Stability of the Inviscid Power-Law Vortex

Abstract

We prove that the power-law vortex ω(x) = β |x|-α, which explicitly solves the stationary unforced incompressible Euler equations in R2 in both physical and self-similar coordinates, is exponentially linearly stable in self-similar coordinates with the natural scaling. This result, which is valid for functions in a weighted L2 space and in the un-weighted L2 space with a mild symmetry condition, answers a question from the monograph by Albritton et al. Moreover, we prove that in physical coordinates the linearization around the power law vortex cannot generate an unstable C0-semigroup.

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