Liouville--type Theorems for Steady MHD and Hall--MHD Equations in 2 ×

Abstract

In this paper, we study the Liouville--type theorems for three--dimensional stationary incompressible MHD and Hall--MHD systems in a slab with periodic boundary condition. We show that, under the assumptions that (uθ,bθ) or (ur,br) is axisymmetric, or (rur,rbr) is bounded, any smooth bounded solution to the MHD or Hall--MHD system with local Dirichlet integral growing as an arbitrary power function must be constant. This hugely improves the result of [Theorem 1.2]pan2021Liouville, where the Dirichlet integral of u is assumed to be finite. Motivated by [Bang--Gui--Wang--Xie, 2022, arXiv:2205.13259]bang2022Liouvilletype, our proof relies on establishing Saint--Venant's estimates associated with our problem, and the result in the current paper extends that for stationary Navier--Stokes equations shown by bang2022Liouvilletype to MHD and Hall--MHD equations. To achieve this, more intricate estimates are needed to handle the terms involving b properly.

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