Borel测度的分解 $\mu \le \mathcal{H}^{s}$

IF 0.1 Q4 MATHEMATICS Real Analysis Exchange Pub Date : 2020-10-29 DOI:10.14321/realanalexch.48.1.1629953964

Antoine Detaille, A. Ponce

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引用次数: 0

摘要

我们证明了由Hausdorff测度$\mathcal｛H｝^s$从上界的$\mathbb｛R｝^N$中的每一个有限Borel测度$\mau$都可以分解为由Hausorff内容$\mathcal$从上边界的可数多个部分$\mau\lfloor_{E_k}${H}_\infty ^s$。这样的结果推广了R.Delaware的一个定理，该定理认为任何具有有限Hausdorff测度的Borel集都可以分解为直集的可数不相交并集。我们还研究了$\mu$不一定是有限的情况。

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A Decomposition for Borel Measures $\mu \le \mathcal{H}^{s}$

We prove that every finite Borel measure $\mu$ in $\mathbb{R}^N$ that is bounded from above by the Hausdorff measure $\mathcal{H}^s$ can be split in countable many parts $\mu\lfloor_{E_k}$ that are bounded from above by the Hausdorff content $\mathcal{H}_\infty^s$. Such a result generalises a theorem due to R. Delaware that says that any Borel set with finite Hausdorff measure can be decomposed as a countable disjoint union of straight sets. We also investigate the case where $\mu$ is not necessarily finite.

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