Vanishing shear viscosity and boundary layers for plane magnetohydrodynamics flows

Abstract

In this paper, we consider an initial-boundary problem for plane magnetohydrodynamics flows under the general condition on the heat conductivity that may depend on both the density and the temperature θ and satisfies (,θ)≥1(1+θq) with constants~ 1>0 ~ and~ q>0. We prove the global existence of strong solutions for large initial data and justify the passage to the limit as the shear viscosity μ goes to zero. Furthermore, the value μα with any 0<α<1/2 is established for the boundary layer thickness.