Global well-posedness of 3-D density-dependent incompressible MHD equations with variable resistivity
Abstract
In this paper, we investigate the global existence of weak solutions to 3-D inhomogeneous incompressible MHD equations with variable viscosity and resistivity, which is sufficiently close to 1 in L∞(R3), provided that the initial density is bounded from above and below by positive constants, and both the initial velocity and magnetic field are small enough in the critical space H12(R3). Furthermore, if we assume in addition that the kinematic viscosity equals 1, and both the initial velocity and magnetic field belong to B122,1(R3), we can also prove the uniqueness of such solution.
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