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Long time behavior of solutions to the 3D Hall-magneto-hydrodynamics system with one diffusion

arXiv:1705.02647

Abstract

This paper studies the asymptotic behavior of smooth solutions to the generalized Hall-magneto-hydrodynamics system (1.1) with one single diffusion on the whole space $\mathbb R^3$. We establish that, in the inviscid resistive case, the energy $\|b(t)\|_2^2$ vanishes and $\|u(t)\|_2^2$ converges to a constant as time tends to infinity provided the velocity is bounded in $W^{1-α,\frac3α}(\mathbb R^3)$; in the viscous non-resistive case, the energy $\|u(t)\|_2^2$ vanishes and $\|b(t)\|_2^2$ converges to a constant provided the magnetic field is bounded in $W^{1-β,\infty}(\mathbb R^3)$. In summary, one single diffusion, being as weak as $(-Δ)^αb$ or $(-Δ)^βu$ with small enough $α, β$, is sufficient to prevent asymptotic energy oscillations for certain smooth solutions to the system.

16 pages