Piecewise parabolic method on a local stencil for magnetized supersonic turbulence simulation
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Publication:733016
DOI10.1016/j.jcp.2009.07.007zbMath1391.76583arXiv0905.2960OpenAlexW2143638188MaRDI QIDQ733016
Mikhail V. Popov, Michael L. Norman, Sergey D. Ustyugov, Alexei G. Kritsuk
Publication date: 15 October 2009
Published in: Journal of Computational Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0905.2960
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Cites Work
- Unnamed Item
- The piecewise parabolic method (PPM) for gas-dynamical simulations
- An adaptive moving mesh method for two-dimensional ideal magnetohydrodynamics
- A high order staggered grid method for hyperbolic systems of conservation laws in one space dimension
- A limiter for PPM that preserves accuracy at smooth extrema
- An unsplit staggered mesh scheme for multidimensional magnetohydrodynamics
- The numerical simulation of two-dimensional fluid flow with strong shocks
- An upwind differencing scheme for the equations of ideal magnetohydrodynamics
- The effect of nonzero \(\bigtriangledown\cdot B\) on the numerical solution of the magnetohydrodynamic equations
- High resolution staggered mesh approach for nonlinear hyperbolic systems of conservation laws
- A staggered mesh algorithm using high order Godunov fluxes to ensure solenoidal magnetic fields in magnetohydrodynamic simulations
- An approximate Riemann solver for ideal magnetohydrodynamics
- Extension of the piecewise parabolic method to multidimensional ideal magnetohydrodynamics
- Accurate monotonicity-preserving schemes with Runge-Kutta time stepping
- Towards the ultimate conservative difference scheme. II: Monotonicity and conservation combined in a second-order scheme
- Monotonicity preserving weighted essentially non-oscillatory schemes with increasingly high order of accuracy
- The \(\nabla \cdot B=0\) constraint in shock-capturing magnetohydrodynamics codes
- An unsplit Godunov method for ideal MHD via constrained transport
- Development of low dissipative high order filter schemes for multiscale Navier-Stokes/MHD systems
- Accurate monotonicity- and extrema-preserving methods through adaptive nonlinear hybridizations
- A multi-state HLL approximate Riemann solver for ideal magnetohydrodynamics
- High resolution Godunov-type schemes with small stencils
- A Third-Order Accurate Variation Nonexpansive Difference Scheme for Single Nonlinear Conservation Laws
- 10.1007/s11470-008-3011-1
- A contribution to the great Riemann solver debate
- Implicit Large Eddy Simulation
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