On axisymmetric self-similar solutions to the MHD system
Abstract
Let (u,B) be an axisymmetric self-similar solution to the stationary MHD equations with magnetic diffusion, of the form u=ur(r,z)er+uθ(r,z)eθ+uz(r,z)ez and B=Bθ(r,z)eθ in cylindrical coordinates (r,θ,z), where (er,eθ,ez) is the orthonormal basis. Under the assumption that ur < 13r + 2r3 on the unit sphere and on its intersection with the half-space, respectively, we prove two main results. First, for the domain R3\0\, the velocity field u must be a Landau solution and the magnetic field B 0. Second, in the half-space R3+ with either the no-slip or Navier slip boundary condition, we establish that all such axisymmetric self-similar solutions are trivial, i.\,e., u=B=0.
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