domain where a par...
Abstract In this paper, we shall be concerned with interior controllability for a one-dimensional wa...
We consider the linear wave equation with Dirichlet boundary conditions in a bounded interval, and w...
We describe some results on the exact boundary controllability of the wave equation on an orientable...
Let OMEGA be an open bounded domain in R**n with sufficiently smooth boundary GAMMA . The authors st...
This paper studies (global) exact controllability of abstract semilinear equations. Applications inc...