A high-order symmetrical weighted hybrid ENO-flux limiter scheme for hyperbolic conservation laws
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Publication:313858
DOI10.1016/j.cpc.2013.08.020zbMath1344.65086OpenAlexW1969733514MaRDI QIDQ313858
Mehdi Dehghan, Hojatollah Adibi, Rooholah Abedian
Publication date: 12 September 2016
Published in: Computer Physics Communications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cpc.2013.08.020
limiterstwo-dimensional Riemann problemsystem of conservation lawscentral WENO interpolationessentially non-oscillatory interpolationMUSCL-type interpolantsUNO limiter
Hyperbolic conservation laws (35L65) Finite volume methods for initial value and initial-boundary value problems involving PDEs (65M08)
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Cites Work
- Finite-volume WENO schemes for three-dimensional conservation laws
- Numerical experiments on the accuracy of ENO and modified ENO schemes
- Arbitrary high order non-oscillatory finite volume schemes on unstructured meshes for linear hyperbolic systems
- High order residual distribution conservative finite difference WENO schemes for convection-diffusion steady state problems on non-smooth meshes
- Non-oscillatory central differencing for hyperbolic conservation laws
- A second-order positivity preserving central-upwind scheme for chemotaxis and haptotaxis models
- FORCE schemes on unstructured meshes. I: Conservative hyperbolic systems
- Very-high-order WENO schemes
- The numerical simulation of two-dimensional fluid flow with strong shocks
- Uniformly high order accurate essentially non-oscillatory schemes. III
- Efficient implementation of essentially nonoscillatory shock-capturing schemes
- Efficient implementation of essentially nonoscillatory shock-capturing schemes. II
- A survey of several finite difference methods for systems of nonlinear hyperbolic conservation laws
- Weighted essentially non-oscillatory schemes on triangular meshes
- Convex ENO high order multi-dimensional schemes without field by field decomposition or staggered grids
- A high-order WENO finite difference scheme for the equations of ideal magnetohydrodynamics
- Weighted essentially non-oscillatory schemes
- Accurate monotonicity-preserving schemes with Runge-Kutta time stepping
- A characteristic-wise hybrid compact-WENO scheme for solving hyperbolic conservation laws.
- Multidomain WENO finite difference method with interpolation at subdomain interfaces
- Power ENO methods: A fifth-order accurate weighted power ENO method.
- Monotonicity preserving weighted essentially non-oscillatory schemes with increasingly high order of accuracy
- Conservative hybrid compact-WENO schemes for shock-turbulence interaction
- Anti-diffusive flux corrections for high order finite difference WENO schemes
- Mapped weighted essentially non-oscillatory schemes: Achieving optimal order near critical points
- Positive schemes for solving multi-dimensional hyperbolic systems of conservation laws. II
- Efficient implementation of weighted ENO schemes
- A high-order non-oscillatory central scheme with non-staggered grids for hyperbolic conservation laws
- Simplified discretization of systems of hyperbolic conservation laws containing advection equations
- Non-oscillatory central schemes for traffic flow models with Arrhenius look-ahead dynamics
- A new mapped weighted essentially non-oscillatory scheme
- Towards the ultimate conservative difference scheme. V. A second-order sequel to Godunov's method
- A finite-volume high-order ENO scheme for two-dimensional hyperbolic systems
- Accurate monotonicity- and extrema-preserving methods through adaptive nonlinear hybridizations
- An improved weighted essentially non-oscillatory scheme for hyperbolic conservation laws
- A central WENO scheme for solving hyperbolic conservation laws on non-uniform meshes
- A new fourth-order non-oscillatory central scheme for hyperbolic conservation laws
- High-order linear multistep methods with general monotonicity and boundedness properties
- High order residual distribution conservative finite difference WENO schemes for steady state problems on nonsmooth meshes
- A new category of Hermitian upwind schemes for computational acoustics. II: Two-dimensional aeroacoustics
- Strong Stability-Preserving High-Order Time Discretization Methods
- On the total variation of a third-order semi-discrete central scheme for 1D conservation laws
- A fourth-order central Runge-Kutta scheme for hyperbolic conservation laws
- A weighted ENO-flux limiter scheme for hyperbolic conservation laws
- High Order Weighted Essentially Nonoscillatory Schemes for Convection Dominated Problems
- Riemann Solvers and Numerical Methods for Fluid Dynamics
- Uniformly High-Order Accurate Nonoscillatory Schemes. I
- Total-Variation-Diminishing Time Discretizations
- Classification of the Riemann Problem for Two-Dimensional Gas Dynamics
- Nonoscillatory Central Schemes for Multidimensional Hyperbolic Conservation Laws
- Numerical Solution of the Riemann Problem for Two-Dimensional Gas Dynamics
- Total variation diminishing Runge-Kutta schemes
- Solution of Two-Dimensional Riemann Problems of Gas Dynamics by Positive Schemes
- Compact Central WENO Schemes for Multidimensional Conservation Laws
- Combining high‐order accuracy with non‐oscillatory methods through monotonicity preservation
- High-Order Central Schemes for Hyperbolic Systems of Conservation Laws
- A Fourth-Order Central WENO Scheme for Multidimensional Hyperbolic Systems of Conservation Laws
- Solution of two-dimensional Riemann problems for gas dynamics without Riemann problem solvers
- A Weighted Essentially Nonoscillatory, Large Time-Step Scheme for Hamilton--Jacobi Equations
- Systems of Conservation Equations with a Convex Extension
- Weak solutions of nonlinear hyperbolic equations and their numerical computation
- A technique of treating negative weights in WENO schemes
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