Global Fujita-Kato solutions of the incompressible inhomogeneous magnetohydrodynamic equations

Abstract

We investigate the incompressible inhomogeneous magnetohydrodynamic equations in R3, under the assumptions that the initial density 0 is only bounded, and the initial velocity u0 and magnetic field B0 exhibit critical regularities. In particular, the density is allowed to be piecewise constant with jumps. First, we establish the global-in-time well-posedness and large-time behavior of solutions to the Cauchy problem in the case that 0 has small variations, and u0 and B0 are sufficiently small in the critical Besov space B3/p-1p,1 with 1<p<3. Moreover, the small variation assumption on 0 is no longer required in the case p=2. Then, we construct a unique global Fujita-Kato solution under the weaker condition that u0 and B0 are small in B1/22,∞ but may be large in H1/2. Additionally, we show a general uniqueness result with only bounded and nonnegative density, without assuming the L1(0,T;L∞) regularity of the velocity. Our study systematically addresses the global solvability of the inhomogeneous magnetohydrodynamic equations with rough density in the critical regularity setting.