A note on optimal decay rates for the axisymmetric D-solutions to the steady Navier-Stokes equations

Abstract

In this paper, we investigate the decay properties of an axisymmetric D-solutions to stationary incompressible Navier-Stokes systems in R3. We obtain the optimal decay rate | u(x)|≤ C|x|+1 for axisymmetric flows without swirl. Furthermore, we find a dichotomy for the decay rates of the swirl component uθ, that is, either O(1r+1)≤ |uθ(r,z)|≤ C(r+1)(r+1)1/2 or |uθ(r,z)|≤ C r(+1)3, where =r2+z2. In the latter case, we can further deduce that the other two components of the velocity field also attain the optimal decay rates: |ur(r,z)|+ |uz(r,z)|≤ C+1. We do not require any small assumptions on the forcing term.