Asymptotic properties of steady plane solutions of the Navier-Stokes equations in the exterior of a half-space
Abstract
Motivated by Gilbarg-Weinberger's early work on asymptotic properties of steady plane solutions of the Navier-Stokes equations on a neighborhood of infinity GW1978 , we investigate asymptotic properties of steady plane solutions of this system on a half-neighborhood of infinity with finite Dirichlet integral and Navier-slip boundary condition, and obtain that the velocity of the solution grows more slowly than r, while the pressure converges to 0 along each ray passing through the origin.
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