High-order accurate kinetic-energy and entropy preserving (KEEP) schemes on curvilinear grids
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Publication:2131002
DOI10.1016/j.jcp.2021.110482OpenAlexW3168003884MaRDI QIDQ2131002
Publication date: 25 April 2022
Published in: Journal of Computational Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jcp.2021.110482
finite difference schemeshigh-order accurate schemesgeneralized curvilinear coordinatessplit convective formskinetic energy and entropy preservationshock-free compressible flows
Turbulence (76Fxx) Basic methods in fluid mechanics (76Mxx) Numerical methods for partial differential equations, initial value and time-dependent initial-boundary value problems (65Mxx)
Related Items (7)
Comprehensive analysis of entropy conservation property of non-dissipative schemes for compressible flows: KEEP scheme redefined ⋮ Modified wavenumber and aliasing errors of split convective forms for compressible flows ⋮ A kinetic energy and entropy preserving (KEEP) finite volume scheme on unstructured meshes for compressible flows ⋮ Fully conservative and pressure-equilibrium preserving scheme for compressible multi-component flows ⋮ On the role of spectral properties of viscous flux discretization for flow simulations on marginally resolved grids ⋮ Gradient based reconstruction: inviscid and viscous flux discretizations, shock capturing, and its application to single and multicomponent flows ⋮ Numerical treatment of the energy equation in compressible flows simulations
Cites Work
- Geometric interpretations and spatial symmetry property of metrics in the conservative form for high-order finite-difference schemes on moving and deforming grids
- Stabilized non-dissipative approximations of Euler equations in generalized curvilinear coordinates
- Higher entropy conservation and numerical stability of compressible turbulence simulations
- A high-order low-dispersion symmetry-preserving finite-volume method for compressible flow on curvilinear grids
- Assessment of localized artificial diffusivity scheme for large-eddy simulation of compressible turbulent flows
- A low numerical dissipation patch-based adaptive mesh refinement method for large eddy simulation of compressible flows
- Localized artificial diffusivity scheme for discontinuity capturing on curvilinear meshes
- A fully discrete, kinetic energy consistent finite volume scheme for compressible flows
- Compact finite difference schemes with spectral-like resolution
- Large-eddy simulation of the shock/turbulence interaction
- Effects of the computational time step on numerical solutions of turbulent flow
- A robust high-order compact method for large eddy simulation.
- High-order fluxes for conservative skew-symmetric-like schemes in structured meshes: Application to compressible flows
- Stable, non-dissipative, and conservative flux-reconstruction schemes in split forms
- On the use of higher-order finite-difference schemes on curvilinear and deforming meshes
- The effect of the formulation of nonlinear terms on aliasing errors in spectral methods
- Kinetic energy and entropy preserving schemes for compressible flows by split convective forms
- Preventing spurious pressure oscillations in split convective form discretization for compressible flows
- A stable and non-dissipative kinetic energy and entropy preserving (KEEP) scheme for non-conforming block boundaries on Cartesian grids
- Numerically stable formulations of convective terms for turbulent compressible flows
- Split form nodal discontinuous Galerkin schemes with summation-by-parts property for the compressible Euler equations
- Reduced aliasing formulations of the convective terms within the Navier-Stokes equations for a compressible fluid
- The construction of discretely conservative finite volume schemes that also globally conserve energy or entropy
- Formulation of kinetic energy preserving conservative schemes for gas dynamics and direct numerical simulation of one-dimensional viscous compressible flow in a shock tube using entropy and kinetic energy preserving schemes
- Generalized conservative approximations of split convective derivative operators
- Skew-symmetric form of convective terms and fully conservative finite difference schemes for variable density low-Mach number flows
- Turbulence in supersonic boundary layers at moderate Reynolds number
- Generation of Finite Difference Formulas on Arbitrarily Spaced Grids
- The Numerical Viscosity of Entropy Stable Schemes for Systems of Conservation Laws. I
- Entropy stability theory for difference approximations of nonlinear conservation laws and related time-dependent problems
- Large eddy simulation of subsonic and supersonic channel flow at moderate Reynolds number
- Direct numerical simulation of high-speed transition due to an isolated roughness element
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