Add to ORKGThe main goal of this paper is to establish the convergence of mimetic discretizations of the first-order system that describes linear diffusion. Specifically, mimetic discretizations based on the support-operators methodology (SO) have been applied successfully in a number of application areas, including diffusion and electromagnetics. These discretizations have demonstrated excellent robustness, however, a rigorous convergence proof has been lacking. In this research, we prove convergence of the SO discretization for linear diffusion by first developing a connection of this mimetic discretization with Mixed Finite Element (MFE) methods. This connection facilitates the application of existing tools and error estimates from the finite eleme...
As mathematical modeling of uid ow be-comes more sophisticated, the need for discretiza-tion methods...
This paper reviews and extends the theory and application of mimetic finite difference methods for t...
The analysis of the Multi point flux approximation (MPFA) method has so far relied on the possibilit...
Abstract. The Mimetic Discretization Method (often called Mimetic Finite Difference method in the li...
The stability and convergence properties of the mimetic finite difference method for diffusion-type ...
The numerical solution of partial differential equations with finite differences mimetic methods tha...
The numerical solution of partial differential equations with finite differences mimetic methods tha...
The numerical solution of partial differential equations with finite differences mimetic methods tha...
New mimetic finite difference discretizations of diffusion problems on unstructured polyhedral meshe...
A new mimetic finite difference method for the diffusion problem is developed by using a linear inte...
We prove second-order convergence of the conservative variable and its flux in the high-order MFD me...
We study the mimetic finite difference discretization of diffusion-type problems on unstructured pol...
International audienceWe investigate the connections between several recent methods for the discreti...
AbstractIn this paper we introduce a discretization methodology for Maxwell equations based on Mimet...
The Mimetic Finite Difference (MFD) methods for PDEs mimic crucial properties of mathematical syste...
As mathematical modeling of uid ow be-comes more sophisticated, the need for discretiza-tion methods...
This paper reviews and extends the theory and application of mimetic finite difference methods for t...
The analysis of the Multi point flux approximation (MPFA) method has so far relied on the possibilit...
Abstract. The Mimetic Discretization Method (often called Mimetic Finite Difference method in the li...
The stability and convergence properties of the mimetic finite difference method for diffusion-type ...
The numerical solution of partial differential equations with finite differences mimetic methods tha...
The numerical solution of partial differential equations with finite differences mimetic methods tha...
The numerical solution of partial differential equations with finite differences mimetic methods tha...
New mimetic finite difference discretizations of diffusion problems on unstructured polyhedral meshe...
A new mimetic finite difference method for the diffusion problem is developed by using a linear inte...
We prove second-order convergence of the conservative variable and its flux in the high-order MFD me...
We study the mimetic finite difference discretization of diffusion-type problems on unstructured pol...
International audienceWe investigate the connections between several recent methods for the discreti...
AbstractIn this paper we introduce a discretization methodology for Maxwell equations based on Mimet...
The Mimetic Finite Difference (MFD) methods for PDEs mimic crucial properties of mathematical syste...
As mathematical modeling of uid ow be-comes more sophisticated, the need for discretiza-tion methods...
This paper reviews and extends the theory and application of mimetic finite difference methods for t...
The analysis of the Multi point flux approximation (MPFA) method has so far relied on the possibilit...