In a recent work [10], we have introduced a pressure-robust Hybrid High-Order method for the numerical solution of the incompressible Navier-Stokes equations on matching simplicial meshes. Pressure-robust methods are characterized by error estimates for the velocity that are fully independent of the pressure. A crucial question was left open in that work, namely whether the proposed construction could be extended to general polytopal meshes. In this paper we provide a positive answer to this question. Specifically, we introduce a novel divergence-preserving velocity reconstruction that hinges on the solution inside each element of a mixed problem on a subtriangulation, then use it to design discretizations of the body force and convective t...
A new incompressible Navier-Stokes method is developed for unstructured general hybrid meshes which...
Recently, it was understood how to repair a certain L2-orthogonality of discretely-divergence-free v...
Nondivergence-free discretizations for the incompressible Stokes problem may suffer from a lack of p...
In a recent work [11], we have introduced a pressure-robust Hybrid High-Order method for the numeric...
We develop a novel Hybrid High-Order method for the incompressible Navier--Stokes problem robust for...
International audienceIn this work we introduce and analyze a novel Hybrid High-Order method for the...
Recently, it was understood how to repair a certain $L^2$-orthogonality of discretely divergence-fre...
International audienceWe investigate artificial compressibility (AC) techniques for the time discret...
We present well-posedness and an a priori error analysis of the hybridized discontinuous Galerkin m...
Most classical finite element schemes for the (Navier--)Stokes equations are neither pressure-robust...
Recent analysis of the divergenceconstraint in the incompressible Stokes/Navier-Stokes problemhas st...
The present work is the second part of a pair of papers, considering Hybrid Discontinuous Galerkin m...
Classical inf-sup stable mixed finite elements for the incompressible (Navier--)Stokes equations are...
Within the last years pressure robust methods for the discretization of incompressible fluids have b...
International audienceWe devise and analyze arbitrary-order nonconforming methods for the discretiza...
A new incompressible Navier-Stokes method is developed for unstructured general hybrid meshes which...
Recently, it was understood how to repair a certain L2-orthogonality of discretely-divergence-free v...
Nondivergence-free discretizations for the incompressible Stokes problem may suffer from a lack of p...
In a recent work [11], we have introduced a pressure-robust Hybrid High-Order method for the numeric...
We develop a novel Hybrid High-Order method for the incompressible Navier--Stokes problem robust for...
International audienceIn this work we introduce and analyze a novel Hybrid High-Order method for the...
Recently, it was understood how to repair a certain $L^2$-orthogonality of discretely divergence-fre...
International audienceWe investigate artificial compressibility (AC) techniques for the time discret...
We present well-posedness and an a priori error analysis of the hybridized discontinuous Galerkin m...
Most classical finite element schemes for the (Navier--)Stokes equations are neither pressure-robust...
Recent analysis of the divergenceconstraint in the incompressible Stokes/Navier-Stokes problemhas st...
The present work is the second part of a pair of papers, considering Hybrid Discontinuous Galerkin m...
Classical inf-sup stable mixed finite elements for the incompressible (Navier--)Stokes equations are...
Within the last years pressure robust methods for the discretization of incompressible fluids have b...
International audienceWe devise and analyze arbitrary-order nonconforming methods for the discretiza...
A new incompressible Navier-Stokes method is developed for unstructured general hybrid meshes which...
Recently, it was understood how to repair a certain L2-orthogonality of discretely-divergence-free v...
Nondivergence-free discretizations for the incompressible Stokes problem may suffer from a lack of p...