Global well-posedness for the non-viscous MHD equations with magnetic diffusion in critical Besov spaces

Abstract

In this paper, we mainly investigate the Cauchy problem of the non-viscous MHD equations with magnetic diffusion. We first establish the local well-posedness (existence,~uniqueness and continuous dependence) with initial data (u0,b0) in critical Besov spaces Bdp+1p,1×Bdpp,1 with 1≤ p≤∞, and give a lifespan T of the solution which depends on the norm of the Littlewood-Paley decomposition of the initial data. Then, we prove the global existence in critical Besov spaces. In particular, the results of global existence also hold in Sobolev space C([0,∞); Hs(S2))× (C([0,∞);Hs-1(S2)) L2([0,∞);Hs(S2))) with s>2, when the initial data satisfies ∫S2b0dx=0 and \|u0\|B1∞,1(S2)+\|b0\|B0∞,1(S2)≤ ε. It's worth noting that our results imply some large and low regularity initial data for the global existence, which improves considerably the recent results in weishen.