Finite element error estimates are derived for the incompressible Stokes equations with variable viscosity. The ratio of the supremum and the infimum of the viscosity appears in the error bounds. Numerical studies show that this ratio can be observed sometimes. However, often the numerical results show a weaker dependency on the viscosity
We derive computable a posteriori error estimates for the lowest order nonconforming Crouzeix-Raviar...
Recent works showed that pressure-robust modifications of mixed finite element methods for the Stoke...
The paper presents a finite element error analysis for a projection-based variational multiscale (VM...
Key words Incompressible Stokes equations, variable viscosity, finite element error analysis, depend...
Finite element error estimates are derived for the incompressible Stokes equations with variable vis...
AbstractWe describe a method to estimate the guaranteed error bounds of the finite element solutions...
We provide benchmark comparisons of two finite element (FE) mantle convection codes, CITCOM and CONM...
AbstractConforming and nonconforming error estimators are presented and analyzed for the mixed finit...
Abstract The authors establish error estimates for recently developed finite-element methods for inc...
The paper presents finite element error estimates of a variational multiscale method (VMS) for the i...
SIGLECNRS 14802 E / INIST-CNRS - Institut de l'Information Scientifique et TechniqueFRFranc
We obtain fully computable constant free a posteriori error bounds on simplicial meshes for: a nonco...
We propose computable a posteriori error estimates for a second order nonconforming finite element a...
An error estimate is presented for a fully discrete, linearized and stabilized finite element method...
A linearized compressible viscous Stokes system is considered. The a posteriori error estimates are ...
We derive computable a posteriori error estimates for the lowest order nonconforming Crouzeix-Raviar...
Recent works showed that pressure-robust modifications of mixed finite element methods for the Stoke...
The paper presents a finite element error analysis for a projection-based variational multiscale (VM...
Key words Incompressible Stokes equations, variable viscosity, finite element error analysis, depend...
Finite element error estimates are derived for the incompressible Stokes equations with variable vis...
AbstractWe describe a method to estimate the guaranteed error bounds of the finite element solutions...
We provide benchmark comparisons of two finite element (FE) mantle convection codes, CITCOM and CONM...
AbstractConforming and nonconforming error estimators are presented and analyzed for the mixed finit...
Abstract The authors establish error estimates for recently developed finite-element methods for inc...
The paper presents finite element error estimates of a variational multiscale method (VMS) for the i...
SIGLECNRS 14802 E / INIST-CNRS - Institut de l'Information Scientifique et TechniqueFRFranc
We obtain fully computable constant free a posteriori error bounds on simplicial meshes for: a nonco...
We propose computable a posteriori error estimates for a second order nonconforming finite element a...
An error estimate is presented for a fully discrete, linearized and stabilized finite element method...
A linearized compressible viscous Stokes system is considered. The a posteriori error estimates are ...
We derive computable a posteriori error estimates for the lowest order nonconforming Crouzeix-Raviar...
Recent works showed that pressure-robust modifications of mixed finite element methods for the Stoke...
The paper presents a finite element error analysis for a projection-based variational multiscale (VM...
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