Non-uniqueness of weak solutions to the 3D Hall-MHD equations on the plane

Abstract

We prove the non-uniqueness of weak solutions with non-trivial magnetic fields to the 3D Hall-MHD equations on the plane in the space C0t Lx2 through the convex integration scheme and by constructing new errors and new intermittent flows. In particular, based on the construction of 3D intermittent flows, we obtain the 212D Mikado flows through a projection onto the plane. Moreover, we prove that the constructed weak solution do not conserve the magnetic helicity and find that weak solutions of the ideal Hall-MHD equations in Cβt,x (β>0) are the strong vanishing viscosity and resistive limit of weak solutions to the Hall-MHD equations.