一维勒贝格测度的重建

IF 1 Q1 MATHEMATICS
N. Endou
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引用次数: 2

摘要

在Mizar系统([1],[2])中,Józef Białas已经给出了一维勒贝格测度[4]。然而,Białas引入的测度将外部测度限制在具有有限可加性的域内。因此,它虽然满足测度的性质,但不能规定可测集合的长度,也不能决定什么样的集合是可测集合。由此,作者首先用外测度法确定了区间的长度。具体来说,我们利用了实空间的紧性。其次,我们通过将外测度限制为区间的半代数来构造预测度。进一步,通过重复先前测度的扩展,我们重构了一维勒贝格测度[7],[3]。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Reconstruction of the One-Dimensional Lebesgue Measure
Summary In the Mizar system ([1], [2]), Józef Białas has already given the one-dimensional Lebesgue measure [4]. However, the measure introduced by Białas limited the outer measure to a field with finite additivity. So, although it satisfies the nature of the measure, it cannot specify the length of measurable sets and also it cannot determine what kind of set is a measurable set. From the above, the authors first determined the length of the interval by the outer measure. Specifically, we used the compactness of the real space. Next, we constructed the pre-measure by limiting the outer measure to a semialgebra of intervals. Furthermore, by repeating the extension of the previous measure, we reconstructed the one-dimensional Lebesgue measure [7], [3].
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来源期刊
Formalized Mathematics
Formalized Mathematics MATHEMATICS-
自引率
0.00%
发文量
0
审稿时长
10 weeks
期刊介绍: Formalized Mathematics is to be issued quarterly and publishes papers which are abstracts of Mizar articles contributed to the Mizar Mathematical Library (MML) - the basis of a knowledge management system for mathematics.
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