Propagation of regularity for the MHD system in optimal Sobolev space

Abstract

We study the problem of propagation of regularity of solutions to the incompressible viscous non-resistive magneto-hydrodynamics system. According to scaling, the Sobolev space H n2-1( Rn)× H n2( Rn) is critical for the system. We show that if a weak solution (u(t),b(t)) is in Hs( Rn)× Hs+1( Rn) with s> n2-1 at a certain time t0, then it will stay in the space for a short time, provided the initial velocity u(0)∈ Hs( Rn). In the case that the uniqueness of weak solution in Hs( Rn)× Hs+1( Rn) is known, the assumption of u(0)∈ Hs( Rn) is not necessary.