On indecomposable sets with applications

In this note we show the characteristic function of every indecomposable set \(F\) in the plane is \(BV\) equivalent to the characteristic function a closed set \(\mathbb{F}\), i.e. \(||\mathbb{1}_{F}-\mathbb{1}_{\mathbb{F}}||_{BV(\mathbb{R}^2)}=0\). We show by example this is false in dimension thr...

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Bibliographic Details
Published in:arXiv.org 2013-10
Main Author: Lorent, Andrew
Format: Article
Language:English
Subjects:
Characteristic functions
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Summary:In this note we show the characteristic function of every indecomposable set \(F\) in the plane is \(BV\) equivalent to the characteristic function a closed set \(\mathbb{F}\), i.e. \(||\mathbb{1}_{F}-\mathbb{1}_{\mathbb{F}}||_{BV(\mathbb{R}^2)}=0\). We show by example this is false in dimension three and above. As a corollary to this result we show that for every \(\epsilon>0\) a set of finite perimeter \(S\) can be approximated by a closed subset \(\mathbb{S}_{\epsilon}\) with finitely many indecomposable components and with the property that \(H^1(\partial^M \mathbb{S}_{\epsilon}\backslash \partial^M S)=0\) and \(||\mathbb{1}_{S}-\mathbb{1}_{\mathbb{S}_{\epsilon}}||_{BV(\mathbb{R}^2)}
ISSN:2331-8422
DOI:10.48550/arxiv.1305.3264