This article studies two methods for obtaining excellent mass conservation in finite element computations of the Navier–Stokes equations using continuous velocity fields. With a particular mesh construction, the Scott–Vogelius element pair has recently been shown to be inf-sup stable and have optimal approximation properties, while also providing pointwise mass conservation. We present herein the first numerical tests of this element pair for the time dependent Navier–Stokes equations. We also prove that the limit of the grad-div stabilized Taylor–Hood solutions to the Navier–Stokes problem converges to the Scott–Vogelius solution as the stabilization parameter tends to infinity. That is, we provide theoretical justification that choosing t...
AbstractA finite volume method based on stabilized finite element for the two-dimensional stationary...
Global and local mass conservation for velocity fields associated with saturated porous media flow h...
Standard error analysis for grad-div stabilization of inf-sup stable conforming pairs of finite elem...
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...
We show the velocity solutions to the convective, skew-symmetric, and rotational Galerkin finite ele...
Improving mass conservation in FE approximations of the Navier Stokes equations using continuous vel...
AbstractIt was recently proven in Case et al. (2010) [2] that, under mild restrictions, grad-div sta...
It was recently proven that, under mild restrictions, grad-div stabilized Taylor-Hood solutions of N...
It was recently proven that, under mild restrictions, grad-div stabilized Taylor-Hood solutions of N...
This paper studies fully discrete approximations to the evolutionary Navier{ Stokes equations by me...
It was recently proven that, under mild restrictions, grad-div stabilized Taylor-Hood solutions of N...
AbstractWe study stabilized FE approximations of SUPG type to the incompressible Navier–Stokes probl...
A hybrid method for the incompressible Navier–Stokes equations is presented. The ethod inherits the ...
Finite element methods with stabilization techniques for the stationary Navier–Stokes equations are ...
AbstractA finite volume method based on stabilized finite element for the two-dimensional stationary...
Global and local mass conservation for velocity fields associated with saturated porous media flow h...
Standard error analysis for grad-div stabilization of inf-sup stable conforming pairs of finite elem...
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...
We show the velocity solutions to the convective, skew-symmetric, and rotational Galerkin finite ele...
Improving mass conservation in FE approximations of the Navier Stokes equations using continuous vel...
AbstractIt was recently proven in Case et al. (2010) [2] that, under mild restrictions, grad-div sta...
It was recently proven that, under mild restrictions, grad-div stabilized Taylor-Hood solutions of N...
It was recently proven that, under mild restrictions, grad-div stabilized Taylor-Hood solutions of N...
This paper studies fully discrete approximations to the evolutionary Navier{ Stokes equations by me...
It was recently proven that, under mild restrictions, grad-div stabilized Taylor-Hood solutions of N...
AbstractWe study stabilized FE approximations of SUPG type to the incompressible Navier–Stokes probl...
A hybrid method for the incompressible Navier–Stokes equations is presented. The ethod inherits the ...
Finite element methods with stabilization techniques for the stationary Navier–Stokes equations are ...
AbstractA finite volume method based on stabilized finite element for the two-dimensional stationary...
Global and local mass conservation for velocity fields associated with saturated porous media flow h...
Standard error analysis for grad-div stabilization of inf-sup stable conforming pairs of finite elem...