Local existence for the non-resistive MHD equations in nearly optimal Sobolev spaces

Abstract

This paper establishes the local-in-time existence and uniqueness of solutions to the viscous, non-resistive magnetohydrodynamics (MHD) equations in Rd, d=2,3, with initial data B0∈ Hs(Rd) and u0∈ Hs-1+(Rd) for s>d/2 and any 0<<1. The proof relies on maximal regularity estimates for the Stokes equation. The obstruction to taking =0 is explained by the failure of solutions of the heat equation with initial data u0∈ Hs-1 to satisfy u∈ L1(0,T;Hs+1); we provide an explicit example of this phenomenon.