A low-dissipation HLLD approximate Riemann solver for a very wide range of Mach numbers
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Publication:2133529
DOI10.1016/J.JCP.2021.110639OpenAlexW3193933374WikidataQ114163423 ScholiaQ114163423MaRDI QIDQ2133529
Takahiro Miyoshi, Takashi Minoshima
Publication date: 29 April 2022
Published in: Journal of Computational Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2108.04991
Basic methods in fluid mechanics (76Mxx) Numerical methods for partial differential equations, initial value and time-dependent initial-boundary value problems (65Mxx) Shock waves and blast waves in fluid mechanics (76Lxx)
Related Items (3)
High order asymptotic preserving finite difference WENO schemes with constrained transport for MHD equations in all sonic Mach numbers ⋮ High order structure-preserving finite difference WENO schemes for MHD equations with gravitation in all sonic Mach numbers ⋮ A Low Mach Number Two-Speed Relaxation Scheme for Ideal MHD Equations
Uses Software
Cites Work
- Towards shock-stable and accurate hypersonic heating computations: a new pressure flux for AUSM-family schemes
- An unsplit staggered mesh scheme for multidimensional magnetohydrodynamics
- An upwind differencing scheme for the equations of ideal magnetohydrodynamics
- Efficient implementation of essentially nonoscillatory shock-capturing schemes
- Restoration of the contact surface in the HLL-Riemann solver
- Mass flux schemes and connection to shock instability
- Cures for the shock instability: Development of a shock-stable Roe scheme.
- Towards the ultimate conservative difference scheme. V. A second-order sequel to Godunov's method
- A multi-state HLL approximate Riemann solver for ideal magnetohydrodynamics
- A sequel to AUSM II: AUSM\(^+\)-up for all speeds
- A contribution to the great Riemann solver debate
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