Grad-div stabilization is a classical remedy in conforming mixed finite element methods for incompressible flow problems, for mitigating velocity errors that are sometimes called poor mass conservation. Such errors arise due to the relaxation of the divergence constraint in classical mixed methods, and are excited whenever the spacial discretization has to deal with comparably large and complicated pressures. In this contribution, an analogue of grad-div stabilization is presented for nonconforming flow discretizations of Discontinuous Galerkin or nonconforming finite element type. Here the key is the penalization of the jumps of the normal velocities over facets of the triangulation, which controls the measure-valued part of the distributi...
This article studies two methods for obtaining excellent mass conservation in finite element computa...
This article studies two methods for obtaining excellent mass conservation in finite element computa...
This paper considers a modular grad-div stabilization method for approximating solutions of the time...
grad–div stabilization is a classical remedy in conforming mixed finite element methods for incompre...
Grad-div stabilization has been proved to be a very useful tool in discretizations of incompressible...
The divergence constraint of the incompressible Navier-Stokes equations is revisited in the mixed fi...
According to the Helmholtz decomposition, the irrotational parts of the momentum balance equations o...
We consider the problem of poor mass conservation in mixed finite element algorithms for flow proble...
This paper studies the parameter choice in the grad-div stabilization applied to the generalized pro...
This paper studies the parameter choice in the grad-div stabilization applied to the generalized pro...
This paper studies fully discrete approximations to the evolutionary Navier{ Stokes equations by me...
AbstractIt was recently proven in Case et al. (2010) [2] that, under mild restrictions, grad-div sta...
We prove that in finite element settings where the divergence-free subspace of the velocity space ha...
We prove that in finite element settings where the divergence-free subspace of the velocity space ha...
In this contribution, classical mixed methods for the incompressible Navier-Stokes equations that re...
This article studies two methods for obtaining excellent mass conservation in finite element computa...
This article studies two methods for obtaining excellent mass conservation in finite element computa...
This paper considers a modular grad-div stabilization method for approximating solutions of the time...
grad–div stabilization is a classical remedy in conforming mixed finite element methods for incompre...
Grad-div stabilization has been proved to be a very useful tool in discretizations of incompressible...
The divergence constraint of the incompressible Navier-Stokes equations is revisited in the mixed fi...
According to the Helmholtz decomposition, the irrotational parts of the momentum balance equations o...
We consider the problem of poor mass conservation in mixed finite element algorithms for flow proble...
This paper studies the parameter choice in the grad-div stabilization applied to the generalized pro...
This paper studies the parameter choice in the grad-div stabilization applied to the generalized pro...
This paper studies fully discrete approximations to the evolutionary Navier{ Stokes equations by me...
AbstractIt was recently proven in Case et al. (2010) [2] that, under mild restrictions, grad-div sta...
We prove that in finite element settings where the divergence-free subspace of the velocity space ha...
We prove that in finite element settings where the divergence-free subspace of the velocity space ha...
In this contribution, classical mixed methods for the incompressible Navier-Stokes equations that re...
This article studies two methods for obtaining excellent mass conservation in finite element computa...
This article studies two methods for obtaining excellent mass conservation in finite element computa...
This paper considers a modular grad-div stabilization method for approximating solutions of the time...