Connectivity conditions and boundary Poincaré inequalities

IF 1.8 1区数学 Q1 MATHEMATICS Analysis & PDE Pub Date : 2024-06-20 DOI:10.2140/apde.2024.17.1831

Olli Tapiola, Xavier Tolsa

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引用次数: 0

Abstract

Inspired by recent work of Mourgoglou and the second author, and earlier work of Hofmann, Mitrea and Taylor, we consider connections between the local John condition, the Harnack chain condition and weak boundary Poincaré inequalities in open sets $Ω \subset ℝ^{n + 1}$ , with codimension- $1$ Ahlfors–David regular boundaries. First, we prove that if $Ω$ satisfies both the local John condition and the exterior corkscrew condition, then $Ω$ also satisfies the Harnack chain condition (and hence is a chord-arc domain). Second, we show that if $Ω$ is a $2$ -sided chord-arc domain, then the boundary $\partial Ω$ supports a Heinonen–Koskela-type weak $1$ -Poincaré inequality. We also construct an example of a set $Ω \subset ℝ^{n + 1}$ such that the boundary $\partial Ω$ is Ahlfors–David regular and supports a weak boundary $1$ -Poincaré inequality but $Ω$ is not a chord-arc domain. Our proofs utilize significant advances in particularly harmonic measure, uniform rectifiability and metric Poincaré theories.

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连通性条件和边界 Poincaré 不等式

受 Mourgoglou 和第二作者的最新研究，以及 Hofmann、Mitrea 和 Taylor 的早期研究的启发，我们考虑了开集 Ω ⊂ ℝn+1 中的局部约翰条件、哈纳克链条件和弱边界 Poincaré 不等式之间的联系，开集 Ω ⊂ ℝn+1 具有标度为 1 的 Ahlfors-David 正则边界。首先，我们证明如果 Ω 同时满足局部约翰条件和外部螺旋条件，那么 Ω 也满足哈纳克链条件（因此是一个弦弧域）。其次，我们证明了如果 Ω 是一个双面弦弧域，那么边界 ∂Ω 支持海诺宁-科斯克拉型弱 1-Poincaré 不等式。我们还构造了一个集合 Ω ⊂ ℝn+1 的例子，使得边界 ∂Ω 是 Ahlfors-David 正则并支持弱边界 1-Poincaré 不等式，但 Ω 不是弦弧域。我们的证明利用了特别是调和度量、均匀可整性和度量 Poincaré 理论的重大进展。

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来源期刊

Analysis & PDE MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

3.80

自引率

0.00%

发文量

审稿时长

6 months

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