Jacob Bernoulli对缆索虫问题的分析

IF 0.6 Q3 MATHEMATICS
Sepideh Alassi
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引用次数: 4

摘要

雅各布·伯努利在他的科学笔记本《冥想》中关于力学的条目揭示了关于悬链线曲线历史的新事实。伯努利的分析表明,悬索曲线、velaria曲线、lintearia曲线和弹性曲线共同构成了一个曲线族,我将其称为索索曲线族。关注这些曲线的整个家族的历史提供了对悬链线问题的起源和发现过程的深刻见解。将《冥想》与伯努利的通信和出版物结合起来研究,可以看出对一条曲线的分析是如何引导他发现其他曲线的。因此,这项研究表明,尽管众所周知莱昂哈德·欧拉是1728年统一悬链线问题和弹性问题的人,但雅各布·伯努利实际上在三十多年前就证明了这一点,在他的笔记本中提供了这类曲线的一般微分方程。此外,我证明雅各布伯努利优先于他的兄弟约翰在发现维拉利亚曲线。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Jacob Bernoulli's analyses of the Funicularia problem
Jacob Bernoulli's entries about mechanics in his scientific notebook, the ‘Meditationes’, reveal new facts about the history of the catenary curve. Bernoulli's analyses show that the catenaria, velaria, lintearia and elastica curves together form a family of curves, which I will refer to as the funicularia family. Attending to the history of the whole family of these curves provides remarkable insights into the origin of the catenary problem and the process of its discovery. Studying the ‘Meditationes’ together with Bernoulli's correspondence and publications shows how analysis of one curve led him to the discovery of the others. As a result, this study shows that – although Leonhard Euler is known to be the one who unified the catenary problem and the elastica problem in 1728 – Jacob Bernoulli had in fact proven the same more than thirty years earlier, providing in his notebook a general differential equation for this family of curves. Furthermore, I demonstrate Jacob Bernoulli's priority over his brother Johann in finding the velaria curve.
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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
自引率
0.00%
发文量
22
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