Liouville-type theorems for the forced Euler equations and the Navier-Stokes equations

Abstract

In this paper we study the Liouville-type properties for solutions to the steady incompressible Euler equations with forces in RN. If we assume "single signedness condition" on the force, then we can show that a C1 ( RN) solution (v,p) with |v|2+ |p|∈ Lq2( RN), q∈ (3NN-1, ∞) is trivial, v=0. For the solution of of the steady Navier-Stokes equations, satisfying v(x) 0 as |x| ∞, the condition ∫ R3 | v|65 dx<∞, which is stronger than the important D-condition, ∫ R3 |∇ v|2 dx <∞, but both having the same scaling property, implies that v=0. In the appendix we reprove the Theorem 1.1(cha0), using the self-similar Euler equations directly.