Add to ORKGA wide variety of multiscale methods have been proposed in the literature to reduce runtime and provide better scaling for the solution of Poisson-type equations modeling flow in porous media. We present a new multiscale restricted-smoothed basis (MsRSB) method that is designed to be applicable to both rectilinear grids and unstructured grids. Like many other multiscale meth-ods, MsRSB relies on a coarse partition of the underlying fine grid and a set of local prolongation operators (multiscale basis functions) that map unknowns associated with the fine grid cells to un-knowns associated with blocks in the coarse partition. These mappings are constructed by restricted smoothing: Starting from a constant, a localized iterative scheme is appl...
In this short note, we discuss variational multiscale methods for solving porous media flows in high...
In this paper, we combine concepts of the generalized multiscale finite element method (GMsFEM) and ...
This paper introduces an Algebraic MultiScale method for simulation of flow in heteroge-neous porous...
For the past 10 years or so, a number of so-called multiscale methods have been developed as an alte...
This thesis proposes a novel multiscale method for simulating fluid flow in fractured porous media. ...
During the last two decades, several multiscale solvers have been developed in an attempt to reduce ...
A multiscale gradient computation method for multiphase flow in heterogeneous porous media is develo...
The MultiScale Finite-Volume (MSFV) method is known to produce non-monotone solutions. The causes of...
A number of different multiscale methods have been developed as a robust alternative to upscaling an...
The multiscale control-volume methods for solving problems involving flow in porous media have gaine...
Abstract. Multiscale solution methods are currently under active investigation for the simu-lation o...
Multiscale methods can in many cases be viewed as special types of domain decomposition precondition...
The multiscale structure of heterogeneous porous media prevents a straightforward numerical treatmen...
In fluid flow simulation, the multi-continuum model is a useful strategy. When the heterogeneity and...
In this paper, we combine discrete empirical interpolation techniques, global mode decompo-sition me...
In this short note, we discuss variational multiscale methods for solving porous media flows in high...
In this paper, we combine concepts of the generalized multiscale finite element method (GMsFEM) and ...
This paper introduces an Algebraic MultiScale method for simulation of flow in heteroge-neous porous...
For the past 10 years or so, a number of so-called multiscale methods have been developed as an alte...
This thesis proposes a novel multiscale method for simulating fluid flow in fractured porous media. ...
During the last two decades, several multiscale solvers have been developed in an attempt to reduce ...
A multiscale gradient computation method for multiphase flow in heterogeneous porous media is develo...
The MultiScale Finite-Volume (MSFV) method is known to produce non-monotone solutions. The causes of...
A number of different multiscale methods have been developed as a robust alternative to upscaling an...
The multiscale control-volume methods for solving problems involving flow in porous media have gaine...
Abstract. Multiscale solution methods are currently under active investigation for the simu-lation o...
Multiscale methods can in many cases be viewed as special types of domain decomposition precondition...
The multiscale structure of heterogeneous porous media prevents a straightforward numerical treatmen...
In fluid flow simulation, the multi-continuum model is a useful strategy. When the heterogeneity and...
In this paper, we combine discrete empirical interpolation techniques, global mode decompo-sition me...
In this short note, we discuss variational multiscale methods for solving porous media flows in high...
In this paper, we combine concepts of the generalized multiscale finite element method (GMsFEM) and ...
This paper introduces an Algebraic MultiScale method for simulation of flow in heteroge-neous porous...