Dongho Chae
Published 2025-05-01, updated 2025-05-15Version 2
In this paper we prove Liouville type theorem for the double Beltrami solutions to the stationary Hall-MHD equations in $\Bbb R^3$. Let $(u, B)$ be a smooth double Beltrami solution to the stationary Hall-MHD equations in $\Bbb R^3$, satisfying $\int_{\Bbb R^3} (|u|^q + |B|^q )dx <+\infty$ for some $q\in [2, 3)$, then $u=B=0$. In the case of $B=0$ the theorem reduces the previously known Liouville type result for the Beltrami solutions to the Euler equations.
Comments: There is a calculation mistake, and the result is not yet valid
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On Liouville type theorems for the stationary MHD and the Hall-MHD systems in $\mathbb{R}^3$
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