Remarks on the Liouville type problem in the stationary 3D Navier-Stokes equations

Abstract

We study the Liouville type problem for the stationary 3D Navier-Stokes equations on R3. Specifically, we prove that if v is a smooth solution to (NS) satisfying ω= curl\,v ∈ Lq ( R3) for some 32 ≤ q< 3, and |v(x)| 0 as |x| +∞, then either v=0 on R3, or ∫ R6 + dxdy=∫ R6 - dxdy=+∞, where (x,y) :=14πω (x)·(x-y)× (v(y)× ω(y) )|x-y|3 , and :=\ 0, \. The proof uses crucially the structure of nonlinear term of the equations.