Poincaré’s works leading to the Poincaré conjecture

IF 0.7 2区 哲学 Q2 HISTORY & PHILOSOPHY OF SCIENCE
Lizhen Ji, Chang Wang
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引用次数: 0

Abstract

In the last decade, the Poincaré conjecture has probably been the most famous statement among all the contributions of Poincaré to the mathematics community. There have been many papers and books that describe various attempts and the final works of Perelman leading to a positive solution to the conjecture, but the evolution of Poincaré’s works leading to this conjecture has not been carefully discussed or described, and some other historical aspects about it have not been addressed either. For example, one question is how it fits into the overall work of Poincaré in topology, and what are some other related questions that he had raised. Since Poincaré did not state the Poincaré conjecture as a conjecture but rather raised it as a question, one natural question is why he did this. In order to address these issues, in this paper, we examine Poincaré’s works in topology in the framework of classifying manifolds through numerical and algebraic invariants. Consequently, we also provide a full history of the formulation of the Poincaré conjecture which is richer than what is usually described and accepted and hence gain a better understanding of overall works of Poincaré in topology. In addition, this analysis clarifies a puzzling question on the relation between Poincaré’s stated motivations for topology and the Poincaré conjecture.

庞加莱的作品引出了庞加莱猜想
在过去的十年里,庞加莱猜想可能是庞加莱对数学界所有贡献中最著名的一个。有许多论文和书籍描述了佩雷尔曼的各种尝试和最终作品,这些尝试和作品导致了该猜想的正解,但庞加莱的作品导致该猜想的演变没有得到仔细的讨论或描述,关于它的其他一些历史方面也没有得到解决。例如,一个问题是它如何融入庞加莱在拓扑学方面的整体工作,以及他提出的其他一些相关问题是什么。由于庞加莱并没有将庞加莱猜想作为一个猜想来陈述,而是将其作为一个问题来提出,一个自然的问题是他为什么要这样做。为了解决这些问题,在本文中,我们在通过数值和代数不变量对流形进行分类的框架下,研究了庞加莱在拓扑方面的工作。因此,我们还提供了庞加莱猜想公式的完整历史,它比通常描述和接受的更丰富,因此更好地理解了庞加雷在拓扑中的整体工作。此外,这一分析澄清了一个令人困惑的问题,即庞加莱所陈述的拓扑动机与庞加莱猜想之间的关系。
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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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