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We study an initial-boundary value problem of two-dimensional nonhomogeneous asymmetric fluids with magnetic field and density-dependent viscosity (). Applying Desjardins' interpolation inequality and delicate energy estimates, we show the global-in-time existence of a unique strong solution when (₀) ₋ₐ is properly small. Moreover, we prove that the velocity, the micro-rotational velocity, and the magnetic field converge exponentially to zero in H² as time goes to infinity.
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