Leibnizian无穷小微积分的过程:在三个现代框架中的解释

J. Bair, Piotr Błaszczyk, R. Ely, M. Katz, Karl Kuhlemann
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引用次数: 11

摘要

最近的莱布尼茨学术试图衡量哪一个基础框架对莱布尼茨微积分(LC)的过程提供了最成功的描述。虽然许多学者(如石黑一雄、李维)选择了默认的Weierstrassian框架,但Arthur将LC与Lawvere–Kock–Bell的非阿基米德框架SIA(平滑无限极小分析)进行了比较。我们分析了亚瑟的比较,发现它在连续体的非点状性质、无限边多边形和无穷小的虚构性等问题上充满了模棱两可和误解。Rabouin和Arthur声称,莱布尼茨认为无穷大是矛盾的,莱布尼兹对不可比的定义应该被理解为名义的,而不是语义的。然而,这些主张取决于莱布尼茨关于有界无穷大和无界无穷大的概念的融合,这是早期Knobloch强调的区别。对LC最忠实的描述可以说是由Robinson的无穷小分析框架提供的。我们利用一个公理化的无穷小分析框架SPOT来形式化LC。
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Procedures of Leibnizian infinitesimal calculus: an account in three modern frameworks
Recent Leibniz scholarship has sought to gauge which foundational framework provides the most successful account of the procedures of the Leibnizian calculus (LC). While many scholars (e.g. Ishiguro, Levey) opt for a default Weierstrassian framework, Arthur compares LC to a non-Archimedean framework SIA (Smooth Infinitesimal Analysis) of Lawvere–Kock–Bell. We analyze Arthur's comparison and find it rife with equivocations and misunderstandings on issues including the non-punctiform nature of the continuum, infinite-sided polygons, and the fictionality of infinitesimals. Rabouin and Arthur claim that Leibniz considers infinities as contradictory, and that Leibniz' definition of incomparables should be understood as nominal rather than as semantic. However, such claims hinge upon a conflation of Leibnizian notions of bounded infinity and unbounded infinity, a distinction emphasized by early Knobloch. The most faithful account of LC is arguably provided by Robinson's framework for infinitesimal analysis. We exploit an axiomatic framework for infinitesimal analysis SPOT to formalize LC.
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来源期刊
British Journal for the History of Mathematics
British Journal for the History of Mathematics Arts and Humanities-History and Philosophy of Science
CiteScore
0.50
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0.00%
发文量
22
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