Add to ORKGLong simulation times in climate sciences typically require coarse grids due to computational constraints. Nonetheless, unresolved subscale information significantly influences the prognostic variables and can not be neglected for reliable long term simulations. This is typically done via parametrizations but their coupling to the coarse grid variables often involves simple heuristics. We explore a novel up-scaling approach inspired by multi-scale finite element methods. These methods are well established in porous media applications, where mostly stationary or quasi stationary situations prevail. In advection-dominated problems arising in climate simulations the approach needs to be adjusted. We do so by performing coordinate transforms th...
Geophysical flows cover an enormous range of spatial and temporal scales. For instance, flows in the...
Numerical methods for advection-diffusion equations are discussed based on approximating advection u...
This work deals with the study and the implementation of a multiscale finite element method for the ...
A discontinuous Galerkin finite element heterogeneous multiscale method is proposed for advection-di...
We introduce a new parallelizable numerical multiscale method for advection-dominated problems as th...
We introduce a numerical homogenization method based on a discontinuous Galerkin finite element hete...
. In this work we consider the design of robust and efficient finite element approximation methods f...
DOI: http://dx.doi.org/10.1051/m2an/2016057International audienceThe purpose of this work is to inve...
Accurate simulation of multiphase flow in subsurface formations is challenging, as the formations sp...
The purpose of this work is to investigate the behavior of Multiscale Finite Element type methods fo...
A multiscale gradient computation method for multiphase flow in heterogeneous porous media is develo...
Abstract. Multiscale solution methods are currently under active investigation for the simu-lation o...
International audienceThis work proposes an \textit{a priori} error estimate of a multiscale finite ...
This work essentially deals with the development and the study of multiscale finite element methods ...
In this paper, we propose a multiscale technique for the simulation of porous media flows in a flow-...
Geophysical flows cover an enormous range of spatial and temporal scales. For instance, flows in the...
Numerical methods for advection-diffusion equations are discussed based on approximating advection u...
This work deals with the study and the implementation of a multiscale finite element method for the ...
A discontinuous Galerkin finite element heterogeneous multiscale method is proposed for advection-di...
We introduce a new parallelizable numerical multiscale method for advection-dominated problems as th...
We introduce a numerical homogenization method based on a discontinuous Galerkin finite element hete...
. In this work we consider the design of robust and efficient finite element approximation methods f...
DOI: http://dx.doi.org/10.1051/m2an/2016057International audienceThe purpose of this work is to inve...
Accurate simulation of multiphase flow in subsurface formations is challenging, as the formations sp...
The purpose of this work is to investigate the behavior of Multiscale Finite Element type methods fo...
A multiscale gradient computation method for multiphase flow in heterogeneous porous media is develo...
Abstract. Multiscale solution methods are currently under active investigation for the simu-lation o...
International audienceThis work proposes an \textit{a priori} error estimate of a multiscale finite ...
This work essentially deals with the development and the study of multiscale finite element methods ...
In this paper, we propose a multiscale technique for the simulation of porous media flows in a flow-...
Geophysical flows cover an enormous range of spatial and temporal scales. For instance, flows in the...
Numerical methods for advection-diffusion equations are discussed based on approximating advection u...
This work deals with the study and the implementation of a multiscale finite element method for the ...