Add to ORKGWe extend the classical empirical interpolation method [M. Barrault, Y. Maday, N.C. Nguyen and A.T. Patera, An empirical interpolation method: application to efficient reduced-basis discretization of partial differential equations. Compt. Rend. Math. Anal. Num. 339 (2004) 667-672] to a weighted empirical interpolation method in order to approximate nonlinear parametric functions with weighted parameters, e.g. random variables obeying various probability distributions. A priori convergence analysis is provided for the proposed method and the error bound by Kolmogorov N-width is improved from the recent work [Y. Maday, N.C. Nguyen, A.T. Patera and G.S.H. Pau, A general, multipurpose interpolation procedure: the magic points. Commun. Pure Appl...
We derive analyticity criteria for explicit error bounds and an exponential rate of convergence of t...
By combining a certain approximation property in the spatial domain, and weighted $\ell_2$-summabili...
Received *****; accepted after revision +++++ Presented by We present rigorous a posteriori error bo...
We extend the classical empirical interpolation method [M. Barrault, Y. Maday, N.C. Nguyen...
We extend the classical empirical interpolation method [1] to a weighted empirical interpolation met...
We present an empirical interpolation and model-variance reduction method for the fast and reliable ...
The empirical interpolation method is an interpolation scheme with problem dependent basis functions...
By combining a certain approximation property in the spatial domain, and weighted 2-summability of t...
In this work we propose and analyze a weighted reduced basis method to solve elliptic partial differ...
This paper considers the analysis of partial differential equations (PDE) containing multiple random...
As efficient separation of variables plays a central role in model reduction for nonlinear and nonaf...
Abstract. The Generalized Empirical Interpolation Method (GEIM, [12]) is an extension first presente...
Current machine learning practice requires solving huge-scale empirical risk minimization problems q...
The 10th International Conference on Sampling Theory and Applications (SampTA) took place from July ...
In this work we focus on the numerical approximation of the solution u of a linear elliptic PDE with...
We derive analyticity criteria for explicit error bounds and an exponential rate of convergence of t...
By combining a certain approximation property in the spatial domain, and weighted $\ell_2$-summabili...
Received *****; accepted after revision +++++ Presented by We present rigorous a posteriori error bo...
We extend the classical empirical interpolation method [M. Barrault, Y. Maday, N.C. Nguyen...
We extend the classical empirical interpolation method [1] to a weighted empirical interpolation met...
We present an empirical interpolation and model-variance reduction method for the fast and reliable ...
The empirical interpolation method is an interpolation scheme with problem dependent basis functions...
By combining a certain approximation property in the spatial domain, and weighted 2-summability of t...
In this work we propose and analyze a weighted reduced basis method to solve elliptic partial differ...
This paper considers the analysis of partial differential equations (PDE) containing multiple random...
As efficient separation of variables plays a central role in model reduction for nonlinear and nonaf...
Abstract. The Generalized Empirical Interpolation Method (GEIM, [12]) is an extension first presente...
Current machine learning practice requires solving huge-scale empirical risk minimization problems q...
The 10th International Conference on Sampling Theory and Applications (SampTA) took place from July ...
In this work we focus on the numerical approximation of the solution u of a linear elliptic PDE with...
We derive analyticity criteria for explicit error bounds and an exponential rate of convergence of t...
By combining a certain approximation property in the spatial domain, and weighted $\ell_2$-summabili...
Received *****; accepted after revision +++++ Presented by We present rigorous a posteriori error bo...