Asymptotic stability of Couette flow in a strong uniform magnetic field for the Euler-MHD system

Abstract

In this paper, we prove the asymptotic stability of Couette flow in a strong uniform magnetic field for the Euler-MHD system, when the perturbations are in Gevrey-1s, (12<s≤ 1) and of size smaller than the resistivity coefficient μ. More precisely, we prove (1) the μ-13-amplification of the perturbed vorticity, namely, the size of the vorticity grows from \|ωin\|Gλ0 μ to \|ω∞\|Gλ' μ23; (2) the polynomial decay of the perturbed current density, namely, \|j≠\|L2 c0 t2 \μ-13, t \; (3) and the damping for the perturbed velocity and magnetic field, namely, \[ \|(u1≠,b1≠)\|L2 c0μ t \μ-13, t \, \|(u2,b2)\|L2 c0μ t2 \μ-13, t \. \] We also confirm that the strong uniform magnetic field stabilizes the Euler-MHD system near Couette flow.