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Level sets of eikonal functions are John regular

Published 29 Dec 2023 in math.AP | (2312.17635v1)

Abstract: Let $u$ be the unique viscosity solution of $\alpha(x)|\nabla u|=1$ in the external domain ${\mathbb R}{ n} \setminus K$ with $u=0$ on $K$. In case $\alpha$ is continuous, bounded, and uniformly positive and $K$ is a bounded John domain, we prove that all superlevels of $u$ are John domains, too. Moreover, we give counterexamples showing that John regularity is sharp in this setting.

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