On the Well-posedness of 2-D Incompressible Navier-Stokes Equations with Variable Viscosity in Critical Spaces

Abstract

In this paper, we first prove the local well-posedness of the 2-D incompressible Navier-Stokes equations with variable viscosity in critical Besov spaces with negative regularity indices, without smallness assumption on the variation of the density. The key is to prove for p∈(1,4) and a∈Bp,12p(R2) that the solution mapping Ha:F∇ to the 2-D elliptic equation div((1+a)∇)=div F is bounded on Bp,12p-1(R2). More precisely, we prove that \|∇\|Bp,12p-1≤ C(1+\|a\|Bp,12p)2\|F\|Bp,12p-1. The proof of the uniqueness of solution to (1.2) relies on a Lagrangian approach [15]-[17]. When the viscosity coefficient μ() is a positive constant, we prove that (1.2) is globally well-posed.