We establish local well-posedness of the Hall-magneto-hydrodynamics (Hall-MHD) system in the Sobolev space $\left(H^s(\mathbb{R}^n)\right)^2$ with $s>\frac n2$. The previously known local well-posedness space was $\left(H^s(\mathbb{R}^n)\right)^2$ with $s>\frac n2+1$. Thus the result presented here is an improvement.
On the well-posedness of the Hall-MHD system in a critical setting of Besov-Morrey type
Existence and stability of global large strong solutions for the Hall-MHD system
Local well-posedness for the Hall-MHD system in optimal Sobolev Spaces
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