Poncelet’s porism: a long story of renewed discoveries, I

Archive for History of Exact Sciences 70 (1):1-122 (2016)
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Abstract

In 1813, J.-V. Poncelet discovered that if there exists a polygon of n-sides, which is inscribed in a given conic and circumscribed about another conic, then infinitely many such polygons exist. This theorem became known as Poncelet’s porism, and the related polygons were called Poncelet’s polygons. In this article, we trace the history of the research about the existence of such polygons, from the “prehistorical” work of W. Chapple, of the middle of the eighteenth century, to the modern approach of P. Griffiths in the late 1970s, and beyond. For reasons of space, the article has been divided into two parts, the second of which will appear in the next issue of this journal.

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10.1007/s00407-015-0163-y

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Citations of this work

Felix Klein’s early contributions to anschauliche Geometrie.David E. Rowe - 2024 - Archive for History of Exact Sciences 78 (4):401-477.
Brianchon and Poncelet’s joint memoir, the nine-point circle, and beyond.Andrea Del Centina - 2022 - Archive for History of Exact Sciences 76 (4):363-390.

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Mathematical Thought from Ancient to Modern Times.M. Kline - 1978 - British Journal for the Philosophy of Science 29 (1):68-87.

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