In 12, Koch & Tataru have proved the global well-posedness of the Navier-Stokes equations with small initial data u₀ BMO^-1 (Rⁿ), and then the spatial and time analyticity of the Koch & Tataru solution have been presented by Germain-Pavlovć-Stffilani 9 and the first author 3 when the initial data u₀ BMO^-1 (Rⁿ) small enough. Subsequently, the similar results for the incompressible MHD equations have been studied by the first author 4 for (u₀, b₀) BMO^-1 (Rⁿ) small enough. In this paper, we shall prove the global well-posedness for the incompressible MHD equations with a class of large data (u₀, b₀) BMO^-1 (Rⁿ). Besides, the space-time regularities also have been proved.
Congchong Guo (Thu,) studied this question.