In this work a novel edge-based finite element implementation applied to specific equations is presented. It contains a full description on how we obtained it for the diffusion equation, stabilized convection-diffusion equation and stabilized Navier-Stokes equations. Additionally, classical benchmark problems are solved to show the capabilities of the new implementation. As the differential equations we are interested in represent conservation statements, it would be desirable that the finite element approximation was exactly conservative (at least globally) independently of the mesh used. The present work revolves around that main objective. The initial available edge-based approximation is not totally conservative. Of course it becomes more a...
We propose a stabilized mixed finite element method based on the Scott–Vogelius element for the Osee...
The standard implementation of stabilized finite element methods with a piece-wise function space of...
Summary. We study edge-oriented FEM stabilizations w.r.t. linear multigrid solvers and data structur...
In this work a novel edge-based finite element implementation applied to specific equations is present...
In this work a novel edge-based finite element implementation applied to specific equations is present...
Summary. This paper deals with various aspects of edge-oriented stabilization techniques for nonconf...
Edge stabilized finite elements are obtained by adding a least-square penalization on the gradient j...
The field of Computational Fluid Dynamics (CFD) is constantly finding new ways to improve simulation...
The field of Computational Fluid Dynamics (CFD) is constantly finding new ways to improve simulation...
The objective of this paper is twofold. First, a stabilized finite element method for the incompress...
In this paper we extend the recently introduced edge stabilization method to the case of non-conform...
In this paper we extend the recently introduced edge stabilization method to the case of non-conform...
In this paper we present a stabilized finite element method to solve the transient Navier-Stokes equ...
lized method Abstract. A new stabilized nite element method is introduced for the linearized version...
In this paper we extend the recently introduced edge stabilization method to the case of non-conform...
We propose a stabilized mixed finite element method based on the Scott–Vogelius element for the Osee...
The standard implementation of stabilized finite element methods with a piece-wise function space of...
Summary. We study edge-oriented FEM stabilizations w.r.t. linear multigrid solvers and data structur...
In this work a novel edge-based finite element implementation applied to specific equations is present...
In this work a novel edge-based finite element implementation applied to specific equations is present...
Summary. This paper deals with various aspects of edge-oriented stabilization techniques for nonconf...
Edge stabilized finite elements are obtained by adding a least-square penalization on the gradient j...
The field of Computational Fluid Dynamics (CFD) is constantly finding new ways to improve simulation...
The field of Computational Fluid Dynamics (CFD) is constantly finding new ways to improve simulation...
The objective of this paper is twofold. First, a stabilized finite element method for the incompress...
In this paper we extend the recently introduced edge stabilization method to the case of non-conform...
In this paper we extend the recently introduced edge stabilization method to the case of non-conform...
In this paper we present a stabilized finite element method to solve the transient Navier-Stokes equ...
lized method Abstract. A new stabilized nite element method is introduced for the linearized version...
In this paper we extend the recently introduced edge stabilization method to the case of non-conform...
We propose a stabilized mixed finite element method based on the Scott–Vogelius element for the Osee...
The standard implementation of stabilized finite element methods with a piece-wise function space of...
Summary. We study edge-oriented FEM stabilizations w.r.t. linear multigrid solvers and data structur...