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This talk concerns the evolution of two incompressible, immiscible fluids in two dimensions, governed by the inhomogeneous Navier-Stokes equations. We present new global-in-time well-posedness results, showing the preservation of the natural \( C^{1+\gamma} \) Hölder regularity of the moving interface, for \( 0<\gamma<1 \). This is the first approach that allows for nonnegative density driven by a low-regularity initial velocity, while also remaining valid in the presence of a small viscosity jump.
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