Liouville type theorem for double Beltrami solutions of the Hall-MHD system in R3
Abstract
In this paper we prove Liouville type theorem for the double Beltrami solutions to the stationary Hall-MHD equations in R3. Let (u, B) be a smooth double Beltrami solution to the stationary Hall-MHD equations in R3, satisfying ∫ R3 (|u|q + |B|q )dx <+∞ for some q∈ [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.
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