用交替佩伦数列表示实数及其几何学

arXiv - MATH - General Mathematics Pub Date : 2024-07-30 DOI:arxiv-2408.01465

Mykola Moroz

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引用次数: 0

摘要

我们考虑了交替佩伦数列（$P^-$-representation）对实数的表示，它是对奥斯特洛夫斯基-西尔皮尔斯数列（皮尔斯数列）、交替西尔维斯特数列（第二奥斯特洛夫斯基数列）、交替洛斯数列等实数表示的概括。此外，我们还证明了$P^-$表示的基本拓扑和度量性质，并在一些度量论问题中发现了$P^-$表示与$P^-$表示之间的关系。

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Representations of Real Numbers by Alternating Perron Series and Their Geometry

We consider the representation of real numbers by alternating Perron series ($P^-$-representation), which is a generalization of representations of real numbers by Ostrogradsky-Sierpi\'nski-Pierce series (Pierce series), alternating Sylvester series (second Ostrogradsky series), alternating L\"{u}roth series, etc. Namely, we prove the basic topological and metric properties of $P^-$-representation and find the relationship between $P$-representation and $P^-$-representation in some measure theory problems.

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arXiv - MATH - General Mathematics

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