Abstract. We consider the approximation of a class of exponentially stable infinite dimensional linear systems modelling the damped vibrations of one dimensional vibrating systems or of square plates. It is by now well known that the approximating systems obtained by usual finite element or finite difference are not, in general, uniformly stable with respect to the discretization parameter. Our main result shows that, by adding a suitable numerical viscosity term in the numerical scheme, our approximations are uniformly exponentially stable. This result is then applied to obtain strongly convergent approximations of the solutions of the algebraic Riccati equations associated to an LQR optimal control problem. We next give an application to ...
We present a variational framework based on sesquilinear forms for Galerkin approximation techniques...
In this paper we study approximations to the infinite-horizon quadratic optimal control problem for ...
In this paper we study approximations to the infinite-horizon quadratic optimal control problem for ...
Abstract. We consider the approximation of a class of exponentially stable infinite dimensional line...
Abstract. We consider the approximation of a class of exponentially stable infinite dimensional line...
We consider the approximation of a class of exponentially stable infinite dimensional linear systems...
Uniformly exponentially stable approximations for a class of second order evolution equations. Appli...
We consider time semi-discrete approximations of a class of exponentially stable infinite-dimensiona...
AbstractWe consider time semi-discrete approximations of a class of exponentially stable infinite-di...
In this paper, we consider the approximation of second order evolution equations. It is well known t...
The linear-quadratic (LQ) control problem is considered for a class of infinite-dimensional systems ...
The linear-quadratic (LQ) control problem is considered for a class of infinite-dimensional systems ...
Abstract The aim of this work is to obtain optimal-order error estimates for the LQR (Linear-quadrat...
In this thesis, we study the approximation and stabilization of some evolution equations, using semi...
AbstractWe consider an equation arising in linear viscoelasticity. Recently it has been shown that t...
We present a variational framework based on sesquilinear forms for Galerkin approximation techniques...
In this paper we study approximations to the infinite-horizon quadratic optimal control problem for ...
In this paper we study approximations to the infinite-horizon quadratic optimal control problem for ...
Abstract. We consider the approximation of a class of exponentially stable infinite dimensional line...
Abstract. We consider the approximation of a class of exponentially stable infinite dimensional line...
We consider the approximation of a class of exponentially stable infinite dimensional linear systems...
Uniformly exponentially stable approximations for a class of second order evolution equations. Appli...
We consider time semi-discrete approximations of a class of exponentially stable infinite-dimensiona...
AbstractWe consider time semi-discrete approximations of a class of exponentially stable infinite-di...
In this paper, we consider the approximation of second order evolution equations. It is well known t...
The linear-quadratic (LQ) control problem is considered for a class of infinite-dimensional systems ...
The linear-quadratic (LQ) control problem is considered for a class of infinite-dimensional systems ...
Abstract The aim of this work is to obtain optimal-order error estimates for the LQR (Linear-quadrat...
In this thesis, we study the approximation and stabilization of some evolution equations, using semi...
AbstractWe consider an equation arising in linear viscoelasticity. Recently it has been shown that t...
We present a variational framework based on sesquilinear forms for Galerkin approximation techniques...
In this paper we study approximations to the infinite-horizon quadratic optimal control problem for ...
In this paper we study approximations to the infinite-horizon quadratic optimal control problem for ...