The estimate of lifespan and local well-posedness for the non-resistive MHD equations in homogeneous Besov spaces

Abstract

In this paper, we mainly investigate the Cauchy problem of the non-resistive MHD equation. We first establish the local existence in the homogeneous Besov space Bdp-1p,1× Bdpp,1 with 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 that if the initial data (un0,bn0)→ (u0,b0) in Bdp-1p,1× Bdpp,1, then the corresponding existence times Tn→ T, which implies that they have a common lower bound of the lifespan. Finally, we prove that the data-to-solutions map depends continuously on the initial data when p≤ 2d. Therefore the non-resistive MHD equation is local well-posedness in the homogeneous Besov space in the Hadamard sense. Our obtained result improves considerably the recent results in Li1,chemin1,Feffer2.