Reduced order models, in particular the reduced basis method, rely on empirically built and problem dependent basis functions that are constructed during an off-line stage. In the on- line stage, the precomputed problem dependent solution space can then be used in order to reduce the size of the computational problem. For complex problems, the number of basis functions required to guarantee a certain error tolerance can become too large in order to benefit computationally from the model reduction. To overcome this, the present work introduces a framework where local approximation spaces (in parameter space) are used to define the reduced order approximation in order to have explicit control over the on-line cost. This approach also adapts t...
We construct a reduced basis approximation for the solution to a system of nonlinear partial differe...
The convergence and efficiency of the reduced basis method used for the approximation of the solutio...
peer reviewedThis paper proposes a new reduced basis algorithm for the metamodelling of parametrised...
Reduced bases have been introduced for the approximation of parametrized PDEs in applications where ...
We propose two new and enhanced algorithms for greedy sampling of high- dimensional functions. While...
The convergence and efficiency of the reduced basis method used for the approximation of the solutio...
In the frame of optimization process in industrial framework, where numerical simulation is used at ...
We propose two new algorithms to improve greedy sampling of high-dimensional functions. While the te...
Numerical simulation of parametrized differential equations is of crucial importance in the study of...
In this thesis, we present a new reduced basis approach to parametrized saddle point problems. The p...
Reduction strategies, such as model order reduction (MOR) or reduced basis (RB) methods, in scientic...
In this paper we propose local approximation spaces for localized model order reduction procedures s...
Reduced order models are computationally inexpensive approximations that capture the important dynam...
International audienceThe reduced basis method is a powerful model reduction technique designed to s...
During the last decades, reduced basis (RB) methods have been developed to a wide methodology for mo...
We construct a reduced basis approximation for the solution to a system of nonlinear partial differe...
The convergence and efficiency of the reduced basis method used for the approximation of the solutio...
peer reviewedThis paper proposes a new reduced basis algorithm for the metamodelling of parametrised...
Reduced bases have been introduced for the approximation of parametrized PDEs in applications where ...
We propose two new and enhanced algorithms for greedy sampling of high- dimensional functions. While...
The convergence and efficiency of the reduced basis method used for the approximation of the solutio...
In the frame of optimization process in industrial framework, where numerical simulation is used at ...
We propose two new algorithms to improve greedy sampling of high-dimensional functions. While the te...
Numerical simulation of parametrized differential equations is of crucial importance in the study of...
In this thesis, we present a new reduced basis approach to parametrized saddle point problems. The p...
Reduction strategies, such as model order reduction (MOR) or reduced basis (RB) methods, in scientic...
In this paper we propose local approximation spaces for localized model order reduction procedures s...
Reduced order models are computationally inexpensive approximations that capture the important dynam...
International audienceThe reduced basis method is a powerful model reduction technique designed to s...
During the last decades, reduced basis (RB) methods have been developed to a wide methodology for mo...
We construct a reduced basis approximation for the solution to a system of nonlinear partial differe...
The convergence and efficiency of the reduced basis method used for the approximation of the solutio...
peer reviewedThis paper proposes a new reduced basis algorithm for the metamodelling of parametrised...