Large time behavior of solutions to 3-D MHD system with initial data near equilibrium

Abstract

In ChCa, Califano and Chiuderi conjectured that the energy of incompressible Magnetic hydrodynamical system is dissipated at a rate that is independent of the ohmic resistivity. The goal of this paper is to mathematically justify this conjecture in three space dimension provided that the initial magnetic field and velocity is a small perturbation of the equilibrium state (e3,0). In particular, we prove that for such data, 3-D incompressible MHD system without magnetic diffusion has a unique global solution. Furthermore, the velocity field and the difference between the magnetic field and e3 decay to zero in both L∞ and L2 norms with explicit rates. We point out that the decay rate in the L2 norm is optimal in sense that this rate coincides with that of the linear system. The main idea of the proof is to exploit Hormander's version of Nash-Moser iteration scheme, which is very much motivated by the seminar papers Kl80, Kl82, Kl84 by Klainerman on the long time behavior to the evolution equations.