Theological reasoning of Cantor's set theory

Kateřina Trlifajová
{"title":"Theological reasoning of Cantor's set theory","authors":"Kateřina Trlifajová","doi":"arxiv-2407.18972","DOIUrl":null,"url":null,"abstract":"Discussions surrounding the nature of the infinite in mathematics have been\nunderway for two millennia. Mathematicians, philosophers, and theologians have\nall taken part. The basic question has been whether the infinite exists only in\npotential or exists in actuality. Only at the end of the 19th century, a set\ntheory was created that works with the actual infinite. Initially, this theory\nwas rejected by other mathematicians. The creator behind the theory, the German\nmathematician Georg Cantor, felt all the more the need to challenge the long\ntradition that only recognised the potential infinite. In this, he received\nstrong support from the interest among German neothomist philosophers, who,\nunder the influence of the Encyclical of Pope Leo XIII, Aeterni Patris, began\nto take an interest in Cantor's work. Gradually, his theory even acquired\napproval from the Vatican theologians. Cantor was able to firmly defend his\nwork and at the turn of the 20th century, he succeeded in gaining its\nacceptance. The storm that had accompanied its original rejection now\naccompanied its acceptance. The theory became the basis on which modern\nmathematics was and is still founded, even though the majority of\nmathematicians know nothing of its original theological justification. Set\ntheory, which today rests on an axiomatic foundation, no longer poses the\nquestion of the existence of actual infinite sets. The answer is expressed in\nits basic axiom: natural numbers form an infinite set. No substantiation has\nbeen discovered other than Cantor's: the set of all natural numbers exists from\neternity as an idea in God's intellect.","PeriodicalId":501462,"journal":{"name":"arXiv - MATH - History and Overview","volume":"161 1","pages":""},"PeriodicalIF":0.0000,"publicationDate":"2024-07-22","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"arXiv - MATH - History and Overview","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/arxiv-2407.18972","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}
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Abstract

Discussions surrounding the nature of the infinite in mathematics have been underway for two millennia. Mathematicians, philosophers, and theologians have all taken part. The basic question has been whether the infinite exists only in potential or exists in actuality. Only at the end of the 19th century, a set theory was created that works with the actual infinite. Initially, this theory was rejected by other mathematicians. The creator behind the theory, the German mathematician Georg Cantor, felt all the more the need to challenge the long tradition that only recognised the potential infinite. In this, he received strong support from the interest among German neothomist philosophers, who, under the influence of the Encyclical of Pope Leo XIII, Aeterni Patris, began to take an interest in Cantor's work. Gradually, his theory even acquired approval from the Vatican theologians. Cantor was able to firmly defend his work and at the turn of the 20th century, he succeeded in gaining its acceptance. The storm that had accompanied its original rejection now accompanied its acceptance. The theory became the basis on which modern mathematics was and is still founded, even though the majority of mathematicians know nothing of its original theological justification. Set theory, which today rests on an axiomatic foundation, no longer poses the question of the existence of actual infinite sets. The answer is expressed in its basic axiom: natural numbers form an infinite set. No substantiation has been discovered other than Cantor's: the set of all natural numbers exists from eternity as an idea in God's intellect.
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康托尔集合论的神学推理
围绕数学中 "无限 "本质的讨论已经持续了两千年。数学家、哲学家和神学家都参与了讨论。基本的问题是,无限是只存在于潜在之中,还是存在于现实之中。直到 19 世纪末,人们才提出了一种适用于实际无限的理论。起初,这一理论遭到了其他数学家的反对。这一理论的创立者,德国数学家格奥尔格-康托尔(Georg Cantor)认为更有必要挑战长期以来只承认潜在无限的传统。在教皇利奥十三世的通谕《爱祖国》(Aeterni Patris)的影响下,这些哲学家开始关注康托尔的研究。渐渐地,他的理论甚至得到了梵蒂冈神学家的认可。康托尔为自己的理论进行了坚定的辩护,并在二十世纪之交成功地获得了认可。原本伴随着其被拒绝的风暴如今也伴随着其被接受。该理论成为现代数学的基础,尽管大多数数学家对其最初的神学理由一无所知。今天,建立在公理基础上的集合论不再提出实际无限集合是否存在的问题。它的基本公理给出了答案:自然数构成一个无限集。除了康托尔的论证:所有自然数的集合自始至终作为上帝智慧中的一个理念而存在,其他论证尚未被发现。
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