Global well-posedness to the 3-D incompressible inhomogeneous Navier-Stokes equations with a class of large velocity

Abstract

In this article, we consider the global well-posedness to the 3-D incompressible inhomogeneous Navier-Stokes equations with a class of large velocity. More precisely, assuming a0 ∈ Bq,13q(R3) and u0=(u0h,u03)∈ Bp,1-1+3p(R3) for p,q ∈ (1,6) with (1p, 1q)≤13+ ∈f (1p, 1q), we prove that if C\|a0\|Bq,13qα(\|u03\|Bp,1-1+3p/μ+1)≤1, Cμ(\|u0h\|Bp,1-1+3p+\|u03\|Bp,1-1+3p1-α\|u0h\|Bp,1-1+3pα)≤ 1, then the system has a unique global solution a∈C([0,∞);Bq,13q(R3)), u∈C([0,∞);Bp,1-1+3p(R3)) L1(R+;Bp,11+3p(R3)). It improves the recent result of M. Paicu, P. Zhang (J. Funct. Anal. 262 (2012) 3556-3584), where the exponent form of the initial smallness condition is replaced by a polynomial form.