A robust and efficient component-wise WENO scheme for Euler equations
From MaRDI portal
Publication:2096333
DOI10.1016/j.amc.2022.127583OpenAlexW4302363652MaRDI QIDQ2096333
Publication date: 16 November 2022
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.amc.2022.127583
Basic methods in fluid mechanics (76Mxx) Numerical methods for partial differential equations, initial value and time-dependent initial-boundary value problems (65Mxx) Hyperbolic equations and hyperbolic systems (35Lxx)
Related Items (2)
An improved fifth-order WENO scheme with symmetry-preserving smoothness indicators for hyperbolic conservation laws ⋮ Locally order-preserving mapping for WENO methods
Cites Work
- A new mapped weighted essentially non-oscillatory method using rational mapping function
- A new smoothness indicator for improving the weighted essentially non-oscillatory scheme
- Finite-volume WENO schemes for three-dimensional conservation laws
- A new fifth order finite difference WENO scheme for solving hyperbolic conservation laws
- WENO schemes based on upwind and centred TVD fluxes
- On the spectral properties of shock-capturing schemes
- Efficient, high accuracy ADER-WENO schemes for hydrodynamics and divergence-free magneto\-hydrodynamics
- The numerical simulation of two-dimensional fluid flow with strong shocks
- Efficient implementation of essentially nonoscillatory shock-capturing schemes
- Efficient implementation of essentially nonoscillatory shock-capturing schemes. II
- Approximate Riemann solvers, parameter vectors, and difference schemes
- A survey of several finite difference methods for systems of nonlinear hyperbolic conservation laws
- The Runge-Kutta discontinuous Galerkin method for conservation laws. I: Multidimensional systems
- Shock wave deformation in shock-vortex interactions
- Weighted essentially non-oscillatory schemes
- A weighted essentially non-oscillatory numerical scheme for a multi-class Lighthill--Whitham--Richards traffic flow model.
- A characteristic-wise hybrid compact-WENO scheme for solving hyperbolic conservation laws.
- An improved mapped weighted essentially non-oscillatory scheme
- A perturbational weighted essentially non-oscillatory scheme
- Wavelet-based adaptation methodology combined with finite difference WENO to solve ideal magnetohydrodynamics
- An adaptive characteristic-wise reconstruction WENO-Z scheme for gas dynamic Euler equations
- Mapped weighted essentially non-oscillatory schemes: Achieving optimal order near critical points
- Efficient implementation of weighted ENO schemes
- Improvement of the WENO-Z+ scheme
- Efficient implementation of ADER schemes for Euler and magnetohydrodynamical flows on structured meshes -- speed comparisons with Runge-Kutta methods
- A new mapped weighted essentially non-oscillatory scheme
- A new weighted essentially non-oscillatory WENO-NIP scheme for hyperbolic conservation laws
- An efficient low-dissipation hybrid weighted essentially non-oscillatory scheme
- An improved WENO-Z scheme
- Some techniques for improving the resolution of finite difference component-wise WENO schemes for polydisperse sedimentation models
- An improved weighted essentially non-oscillatory scheme for hyperbolic conservation laws
- TVD fluxes for the high-order ADER schemes
- A new smoothness indicator for the WENO schemes and its effect on the convergence to steady state solutions
- Strong Stability-Preserving High-Order Time Discretization Methods
- Total variation diminishing Runge-Kutta schemes
- A Modified Adaptive Improved Mapped WENO Method
- A New Mapped WENO Scheme Using Order-Preserving Mapping
- A General Improvement in the WENO-Z-Type Schemes
- Piecewise Polynomial Mapping Method and Corresponding WENO Scheme with Improved Resolution
- Weak solutions of nonlinear hyperbolic equations and their numerical computation
- An Efficient Mapped WENO Scheme Using Approximate Constant Mapping
This page was built for publication: A robust and efficient component-wise WENO scheme for Euler equations
