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Zero volume boundary for extension domains from Sobolev to $BV$

In this note, we prove that the boundary of a $(W^{1, p}, BV)$-extension domain is of volume zero under the assumption that the domain $\boz$ is $1$-fat at almost every $x\in\partial\boz$. Especially, the boundary of any planar $(W^{1, p}, BV)$-extension domain is of volume zero.

preprint2022arXivOpen access

Tapio Rajala Zheng Zhu

math.AP math.FA

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Tapio Rajala Zheng Zhu

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Zero volume boundary for extension domains from Sobolev to $BV$

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