集合论的堕落与原罪

IF 0.7 0 PHILOSOPHY Phronimon Pub Date : 2019-01-10 DOI:10.25159/2413-3086/4983
D. Strauss
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引用次数: 0

摘要

赫尔曼·维尔在1946年发表了一篇简短的调查报告,作为对伯特兰·罗素哲学的评论的序言。在这项调查中,他使用了“集合论的堕落和原罪”这句话。调查这句话的背景需要我们注意数学基础中的一些问题。例如:上帝是否像克罗内克所说的那样制造了整数?数学是集合论吗?还将关注公理集理论和相关的本体论前提,如数字和数字符号之间的差异,关注作为“客观现实的一个方面”的数字(Gâ¶del)、整数和归纳法(Skolem),以及是否可以完成无穷大“作为无尽”的问题。1831年,高斯反对将无穷大视为完成的东西,这在数学中是不允许的。有人会争辩说,实际的无限与“同时”存在的东西是有联系的,作为一个无限的整体。到1900年,数学家们认为数学已经达到了绝对的严格性,但不幸的是,20世纪剩下的时间却恰恰相反。无穷大公理破坏了逻辑主义的期望,“数学不能简化为逻辑。Brouwer、Weyl等人的直觉主义对经典分析发起了毁灭性的攻击,这进一步受到了Gâ¶delâ€的启发™他在1931年的著名证明中证明了形式数学系统是不一致或不完整的。直觉主义创造了一种全新的数学,在古典数学中找不到任何对立的部分。斯莱特说,在罗素的这个合乎逻辑的天堂里,潜伏着一条蛇,隐藏在不正当的无限雇佣背后。根据Weyl的说法,“这是集合论的堕落和原罪,因此它受到了矛盾的公正惩罚。”最后,引入了一些系统的区别。
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The Fall and Original Sin of Set Theory
Hermann Weyl published a brief survey as preface to a review of The Philosophy of Bertrand Russell in 1946. In this survey he used the phrase, “The Fall and Original Sin of Set Theory.” Investigating the background of this remark will require that we pay attention to a number of issues within the foundations of mathematics. For example: Did God make the integers—as Kronecker alleged? Is mathematics set theory? Attention will also be given to axiomatic set theory and relevant ontic pre-conditions, such as the difference between number and number symbols, to number as “an aspect of objective reality” (Gödel), integers and induction (Skolem) as well as to the question if infinity—as endlessness—could be completed. In 1831 Gauss objected to viewing the infinite as something completed, which is not allowed in mathematics. It will be argued that the actual infinite is rather connected to what is present “at once,” as an infinite totality. By the year 1900 mathematicians believed that mathematics had reached absolute rigour, but unfortunately the rest of the twentieth century witnessed the opposite. The axiom of infinity ruined the expectations of logicism—mathematics cannot be reduced to logic. The intuitionism of Brouwer, Weyl and others launched a devastating attack on classical analysis, further inspired by the outcome of Gödel’s famous proof of 1931, in which he has shown that a formal mathematical system is inconsistent or incomplete. Intuitionism created a whole new mathematics, which finds no counter-part in classical mathematics. Slater remarked that within this logical paradise of Russell lurked a serpent, hidden behind the unjustified employment of the at once infinite. According to Weyl, “This is the Fall and original sin of set theory for which it is justly punished by the antinomies.” In conclusion, a few systematic distinctions are introduced.
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Phronimon PHILOSOPHY-
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