Schwartz Function Valued Solutions of the Euler and the Navier-Stokes Equations
Abstract
We prove the existence of a solution for the second order system of partial differential equations ∂t f = · f + g·∇ f + h· f + k by a Montel space version of Arzel\`a--Ascoli and bound all Schwartz semi-norms. We find that for the Euler and the Navier--Stokes equations the vorticity remains a Schwartz function as long as the classical solution exists. Our approach is not affected by viscosity. It treats the hyperbolic Euler and the parabolic Navier--Stokes equation simultaneously.
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