关于集合论的奇异树悖论和可能的不一致

IF 0.5 Q3 MATHEMATICS Advances in Pure and Applied Mathematics Pub Date : 2023-01-01 DOI:10.4236/apm.2023.1310048

Yury M. Volin

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引用次数: 0

摘要

证明了“奇异树”的存在性，讨论了“奇异树”的悖论性，从而使集合论被怀疑是矛盾的。所有的证明都依赖于非正式的集合论推理，但没有使用公理化集合论中禁止的元素，以克服康托尔的朴素集合论遇到的困难。因此，实际上，本文讨论的是现有公理集理论，特别是ZFC理论可能存在的不一致性。当不可数的基数出现时，就会出现奇怪的树。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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About the Strange Tree Paradox and Possible Inconsistency of Set Theory

The existence of “strange trees” is proven and their paradoxical nature is discussed, due to which set theory is suspected of being contradictory. All proofs rely on informal set-theoretic reasoning, but without using elements that were prohibited in axiomatic set theories in order to overcome the difficulties encountered by Cantor’s naive set theory. Therefore, in fact, the article deals with the possible inconsistency of existing axiomatic set theories, in particular, the ZFC theory. Strange trees appear when uncountable cardinals appear.

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