Convergence and non-convergence phenomena in Euler-Maxwell to MHD transitions
Abstract
In this work, we investigate the difference estimate for a class of Euler-Maxwell system and those of magnetohydrodynamics (in short, MHD) systems in three dimensions. We decompose the Euler-Maxwell system into three parts, namely the MHD system, auxiliary linear system and error part system. As a result, we obtain the convergence of the velocity of the fluid u, electric fields E and magnetic fields B from the Euler-Maxwell system toward the MHD system in LptL2x as the speed of light c approaches infinity for p∈[1,∞]. We also derived non-convergence results of electric current j or cE, and these results are classified by a certain threshold for p. Finally, we investigate how the L2-energy flow of Euler-Maxwell system evolves as c tends to infinity, leading to the vanishing of Amp\`ere's equation in the Euler-Maxwell system.
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