On the 2D Plasma-Vacuum Interface Problems for Ideal Incompressible MHD

This manuscript concerns the two-dimensional plasma-vacuum interface problems for ideal incompressible magnetohydrodynamics (MHD) equations, which describe the dynamics of perfect conducting fluids in a vacuum region under the influence of magnetic fields. We establish their local well-posedness theories in standard Sobolev spaces, under the hypothesis that either there exist capillary forces or the total magnetic fields are non-degenerate on the free boundary. We also show vanishing surface tension limits under either the non-degeneracy assumption on magnetic fields or the Rayleigh-Taylor sign condition on the effective pressure. These results indicate that both capillary forces and non-degenerate tangential magnetic fields can indeed stabilize the motion of the plasma-vacuum interface, which, in particular, give another interpretations to the ill-posed examples constructed by C. Hao and the second author (Comm. Math. Phys. 376 (2020), 259-286). Although the initial data provided there are highly-unstable/ill-posed in the Sobolev spaces characterizing regularities of flow maps, plasma-vacuum problems with these initial data can still be stable/well-posed in suitable standard Sobolev spaces in the Eulerian framework without involving flow maps.