康托尔对角线证明

Q3 Arts and Humanities

Teorie Vedy/ Theory of Science Pub Date : 2023-10-12 DOI:10.46938/tv.2023.605

Marta Vlasáková

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引用次数: 0

摘要

康托尔的对角线证明是重要的，因为它使用的中心证明方法随后被应用于许多其他证明，因为它被认为证实了无限集的存在，其大小从根本上和数量级上超过了由所有自然数表示的“经典”无限集的大小，而它们的大小在理论上可以超过任何可以想象的极限。尽管康托尔的证明被科学界普遍接受，但一些专家对此持保留态度。本文的目的是以一种易于理解的方式呈现康托尔的证明，同时指出其(隐藏的)假设和可能的问题点，并指出其一些潜在的假设不是无可争议的数学真理，而是可能被接受或不被接受的假设命题。

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Cantorův diagonální důkaz

Cantor's diagonal proof is significant both because the central method of proof used in it has been subsequently applied in a number of other proofs, and because it is considered to confirm the existence of infinite sets whose size fun damentally and by an order of magnitude exceeds the size of the "classical" infinite set represented by all natural numbers, while their size can theoretically exceed every conceivable limit. Although Cantor's proof is generally accepted by the scientific community, some experts are somewhat reserved about it. The aim of this paper is to present Cantor's proof in an accessible way, while pointing out its (hidden) assumptions and possible problematic points, and pointing out that some of its underlying assumptions are not indisputable mathematical truths, but rather postulated propositions that may or may not be accepted.

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来源期刊

Teorie Vedy/ Theory of Science Arts and Humanities-History and Philosophy of Science

CiteScore

0.30

自引率

0.00%

发文量

审稿时长

32 weeks

期刊介绍： TEORIE VĚDY / THEORY OF SCIENCE is a peer-reviewed academic journal founded in 1969. It focuses on the inquiry into philosophical and methodological principles of scientific knowledge. It traces the interrelationship of science, technology, and society; the problems of the historical development of science and knowledge; and the interdisciplinary relations across and within Humanities, Social, Natural, and Life Sciences. Public relevance of science is also addressed. The journal publishes original research articles in English and Czech languages. Unsolicited book reviews are typically in Czech.