Add to ORKGWe present a new hybrid numerical method for multiscale partial differential equations, which simultaneously captures both the global macroscopic information and resolves the local microscopic events. The convergence of the proposed method is proved for problems with bounded and measurable coefficient, while the rate of convergence is established for problems with rapidly oscillating periodic or almost-periodic coefficients. Numerical results are reported to show the efficiency and accuracy of the proposed method
We establish the equivalence between the Multiscale Hybrid-Mixed (MHM) and the Multiscale Hybrid Hig...
The wave propagation phenomena in heterogeneous media is an actual challenging problem to numerical ...
Many problems of fundamental and practical importance have multiscale solutions. Direct numerical si...
This work proposes a new finite element for the mixed multiscale hybrid method (MHM) applied to the ...
ABSTRACT. In an abstract setting, we investigate the basic ideas behind the Multiscale Hybrid Mixed ...
International audienceMultiscale partial differential equations (PDEs) are difficult to solve by tra...
Abstract. Multiscale partial differential equations (PDEs) are difficult to solve by traditional num...
In this dissertation we develop, analyze and implement effective numerical methods for multiscale ph...
In this thesis, we consider the numerical approximation of solutions of partial differential equatio...
Abstract. We propose a multiscale finite element method for solving second order elliptic equations ...
Abstract. An abstract framework for constructing finite element multiscale methods is pre-sented. Us...
The recently introduced multiscale finite element method for solving elliptic equations with oscilla...
In this paper, we combine discrete empirical interpolation techniques, global mode decompo-sition me...
. We propose a multiscale finite element method for solving second order elliptic equations with rap...
We consider adaptive finite element methods for solving a multiscale system consisting of a macrosca...
We establish the equivalence between the Multiscale Hybrid-Mixed (MHM) and the Multiscale Hybrid Hig...
The wave propagation phenomena in heterogeneous media is an actual challenging problem to numerical ...
Many problems of fundamental and practical importance have multiscale solutions. Direct numerical si...
This work proposes a new finite element for the mixed multiscale hybrid method (MHM) applied to the ...
ABSTRACT. In an abstract setting, we investigate the basic ideas behind the Multiscale Hybrid Mixed ...
International audienceMultiscale partial differential equations (PDEs) are difficult to solve by tra...
Abstract. Multiscale partial differential equations (PDEs) are difficult to solve by traditional num...
In this dissertation we develop, analyze and implement effective numerical methods for multiscale ph...
In this thesis, we consider the numerical approximation of solutions of partial differential equatio...
Abstract. We propose a multiscale finite element method for solving second order elliptic equations ...
Abstract. An abstract framework for constructing finite element multiscale methods is pre-sented. Us...
The recently introduced multiscale finite element method for solving elliptic equations with oscilla...
In this paper, we combine discrete empirical interpolation techniques, global mode decompo-sition me...
. We propose a multiscale finite element method for solving second order elliptic equations with rap...
We consider adaptive finite element methods for solving a multiscale system consisting of a macrosca...
We establish the equivalence between the Multiscale Hybrid-Mixed (MHM) and the Multiscale Hybrid Hig...
The wave propagation phenomena in heterogeneous media is an actual challenging problem to numerical ...
Many problems of fundamental and practical importance have multiscale solutions. Direct numerical si...