\u3cp\u3eWe propose an adaptive multiscale method to improve the efficiency and the accuracy of numerical computations by combining numerical homogenization and domain decomposition for modeling flow and transport. Our approach focuses on minimizing the use of fine scale properties associated with advection and diffusion/dispersion. Here a fine scale flow and transport problem is solved in subdomains defined by a transient region where spatial changes in transported species concentrations are large while a coarse scale problem is solved in the remaining subdomains. Away from the transient region, effective macroscopic properties are obtained using local numerical homogenization. An Enhanced Velocity Mixed Finite Element Method (EVMFEM) as a...
Accurate and efficient simulation of multiphase flow in heterogeneous porous media motivates the dev...
This is the final report of a three-year, Laboratory-Directed Research and Development (LDRD) projec...
Accurate simulation of multiphase flow in subsurface formations is challenging, as the formations sp...
We propose an adaptive multiscale method to improve the efficiency and the accuracy of numerical com...
This poster presents an adaptive multiscale approach to improve the efficiency and the accuracy of n...
Multiscale modeling of subsurface flow and transport is a major area of interest in several applicat...
Many problems of fundamental and practical importance have multiple scale solutions. The direct nume...
Several multiscale methods for elliptic problems that provide high resolution velocity fields at low...
The multiscale structure of heterogeneous porous media prevents a straightforward numerical treatmen...
A numerical upscaling approach, NU, for solving multiscale elliptic problems is discussed. The main ...
Diffusion processes in heterogeneous porous media are notoriously difficult to ap-proximate accurate...
We introduce a numerical homogenization method based on a discontinuous Galerkin finite element hete...
Homogenization has proved its effectiveness as a method of upscaling for linear problems, as they oc...
This research is aimed to develop a homogenized model for practical applications of the fluid flow o...
We introduce a numerical homogenization method based on a discontinuous Galerkin finite element hete...
Accurate and efficient simulation of multiphase flow in heterogeneous porous media motivates the dev...
This is the final report of a three-year, Laboratory-Directed Research and Development (LDRD) projec...
Accurate simulation of multiphase flow in subsurface formations is challenging, as the formations sp...
We propose an adaptive multiscale method to improve the efficiency and the accuracy of numerical com...
This poster presents an adaptive multiscale approach to improve the efficiency and the accuracy of n...
Multiscale modeling of subsurface flow and transport is a major area of interest in several applicat...
Many problems of fundamental and practical importance have multiple scale solutions. The direct nume...
Several multiscale methods for elliptic problems that provide high resolution velocity fields at low...
The multiscale structure of heterogeneous porous media prevents a straightforward numerical treatmen...
A numerical upscaling approach, NU, for solving multiscale elliptic problems is discussed. The main ...
Diffusion processes in heterogeneous porous media are notoriously difficult to ap-proximate accurate...
We introduce a numerical homogenization method based on a discontinuous Galerkin finite element hete...
Homogenization has proved its effectiveness as a method of upscaling for linear problems, as they oc...
This research is aimed to develop a homogenized model for practical applications of the fluid flow o...
We introduce a numerical homogenization method based on a discontinuous Galerkin finite element hete...
Accurate and efficient simulation of multiphase flow in heterogeneous porous media motivates the dev...
This is the final report of a three-year, Laboratory-Directed Research and Development (LDRD) projec...
Accurate simulation of multiphase flow in subsurface formations is challenging, as the formations sp...