On the existence of self-similar solutions to the steady Navier-Stokes equations in high dimensions
Abstract
We prove that the steady incompressible Navier-Stokes equations with any given (-3)-homogeneous, locally Lipschitz external force on Rn\0\, 4≤ n≤ 16, have at least one (-1)-homogeneous solution which is scale-invariant and regular away from the origin. The global uniqueness of the self-similar solution is obtained as long as the external force is small. The key observation is to exploit a nice relation between the radial component of the velocity and the total head pressure under the self-similarity assumption. It plays an essential role in establishing the energy estimates. If the external force has only the nonnegative radial component, we can prove the existence of (-1)-homogeneous solutions for all n≥ 4. The regularity of the solution follows from integral estimates of the positive part of the total head pressure, which is due to the maximum principle and a ``dimension-reduction" effect arising from the self-similarity.
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