Data di Pubblicazione:
2024
Abstract:
We consider the free boundary problem for a plasma–vacuum interface
in ideal incompressible magnetohydrodynamics, where the Maxwell equations for
electric and magnetic fields are considered in the vacuum region. Under a neces-
sary and sufficient stability condition for a piecewise constant background state, we
construct approximate solutions at any arbitrarily large order of accuracy to the free
boundary problem in three space dimensions when the initial discontinuity displays
high frequency oscillations. Moreover, such approximate surface waves have non-
trivial residual non-oscillatory components. The content of this paper summarizes
the result in Secchi and Yuan (2022).
in ideal incompressible magnetohydrodynamics, where the Maxwell equations for
electric and magnetic fields are considered in the vacuum region. Under a neces-
sary and sufficient stability condition for a piecewise constant background state, we
construct approximate solutions at any arbitrarily large order of accuracy to the free
boundary problem in three space dimensions when the initial discontinuity displays
high frequency oscillations. Moreover, such approximate surface waves have non-
trivial residual non-oscillatory components. The content of this paper summarizes
the result in Secchi and Yuan (2022).
Tipologia CRIS:
4.1 Contributo in Atti di convegno
Keywords:
Ideal incompressible magnetohydrodynamics,Maxwell equations, Plasma–vacuum interface, Surface waves, WKB expansion
Elenco autori:
Secchi, Paolo; Yuan, Yuan
Link alla scheda completa:
Titolo del libro:
Hyperbolic Problems: Theory, Numerics, Applications. Volume I
Pubblicato in: