International audienceWe propose and compare goal-oriented projection based model order reduction methods for the estimation of vector-valued functionals of the solution of parameter- dependent equations. The first projection method is a generalization of the classical primal-dual method to the case of vector-valued variables of interest. We highlight the role played by three reduced spaces: the approximation space and the test space associated to the primal variable, and the approximation space associated to the dual variable. Then we propose a Petrov-Galerkin projection method based on a saddle point problem involving an approximation space for the primal variable and an approximation space for an auxiliary variable. A goal-oriented choic...
This thesis presents a goal-oriented projection-based model reduction framework for parameterized ti...
The basic idea of model reduction is to represent a complex linear dynamical system by a much simple...
The paper presents some extensions of the optimality results obtained in previous work on algorithms...
International audienceWe propose a projection-based model order reduction method for the solution of...
We provide first the functional analysis background required for reduced order modeling and present ...
International audienceWe propose a probabilistic way for reducing the cost of classical projection-b...
This paper presents a new method of missing point estimation (MPE) to derive efficient reduced-order...
We provide first the functional analysis background required for reduced order modeling and present ...
International audienceParameter-dependent models arise in many contexts such as uncertainty quantifi...
In this paper, we describe some recent developments in the use of projection methods to produce redu...
An efficient and reliable method for the prediction of outputs of interest of partial differential e...
This paper considers the problem of finding optimal projection spaces for the calculation of reduced...
We present a technique for the approximation of a class of Hilbert space--valued maps which arise wi...
open2siWe explore order reduction techniques to solve the algebraic Riccati equation (ARE), and inve...
In this thesis, we present a new reduced basis approach to parametrized saddle point problems. The p...
This thesis presents a goal-oriented projection-based model reduction framework for parameterized ti...
The basic idea of model reduction is to represent a complex linear dynamical system by a much simple...
The paper presents some extensions of the optimality results obtained in previous work on algorithms...
International audienceWe propose a projection-based model order reduction method for the solution of...
We provide first the functional analysis background required for reduced order modeling and present ...
International audienceWe propose a probabilistic way for reducing the cost of classical projection-b...
This paper presents a new method of missing point estimation (MPE) to derive efficient reduced-order...
We provide first the functional analysis background required for reduced order modeling and present ...
International audienceParameter-dependent models arise in many contexts such as uncertainty quantifi...
In this paper, we describe some recent developments in the use of projection methods to produce redu...
An efficient and reliable method for the prediction of outputs of interest of partial differential e...
This paper considers the problem of finding optimal projection spaces for the calculation of reduced...
We present a technique for the approximation of a class of Hilbert space--valued maps which arise wi...
open2siWe explore order reduction techniques to solve the algebraic Riccati equation (ARE), and inve...
In this thesis, we present a new reduced basis approach to parametrized saddle point problems. The p...
This thesis presents a goal-oriented projection-based model reduction framework for parameterized ti...
The basic idea of model reduction is to represent a complex linear dynamical system by a much simple...
The paper presents some extensions of the optimality results obtained in previous work on algorithms...