Pseudo-Spectrum of the Resistive Magneto-hydrodynamics Operator: Resolving the Resistive Alfven Paradox

Abstract

The `Alfv\'en Paradox' is that as resistivity decreases, the discrete eigenmodes do not converge to the generalized eigenmodes of the ideal Alfv\'en continuum. To resolve the paradox, the ε-pseudospectrum of the RMHD operator is considered. It is proven that for any ε, the ε- pseudospectrum contains the Alfv\'en continuum for sufficiently small resistivity. Formal ε-pseudoeigenmodes are constructed using the formal Wentzel-Kramers-Brillouin-Jeffreys solutions, and it is shown that the entire stable half-annulus of complex frequencies with |ω|2=|v · B(x)|2 is resonant to order ε, i.e.~belongs to the ε-pseudospectrum. The resistive eigenmodes are exponentially ill-conditioned as a basis and the condition number is proportional to (RM1 2), where RM is the magnetic Reynolds number.