几何和分析Anastácio达库尼亚的微积分

IF 0.7 2区 哲学 Q2 HISTORY & PHILOSOPHY OF SCIENCE
João Caramalho Domingues
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引用次数: 0

摘要

众所周知,在十八世纪,微积分脱离了其几何起源;欧拉和后来的拉格朗日都渴望将其转化为一门“纯粹的分析”学科。在1780年代,葡萄牙数学家JoséAnastácio da Cunha开发了微积分的原始版本,鉴于这一过程,其解释提出了挑战。库尼亚是牛顿的崇拜者(牛顿以偏爱几何而非代数著称),并批评欧拉对分析的信仰。然而,他的微积分的基本命题遵循着分析的趋势。这似乎是可能的,因为变量的唯名论概念使他能够将表达式作为名称而不是抽象量来处理。尽管如此,库尼亚还是试图保持通量的定义直接适用于几何量。根据库尼亚的一位朋友的说法,他的微积分有代数(分析)分支和几何分支,正因为如此,他对通量的定义对一些同时代人来说显得过于复杂。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Geometry and analysis in Anastácio da Cunha’s calculus

Geometry and analysis in Anastácio da Cunha’s calculus

It is well known that over the eighteenth century the calculus moved away from its geometric origins; Euler, and later Lagrange, aspired to transform it into a “purely analytical” discipline. In the 1780 s, the Portuguese mathematician José Anastácio da Cunha developed an original version of the calculus whose interpretation in view of that process presents challenges. Cunha was a strong admirer of Newton (who famously favoured geometry over algebra) and criticized Euler’s faith in analysis. However, the fundamental propositions of his calculus follow the analytical trend. This appears to have been possible due to a nominalistic conception of variable that allowed him to deal with expressions as names, rather than abstract quantities. Still, Cunha tried to keep the definition of fluxion directly applicable to geometrical magnitudes. According to a friend of Cunha’s, his calculus had an algebraic (analytical) branch and a geometrical branch, and it was because of this that his definition of fluxion appeared too complex to some contemporaries.

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来源期刊
Archive for History of Exact Sciences
Archive for History of Exact Sciences 管理科学-科学史与科学哲学
CiteScore
1.30
自引率
20.00%
发文量
16
审稿时长
>12 weeks
期刊介绍: The Archive for History of Exact Sciences casts light upon the conceptual groundwork of the sciences by analyzing the historical course of rigorous quantitative thought and the precise theory of nature in the fields of mathematics, physics, technical chemistry, computer science, astronomy, and the biological sciences, embracing as well their connections to experiment. This journal nourishes historical research meeting the standards of the mathematical sciences. Its aim is to give rapid and full publication to writings of exceptional depth, scope, and permanence.
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