柯西和博尔扎诺之间的连续性：先例和优先事项问题

IF 0.6 Q3 MATHEMATICS

British Journal for the History of Mathematics Pub Date : 2020-05-27 DOI:10.1080/26375451.2020.1770015

J. Bair, Piotr Błaszczyk, Elías Fuentes Guillén, P. Heinig, V. Kanovei, M. Katz

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引用次数: 10

摘要

Grattan Guinness在1970年发表的一篇论文中认为，Cauchy在1821年的《分析报》中可能抄袭了Bolzano于1817年首次发表的Rein analysitischer Beweis（RB）。该论文随后在几部作品中遭到质疑，但其中一些假设至今仍占上风。特别是，人们通常认为，在波尔扎诺在RB中发展出函数的连续性之前，柯西并没有发展出函数连续性的概念，而且这两个概念本质上是相同的。我们认为，这两种假设都是不正确的，柯西对这一概念的最初见解，最终演变成了一种使用无穷小的方法，可能是从博尔扎诺的工作中借鉴的，这是不可信的。此外，我们解释了博尔扎诺对这一概念的兴趣，并重点讨论了他对Kästner定义的讨论（在他1766年出版的书的第183节中），前者似乎至少部分歪曲了这一定义。

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Continuity between Cauchy and Bolzano: issues of antecedents and priority

In a paper published in 1970, Grattan-Guinness argued that Cauchy, in his 1821 Cours d'Analyse, may have plagiarized Bolzano's Rein analytischer Beweis (RB), first published in 1817. That paper was subsequently discredited in several works, but some of its assumptions still prevail today. In particular, it is usually considered that Cauchy did not develop his notion of the continuity of a function before Bolzano developed his in RB and that both notions are essentially the same. We argue that both assumptions are incorrect, and that it is implausible that Cauchy's initial insight into that notion, which eventually evolved to an approach using infinitesimals, could have been borrowed from Bolzano's work. Furthermore, we account for Bolzano's interest in that notion and focus on his discussion of a definition by Kästner (in Section 183 of his 1766 book), which the former seems to have misrepresented at least partially.

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来源期刊

British Journal for the History of Mathematics Arts and Humanities-History and Philosophy of Science

CiteScore

0.50

自引率

0.00%

发文量