Short-Time Structural Stability of Compressible Vortex Sheets with Surface Tension

Stevens, Ben

doi:10.1007/s00205-016-1009-8

Cited by 11 publications

(6 citation statements)

References 18 publications

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“…Coulombel and Secchi [7,8] proved the nonlinear stability of 2D supersonic vortex sheets for the compressible isentropic Euler equations, and the nonisentropic case was proved by Morando and Trebeschi [19] and Morando et al [20]. It is known that the surface tension has the stabilizing effect on the Kelvin-Helmholtz and Rayleigh-Taylor instabilities, see Cheng et al [4] and Shatah and Zeng [21,22] for the local well-posedness of the twophase incompressible Euler equations with surface tension and Stevens [23] for the compressible case.…”

Section: Related Workmentioning

confidence: 99%

“…But if (𝜂 0 , 𝑝 0 , 𝑣 0 , 𝑏 0 , 𝜌 0 ) satisfy the (𝑚 − 1)-th order compatibility conditions: ⟦ 𝐕 𝓁 ∇𝜂 0 ,𝜌 0 ( ∇𝓁 𝑈 0 , 𝜕 𝓁 3 𝑈 0 ) ⟧ = 0, 𝓁 = 0, … , 𝑚 − 1, (A. 23) then (𝑝 𝛿 0 , 𝑣 𝛿 0 , 𝑏 𝛿 0 ) → (𝑝 0 , 𝑣 0 , 𝑏 0 ) in 𝐻 𝑚 (Ω ± ) as 𝛿 → 0. Indeed, we claim that 𝑈 𝛿,(𝑗) 0 → 𝑈 0 in 𝐻 𝑚 (Ω ± ) as 𝛿 → 0 for 𝑗 = 0, … , 𝑚 − 1.…”

Section: A C K N O W L E D G M E N T Smentioning

confidence: 99%

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Existence of multi‐dimensional contact discontinuities for the ideal compressible magnetohydrodynamics

Wang,

Xin

2023

Comm Pure Appl Math

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We establish the local existence and uniqueness of multi‐dimensional contact discontinuities for the ideal compressible magnetohydrodynamics (MHD) in Sobolev spaces, which are most typical interfacial waves for astrophysical plasmas and prototypical fundamental waves for hyperbolic systems of conservation laws. Such waves are characteristic discontinuities for which there is no flow across the discontinuity surface while the magnetic field crosses transversely, which lead to a two‐phase free boundary problem where the pressure, velocity and magnetic field are continuous across the interface whereas the entropy and density may have jumps. To overcome the difficulties of possible nonlinear Rayleigh–Taylor instability and loss of derivatives, here we use crucially the Lagrangian formulation and Cauchy's celebrated integral (1815) for the magnetic field. These motivate us to define two special good unknowns; one enables us to capture the boundary regularizing effect of the transversal magnetic field on the flow map, and the other one allows us to get around the troublesome boundary integrals due to the transversality of the magnetic field. In particular, our result removes the additional assumption of the Rayleigh–Taylor sign condition required by Morando, Trakhinin and Trebeschi (J. Differ. Equ. 258 (2015), no. 7, 2531–2571; Arch. Ration. Mech. Anal. 228 (2018), no. 2, 697–742) and holds for both 2D and 3D and hence gives a complete answer to the two open questions raised therein. Moreover, there is no loss of derivatives in our well‐posedness theory. The solution is constructed as the inviscid limit of solutions to some suitably‐chosen nonlinear approximate problems for the two‐phase compressible viscous non‐resistive MHD.

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Section: Related Workmentioning

confidence: 99%

Section: A C K N O W L E D G M E N T Smentioning

confidence: 99%

Existence of multi‐dimensional contact discontinuities for the ideal compressible magnetohydrodynamics

Wang,

Xin

2023

Comm Pure Appl Math

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“…The presence of surface tension is necessary for the stability of vortex sheets in the two-phase incompressible Euler equations; without surface tension, we have the well-known Kelvin-Helmholtz instability, see Caflisch and Orellana [5] and Ebin [15]. For the short-time structural stability of vortex sheets in the two-phase compressible Euler equations, we refer to Coulombel and Secchi [11,12] and Stevens [33].…”

Section: 2mentioning

confidence: 99%

Global well-posedness of the free-interface incompressible Euler equations with damping

Lian¹

2020

Discrete &Amp; Continuous Dynamical Systems - A

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“…Surface tension has been proved to suppress the instability of vortex sheets in three dimensions by Ambrose-Masmoudi [3] for incompressible irrotational flows, by Cheng et al [11] and Shatah-Zeng [29] for incompressible rotational flows, and by Stevens [30] for compressible flows. Numerical and experimental studies of free-interface MHD flows with surface tension have been provided in Samulyak et al [25] and the references therein.…”

Section: Introductionmentioning

confidence: 99%

Nonlinear Stability of MHD Contact Discontinuities with Surface Tension

Trakhinin,

Wang

2021

Preprint

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We consider the motion of two inviscid, compressible, and electrically conducting fluids separated by an interface across which there is no fluid flow in the presence of surface tension. The magnetic field is supposed to be nowhere tangent to the interface. This leads to the characteristic free boundary problem for contact discontinuities with surface tension in threedimensional ideal compressible magnetohydrodynamics (MHD). We prove the nonlinear structural stability of MHD contact discontinuities with surface tension in Sobolev spaces by a modified Nash-Moser iteration scheme. The main ingredient of our proof is deriving the resolution and tame estimate of the linearized problem in usual Sobolev spaces of sufficiently large regularity. In particular, for solving the linearized problem, we introduce a suitable regularization that preserves the transport-type structure for the linearized entropy and divergence of the magnetic field.

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Short-Time Structural Stability of Compressible Vortex Sheets with Surface Tension

Cited by 11 publications

References 18 publications

Existence of multi‐dimensional contact discontinuities for the ideal compressible magnetohydrodynamics

Existence of multi‐dimensional contact discontinuities for the ideal compressible magnetohydrodynamics

Global well-posedness of the free-interface incompressible Euler equations with damping

Nonlinear Stability of MHD Contact Discontinuities with Surface Tension

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