The set of solutions of a parameter-dependent linear partial differential equation with smooth coefficients typically forms a compact manifold in a Hilbert space. In this paper we review the generalized reduced basis method as a fast computational tool for the uniform approximation of the solution manifold. We focus on operators showing an affine parametric dependence, expressed as a linear combination of parameter-independent operators through some smooth, parameter-dependent scalar functions. In the case that the parameter-dependent operator has a dominant term in its affine expansion, one can prove the existence of exponentially convergent uniform approximation spaces for the entire solution manifold. These spaces can be constructed wit...
Reduction strategies, such as model order reduction (MOR) or reduced basis (RB) methods, in scientif...
Abstract. In this paper, we extend the reduced-basis approximations developed earlier for linear ell...
Parametrized families of PDEs arise in various contexts suchas inverse problems, control and optimiz...
The set of solutions of a parameter-dependent linear partial differential equation with smooth coeff...
The set of solutions of a parameter-dependent linear partial differential equation with smooth coeff...
reduced basis methods and n-width estimates for the approximation of the solution manifold of parame...
Typical model reduction methods for parametric partial differential equations construct a linear spa...
We consider “Lagrangian” reduced-basis methods for single-parameter symmetric coercive elliptic part...
We present a technique for the rapid and reliable prediction of linear-functional outputs of ellipti...
In this paper, we extend the reduced-basis methods and associated a posteriori error estimators dev...
We present a technique for the rapid and reliable prediction of linear–functional out-puts of ellipt...
Summarization: We present a technique for the rapid and reliable prediction of linear-functional out...
We present a technique for the rapid and reliable prediction of linear-functional outputs of ellipti...
In this paper, we extend the reduced-basis approximations developed earlier for linear elliptic and ...
The numerical approximation of parametric partial differential equations $D(u,y)$ =0 is a computatio...
Reduction strategies, such as model order reduction (MOR) or reduced basis (RB) methods, in scientif...
Abstract. In this paper, we extend the reduced-basis approximations developed earlier for linear ell...
Parametrized families of PDEs arise in various contexts suchas inverse problems, control and optimiz...
The set of solutions of a parameter-dependent linear partial differential equation with smooth coeff...
The set of solutions of a parameter-dependent linear partial differential equation with smooth coeff...
reduced basis methods and n-width estimates for the approximation of the solution manifold of parame...
Typical model reduction methods for parametric partial differential equations construct a linear spa...
We consider “Lagrangian” reduced-basis methods for single-parameter symmetric coercive elliptic part...
We present a technique for the rapid and reliable prediction of linear-functional outputs of ellipti...
In this paper, we extend the reduced-basis methods and associated a posteriori error estimators dev...
We present a technique for the rapid and reliable prediction of linear–functional out-puts of ellipt...
Summarization: We present a technique for the rapid and reliable prediction of linear-functional out...
We present a technique for the rapid and reliable prediction of linear-functional outputs of ellipti...
In this paper, we extend the reduced-basis approximations developed earlier for linear elliptic and ...
The numerical approximation of parametric partial differential equations $D(u,y)$ =0 is a computatio...
Reduction strategies, such as model order reduction (MOR) or reduced basis (RB) methods, in scientif...
Abstract. In this paper, we extend the reduced-basis approximations developed earlier for linear ell...
Parametrized families of PDEs arise in various contexts suchas inverse problems, control and optimiz...