On Liouville type theorems for the stationary MHD and Hall-MHD systems

Abstract

In this paper we prove a Liouville type theorem for the stationary magnetohydrodynamics(MHD) system in R3. Let (v, B, p) be a smooth solution to the stationary MHD equations in R3. We show that if there exist smooth matrix valued potential functions , such that ∇ · =v and ∇ · = B, whose L6 mean oscillations have certain growth condition near infinity, namely -\!\!\!\!\!∫B(r) | - B(r) |6 dx + -\!\!\!\!\!∫B(r) |- B(r) |6 dx C r ∀ 1< r< +∞, then v=B= 0 and p=constant. With additional assumption of r-8∫B(r)|B-BB(r)|6dx 0 as r+∞, similar result holds also for the Hall-MHD system.