Liouville type of theorems with weights for the Navier-Stokes equations and the Euler equations

Abstract

We study Liouville type of theorems for the Navier-Stokes and the Euler equations on RN, N≥ 2. Specifically, we prove that if a weak solution (v,p) satisfies |v|2 +|p| ∈ L1 (0,T; L1( RN, w1(x)dx)) and ∫ RN p(x,t)w2 (x)dx ≥0 for some weight functions w1(x) and w2 (x), then the solution is trivial, namely v=0 almost everywhere on RN × (0, T). Similar results hold for the MHD Equations on RN, N≥3.