In this work, we analyze a recently proposed stabilized finite element formulation for the approximation of the resistive magnetohydrodynamics equations. The novelty of this formulation with respect to existing ones is the fact that it always converges to the physical solution, even when it is singular. We have performed a detailed stability and convergence analysis of the formulation in a simplified setting. From the convergence analysis, we infer that a particular type of meshes with a macro-element structure is needed, which can be easily obtained after a straight modification of any original mesh
Banas L, Prohl A. Convergent finite element discretization of the multi-fluid nonstationary incompre...
This thesis presents a finite element method for the solution of three-dimensional magnetohydrodynam...
This paper presents an initial study that is intended to explore the development of a scalable fully...
In this work, we analyze a recently proposed stabilized finite element formulation for the approxima...
In this work, we propose a new stabilized finite element formulation for the approximation of the re...
In this work, we propose a new stabilized finite element formulation for the approximation of t...
Magnetohydrodynamics (MHD) is the physics branch that studies electrically conducting fluids under e...
No es frecuente encontrar un campo donde dos ramas principales de la Física estén involucradas. La M...
This thesis deals with the usage of nodal-based finite element methods in electromagnetism and incom...
In this article we propose different splitting procedures for the transient incompressible MHD syste...
This paper studies a numerical scheme for approximating solutions of incompressible magnetohydrodyna...
In this work, a stabilized formulation to solve the inductionless magnetohydrodynamic (MHD) problem ...
A sufficient stability condition with respect to purely growing modes is derived for resistive magne...
This paper is devoted to the design and analysis of some structure-preserving finite element schemes...
In this work we present a stabilized finite element method for the stationary magneto-hydrodynamic e...
Banas L, Prohl A. Convergent finite element discretization of the multi-fluid nonstationary incompre...
This thesis presents a finite element method for the solution of three-dimensional magnetohydrodynam...
This paper presents an initial study that is intended to explore the development of a scalable fully...
In this work, we analyze a recently proposed stabilized finite element formulation for the approxima...
In this work, we propose a new stabilized finite element formulation for the approximation of the re...
In this work, we propose a new stabilized finite element formulation for the approximation of t...
Magnetohydrodynamics (MHD) is the physics branch that studies electrically conducting fluids under e...
No es frecuente encontrar un campo donde dos ramas principales de la Física estén involucradas. La M...
This thesis deals with the usage of nodal-based finite element methods in electromagnetism and incom...
In this article we propose different splitting procedures for the transient incompressible MHD syste...
This paper studies a numerical scheme for approximating solutions of incompressible magnetohydrodyna...
In this work, a stabilized formulation to solve the inductionless magnetohydrodynamic (MHD) problem ...
A sufficient stability condition with respect to purely growing modes is derived for resistive magne...
This paper is devoted to the design and analysis of some structure-preserving finite element schemes...
In this work we present a stabilized finite element method for the stationary magneto-hydrodynamic e...
Banas L, Prohl A. Convergent finite element discretization of the multi-fluid nonstationary incompre...
This thesis presents a finite element method for the solution of three-dimensional magnetohydrodynam...
This paper presents an initial study that is intended to explore the development of a scalable fully...