Axi-symmetric solutions for active vector models generalizing 3D Euler and electron--MHD equations
Abstract
We study systems interpolating between the 3D incompressible Euler and electron--MHD equations, given by equation* ∂t B + V · ∇ B = B· ∇ V, V = -∇× (-)-a B, ∇· B = 0, equation* where B is a time-dependent vector field in R3. Under the assumption that the initial data is axi-symmetric without swirl, we prove local well-posedness of Lipschitz continuous solutions and existence of traveling waves in the range 1/2<a<1. These generalize the corresponding results for the 3D axisymmetric Euler equations and should be useful in the study of stability and instability for axisymmetric solutions.
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