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From here to infinity = tracing the origin and development of projective geometry /

紀錄類型:	書目-語言資料,印刷品 : Monograph/item
正題名/作者:	From here to infinity/ by Andrea Del Centina, Alessandro Gimigliano.
其他題名:	tracing the origin and development of projective geometry /
作者:	Del Centina, Andrea.
其他作者:	Gimigliano, Alessandro.
出版者:	Cham :Springer Nature Switzerland : : 2025.,
面頁冊數:	xlii, 788 p. :ill., digital ; : 24 cm.;
Contained By:	Springer Nature eBook
標題:	Projective Geometry. -
電子資源:	https://doi.org/10.1007/978-3-031-72585-2
ISBN:	9783031725852

From here to infinity = tracing the origin and development of projective geometry /
Del Centina, Andrea.

From here to infinitytracing the origin and development of projective geometry /[electronic resource] :by Andrea Del Centina, Alessandro Gimigliano. - Cham :Springer Nature Switzerland :2025. - xlii, 788 p. :ill., digital ;24 cm. - Sources and studies in the history of mathematics and physical sciences,2196-8829. - Sources and studies in the history of mathematics and physical sciences..

- 1. The Greek Legacy -- 2. Perspective in the Renaissance -- 3. New ways of looking at conics -- 4. Desargues, the dawn of projective geometry -- 5. Pascal's geometrical achievements -- 6. An interlude a century and a half long -- 7. Towards a new geometry -- 8. Poncelet, the projective properties of figures -- 9. The algebraic way to projective geometry -- 10. The synthetic route: the contributions of Steiner and Chasles -- 11. Von Staudt's pure synthetism -- 12. Projective geometry 1870-1930 and beyond.

This monograph traces the development of projective geometry from its Greek origins to the early 20th century. It covers Renaissance perspective studies and insights from the late sixteenth to seventeenth centuries, examining the contributions of Desargues and Pascal. Most of the book is devoted to the evolution of the subject in the 19th century, from Carnot to von Staudt. In particular, the book offers an unusually thorough appreciation of Brianchon's work, a detailed study of Poncelet's innovations, and a remarkable account of the contributions of Möbius and Plücker. It also addresses the difficult question of the historical relationship between synthetic and analytic points of view in geometry, analyzing the work of prominent synthetic geometers Steiner, Chasles, and von Staudt in detail. The book concludes around 1930, after the synthetic point of view was axiomatized and the analytic point of view became intertwined with algebraic geometry. Balancing historical analysis with technical precision and providing deep insights into the evolution of the mathematics, this richly illustrated book serves as a central reference on the history of projective geometry.

ISBN: 9783031725852

Standard No.: 10.1007/978-3-031-72585-2doiSubjects--Topical Terms:

1021390
Projective Geometry.

LC Class. No.: QA471

Dewey Class. No.: 516.5

From here to infinity = tracing the origin and development of projective geometry /
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520 $a This monograph traces the development of projective geometry from its Greek origins to the early 20th century. It covers Renaissance perspective studies and insights from the late sixteenth to seventeenth centuries, examining the contributions of Desargues and Pascal. Most of the book is devoted to the evolution of the subject in the 19th century, from Carnot to von Staudt. In particular, the book offers an unusually thorough appreciation of Brianchon's work, a detailed study of Poncelet's innovations, and a remarkable account of the contributions of Möbius and Plücker. It also addresses the difficult question of the historical relationship between synthetic and analytic points of view in geometry, analyzing the work of prominent synthetic geometers Steiner, Chasles, and von Staudt in detail. The book concludes around 1930, after the synthetic point of view was axiomatized and the analytic point of view became intertwined with algebraic geometry. Balancing historical analysis with technical precision and providing deep insights into the evolution of the mathematics, this richly illustrated book serves as a central reference on the history of projective geometry.
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