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IF 1 2区数学 Q1 MATHEMATICS

Journal of the London Mathematical Society-Second Series Pub Date : 2025-03-20 DOI:10.1112/jlms.70128

Jared Krandel

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引用次数: 0

摘要

我们研究 R d + 1 , d ⩾ 2 $\mathbb {R}^{d+1},\ d \geqslant 2$ 中具有足够平坦边界的域的类别，这些域允许由具有受控总表面积的 Lipschitz 图形域分解或覆盖有界重叠。彼得-琼斯（Peter Jones）在复平面中证明了 "分析师旅行推销员定理"（Analyst's Traveling Salesman Theorem），作为其中的一部分，他证明了以下结果，从而激发了这项研究：任何简单连通域 Ω ⊆ C $\Omega \subseteq \mathbb {C}$ 都可以分解为边界长度有限的 Lipschitz 图域，边界总长度最多为 M H 1 ( ∂ Ω ) < ∞ $M\mathcal {H}^1(\partial \Omega) < \infty$ ，对于某个与 Ω $\Omega$ 无关的 M > 0 $M > 0$ 。在本文中，我们证明了具有满足均匀贝塔平方和约束的 Reifenberg 平面边界的域在更高维度上的类似 Lipschitz 分解结果。我们使用类似的技术来证明，具有一般 Reifenberg 平面或均匀可整型边界的域允许类似的 Lipschitz 分解，同时允许组成域具有有界重叠而不是不相交。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

Lipschitz decompositions of domains with bilaterally flat boundaries

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Lipschitz decompositions of domains with bilaterally flat boundaries

We study classes of domains in $R^{d + 1}, d ⩾ 2$ with sufficiently flat boundaries that admit a decomposition or covering of bounded overlap by Lipschitz graph domains with controlled total surface area. This study is motivated by the following result proved by Peter Jones as a piece of his proof of the Analyst's Traveling Salesman Theorem in the complex plane: Any simply connected domain $Ω \subseteq C$ with finite boundary length $H^{1} (\partial Ω) < \infty$ can be decomposed into Lipschitz graph domains with total boundary length at most $M H^{1} (\partial Ω)$ for some $M > 0$ independent of $Ω$ . In this paper, we prove an analogous Lipschitz decomposition result in higher dimensions for domains with Reifenberg flat boundaries satisfying a uniform beta-squared sum bound. We use similar techniques to show that domains with general Reifenberg flat or uniformly rectifiable boundaries admit similar Lipschitz decompositions while allowing the constituent domains to have bounded overlaps rather than be disjoint.

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来源期刊

Journal of the London Mathematical Society-Second Series 数学-数学

CiteScore

1.90

自引率

0.00%

发文量

186

审稿时长

6-12 weeks

期刊介绍： The Journal of the London Mathematical Society has been publishing leading research in a broad range of mathematical subject areas since 1926. The Journal welcomes papers on subjects of general interest that represent a significant advance in mathematical knowledge, as well as submissions that are deemed to stimulate new interest and research activity.