论曲面模量理论

Pub Date : 2024-02-20 DOI:10.1007/s11253-024-02271-5
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引用次数: 0

摘要

我们将继续发展曲面族的模量理论,特别是欧几里得空间中不同维数 m = 1, 2, .,n - 1 的欧几里得空间 \({\mathbb{R}}^{n}\) , n ≥ 2。在模量与勒贝格度量关系的两难证明的基础上,我们用模量证明了富比尼定理的相应类比,它把曲线族的著名韦赛莱定理推广到了任意维数的曲面族。需要强调的是,在证明上述 Lemma 的过程中,一个关于欧几里得空间中集合的可测(玻雷尔)空壳的命题起到了关键作用。此外,我们还证明了同心球族的一个类似两难和一个命题。
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On the Theory of Moduli Of The Surfaces

We continue the development of the theory of moduli of the families of surfaces, in particular, of strings of various dimensions m = 1, 2, . . . ,n − 1 in Euclidean spaces \({\mathbb{R}}^{n}\) , n ≥ 2. On the basis of the proof of the lemma on the relationships between the moduli and Lebesgue measures, we prove the corresponding analog of the Fubini theorem in terms of moduli that extends the well-known Väisälä theorem for the families of curves to the families of surfaces of arbitrary dimensions. It should be emphasized that the crucial role in the proof of the mentioned lemma is played by a proposition on measurable (Borel) hulls of sets in Euclidean spaces. In addition, we also prove a similar lemma and a proposition for the families of concentric balls.

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