Global solutions of 3-D Navier-Stokes system with small unidirectional derivative

Abstract

Given initial data u0=(u0,u03)∈ H-,0 H12(3) with both~0 and~∇ h0 belonging to ~L2(3) L∞(;L2(2)) and u0∈ L∞(, H-(2)) for some δ∈ ]0,1[, if in addition 3u0 belongs to H-12,0 H12,0(3), we prove that the classical 3-D Navier-Stokes system has a unique global Fujita-Kato solution provided that \|3u0\|H-12,0 is sufficiently small compared to a constant which depends only on the norms of the initial data. In particular, this result provides some classes of large initial data which generate unique global solutions to 3-D Navier-Stokes system.