Global well-posedness of inhomogeneous Navier-Stokes equations with bounded density

Abstract

In this paper, we solve Lions' open problem: the uniqueness of weak solutions for the 2-D inhomogeneous Navier-Stokes equations (INS). We first prove the global existence of weak solutions to 2-D (INS) with bounded initial density and initial velocity in L2( R2). Moreover, if the initial density is bounded away from zero, then our weak solution equals to Lions' weak solution, which in particular implies the uniqueness of Lions' weak solution. We also extend a celebrated result by Fujita and Kato on the 3-D incompressible Navier-Stokes equations to 3-D (INS): the global well-posedness of 3-D (INS) with bounded initial density and initial velocity being small in H1/2( R3). The proof of the uniqueness is based on a surprising finding that the estimate t1/2∇ u∈ L2(0,T; L∞( Rd)) instead of ∇ u∈ L1(0, T; L∞( Rd)) is enough to ensure the uniqueness of the solution.