On a variational principle for Beltrami flows

GONZÁLEZ, R., COSTA, A., SANTINI, S.

PHYSICS OF FLUIDS

AMER INST PHYSICS

Lugar: California; Año: 2010 vol. 22 p. 1 - 10

1070-6631

   In a previous paper [R. Gonz ìlez, L.G. Sarasua and A. Costa, ”Kelvin Waves with Helical Beltrami Flow Structure” , Phys. Fluids 20, 24106 (2008)] we analyzed the formation of Kelvin waves with a Beltrami flow structure in an ideal fluid. Here, taking into account the results ofthis paper, the topological analogy between the role of the magnetic field in Woltjer’s theorem [L.Woltjer,“ A theorem on force-free magnetic fields”, Proc. Natl Acad. Sci. 44, 489 (1958)] and the role of the vorticity in the equivalent theorem is revisited. Via this analogy we identify the force–free equilibrium of the magnetohydrodynamics (MHD) with the Beltrami flow equilibrium of the hydrodynamic (HD). The stability of the last one is studied applying Arnold’s theorem. Weanalyze the role of the enstrophy in the determination of the equilibrium and its stability. We show examples where the Beltrami flow equilibrium is stable under perturbations of the Beltrami flow type with the same eigenvalue as the basic flow one. The enstrophy variation results invariant with respect to an uniform rotating and translational frame and the stability is conserved when the flow experiences a transition from a Beltrami axisymmetric flow to an helical one of the sameeigenvalue. These results are discussed in comparison with that given by Moffatt in 1986 [H. K. Moffatt, “Magnetostatic equilibria and analogous Euler flows of arbitrarily complex topology. Part2. Stability considerations”, J. Fluid Mech., 166, 359 (1986)].