Abstract. We propose a multiscale model reduction method for partial differential equations. The main purpose of this method is to derive an effective equation for multiscale problems without scale separation. An essential ingredient of our method is to decompose the harmonic coordinates into a smooth part and a highly oscillatory part so that the smooth part is invertible and the highly oscillatory part is small. Such a decomposition plays a key role in our construction of the effective equation. We show that the solution to the effective equation is in H2, and can be approximated by a regular coarse mesh. When the multiscale problem has scale separation and a periodic structure, our method recovers the traditional homogenized equation. Fu...
Solutions of partial differential equations could exhibit a multiscale behavior. Standard discretiza...
AbstractIn many practical problems coefficients of PDEs are changing across many spatial or temporal...
In many practical problems coefficients of PDEs are changing across many spatial or temporal scales,...
We propose a multiscale model reduction method for partial differential equations. The mai...
We propose a multiscale model reduction method for partial differential equations. The main purpose ...
Abstract. Multiscale partial differential equations (PDEs) are difficult to solve by traditional num...
International audienceMultiscale partial differential equations (PDEs) are difficult to solve by tra...
International audienceThe presence of numerous localized sources of uncertainties in stochastic mode...
In this paper, we discuss a general multiscale model reduction framework based on multiscale finite ...
A new numerical method based on numerical homogenization and model order reduction is introduced for...
Numerical methods for partial differential equations with multiple scales that combine numerical hom...
One contribution of 13 to a Theme Issue ‘Multi-scale systems in fluids and soft matter: approaches, ...
A novel model-order reduction technique for the solution of the fine-scale equilibrium problem appea...
A novel approach to meshfree particle methods based on multiresolution analysis is presented. The ai...
We consider adaptive finite element methods for solving a multiscale system consisting of a macrosca...
Solutions of partial differential equations could exhibit a multiscale behavior. Standard discretiza...
AbstractIn many practical problems coefficients of PDEs are changing across many spatial or temporal...
In many practical problems coefficients of PDEs are changing across many spatial or temporal scales,...
We propose a multiscale model reduction method for partial differential equations. The mai...
We propose a multiscale model reduction method for partial differential equations. The main purpose ...
Abstract. Multiscale partial differential equations (PDEs) are difficult to solve by traditional num...
International audienceMultiscale partial differential equations (PDEs) are difficult to solve by tra...
International audienceThe presence of numerous localized sources of uncertainties in stochastic mode...
In this paper, we discuss a general multiscale model reduction framework based on multiscale finite ...
A new numerical method based on numerical homogenization and model order reduction is introduced for...
Numerical methods for partial differential equations with multiple scales that combine numerical hom...
One contribution of 13 to a Theme Issue ‘Multi-scale systems in fluids and soft matter: approaches, ...
A novel model-order reduction technique for the solution of the fine-scale equilibrium problem appea...
A novel approach to meshfree particle methods based on multiresolution analysis is presented. The ai...
We consider adaptive finite element methods for solving a multiscale system consisting of a macrosca...
Solutions of partial differential equations could exhibit a multiscale behavior. Standard discretiza...
AbstractIn many practical problems coefficients of PDEs are changing across many spatial or temporal...
In many practical problems coefficients of PDEs are changing across many spatial or temporal scales,...