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The following pages link to A note on discontinuous Galerkin divergence-free solutions of the Navier-Stokes equations (Q2642687):

Displaying 16 items.

A parameter-free mixed formulation for the Stokes equations and linear elasticity with strongly symmetric stress (Q6189250) (← links)
A fully discrete finite element method for a constrained transport model of the incompressible MHD equations (Q6189272) (← links)
A pressure-robust numerical scheme for the Stokes equations based on the WOPSIP DG approach (Q6556749) (← links)
Trefftz discontinuous Galerkin discretization for the Stokes problem (Q6562910) (← links)
A two-level finite element method with grad-div stabilizations for the incompressible Navier-Stokes equations (Q6567289) (← links)
Low regularity error analysis for an \(H(\operatorname{div})\)-conforming discontinuous Galerkin approximation of Stokes problem (Q6582074) (← links)
Inf-sup stabilized Scott-Vogelius pairs on general shape-regular simplicial grids for Navier-Stokes equations (Q6585346) (← links)
\(H(\operatorname{div})\)-conforming HDG methods for the stress-velocity formulation of the Stokes equations and the Navier-Stokes equations (Q6586810) (← links)
A DG method for the Stokes equations on tensor product meshes with \([P_k]^d - P_{k-1}\) element (Q6593805) (← links)
Gradient-robust hybrid DG discretizations for the compressible Stokes equations (Q6594651) (← links)
A hybridizable discontinuous Galerkin method for the coupled Navier-Stokes/Biot problem (Q6619602) (← links)
Divergence-free cut finite element methods for Stokes flow (Q6623108) (← links)
A general degree divergence-free finite element method for the two-dimensional Stokes problem on smooth domains (Q6629210) (← links)
A divergence-free and \(H(div)\)-conforming embedded-hybridized DG method for the incompressible resistive MHD equations (Q6641943) (← links)
Robust globally divergence-free weak Galerkin methods for stationary incompressible convective Brinkman-Forchheimer equations (Q6662423) (← links)
An asymptotic-preserving and exactly mass-conservative semi-implicit scheme for weakly compressible flows based on compatible finite elements (Q6670729) (← links)