The viscosity limit of fluid flows with growth/decay conditions at infinity

Abstract

We prove that the Navier-Stokes equation is well-posed in function spaces on Rd, d 2, that contain vector fields of order O(|x|) as |x|∞ with <1/2. The corresponding solutions depend continuously on the viscosity parameter 0 and converge to the solutions of the Euler equation as 0+. Our proof is based on the properties of the conjugated heat flow on weighted Sobolev spaces and on a new variant of the Lie-Trotter product formula for nonlinear semigroups.

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