29th International Symposium on Shock Waves 2 2015
DOI: 10.1007/978-3-319-16838-8_3
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Linear Simulations of the Cylindrical Richtmyer-Meshkov Instability in Hydrodynamics and MHD

Abstract: Linear Simulations of the Cylindrical Richtmyer-MeshkovInstability in Hydrodynamics and MHD Song GaoThe Richtmyer-Meshkov instability occurs when density-stratified interfaces are impulsively accelerated, typically by a shock wave. We present a numerical method to simulate the Richtmyer-Meshkov instability in cylindrical geometry. The ideal MHD equations are linearized about a time-dependent base state to yield linear partial differential equations governing the perturbed quantities. Convergence tests demonstr… Show more

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Cited by 2 publications
(1 citation statement)
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“…In this paper, we have not presented detailed results on numerical convergence and order of accuracy of the proposed method. Numerical convergence tests of this method, performed by Gao, 24 show second order accuracy for smooth initial conditions. The method proposed here is very similar to that developed by Samtaney 18 for Cartesian slab geometry, which exhibits second order convergence for smooth flows and convergence rates between one and two for flows with shocks.…”
Section: Appendix: Numerical Methodsmentioning
confidence: 93%
“…In this paper, we have not presented detailed results on numerical convergence and order of accuracy of the proposed method. Numerical convergence tests of this method, performed by Gao, 24 show second order accuracy for smooth initial conditions. The method proposed here is very similar to that developed by Samtaney 18 for Cartesian slab geometry, which exhibits second order convergence for smooth flows and convergence rates between one and two for flows with shocks.…”
Section: Appendix: Numerical Methodsmentioning
confidence: 93%