MHS equilibria in the non-resistive limit to the randomly forced resistive magnetic relaxation equations

Abstract

We consider randomly forced resistive magnetic relaxation equations (MRE) with resistivity >0 and a force proportional to \ on the flat d-torus Td for d≥ 2. We show the path-wise global well-posedness of the system and the existence of the invariant measures, and construct a random magnetohydrostatic (MHS) equilibrium B(x) in H1(Td) with law D(B)=μ as a non-resistive limit 0 of statistically stationary solutions B(x,t). For d=2, the measure μ does not concentrate on any compact sets in H1(T2) with finite Hausdorff dimension. In particular, all realizations of the random MHS equilibrium B(x) are almost surely not finite Fourier mode solutions.