Uniform estimate of viscous free-boundary Magnetohydrodynamics with zero vacuum magnetic field

Abstract

We consider viscous free-boundary magnetohydrodynamics(MHD) under vacuum in R3, especially when vacuum magnetic field is identically zero. It is a central problem in mathematics to perform vanishing viscosity limit to get a solution of hyperbolic inviscid system. However, boundary layer behavior happens near the free-boundary, so existence time T → 0 as kinematic viscosity → 0 in standard sobolev space. Inspired by NMFR1, we use sobolev conormal space to derive uniform regularity in viscosity . Finally, we get a solution of inviscid free-boundary magnetohydrodynamics when initial magnetic field is zero on the free-boundary and in vacuum.