Much of the mathematics with which Felix Klein and Sophus Lie are now associated (Klein’s Erlangen Program and Lie’s theory of transformation groups) is rooted in ideas they developed in their early work: the consideration of geometric objects or properties preserved by systems of transformations. As early as 1870, Lie studied particular examples of what he later called contact transformations, which preserve tangency and which came to play a crucial role in his systematic study of transformation groups and differential equations. This note examines Klein’s efforts in the 1870s to interpret contact transformations in terms of connexes and traces that interpretation (which included a false assumption) over the decades that follow. The analysis passes from Klein’s letters to Lie through Lindemann’s edition of Clebsch’s lectures on geometry in 1876, Lie’s criticism of it in his treatise on transformation groups in 1893, and the careful development of that interpretation by Dohmen, a student of Engel, in his 1905 dissertation. The now-obscure notion of connexes and its relation to Lie’s line elements and surface elements are discussed here in some detail.
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Book
Yaglom, I.M.;
(1988)
Felix Klein and Sophus Lie: Evolution of the idea of symmetry in the 19th century. Translated by Sergei Sossinsky. Edited by Hardy Grant and Abe Shenitzer
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Chapter
Rowe, David E.;
(1989)
The early geometrical works of Sophus Lie and Felix Klein
(/isis/citation/CBB000062250/)
Article
Lie, Sophus;
(1985)
Three letters from Sophus Lie to Felix Klein on Parisian mathematics during the early 1880's. Translated by Rowe, David E.
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Hawkins, Thomas;
(2000)
Emergence of the theory of Lie groups: An essay in the history of mathematics, 1869-1926
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Article
Rowe, David E.;
(1988)
Der Briefwechsel Sophus Lie--Felix Klein: Eine Einsicht in ihre persönlichen und wissenschaftlichen Beziehungen
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Book
Iaglom, Isaak M.;
(1977)
Feliks Klein i Sofus Li
(/isis/citation/CBB000015523/)
Chapter
Tobies, Renate;
(2002)
The Development of Göttingen into the Prussian Centre of Mathematics and the Exact Sciences
(/isis/citation/CBB000470667/)
Article
Nicol Imperi;
Enrico Rogora;
(2024)
Lettere di Paolo Medolaghi a Friedrich Engel sulla teoria dei gruppi continui
(/isis/citation/CBB191805498/)
Article
Rowe, David E.;
(2004)
Making Mathematics in an Oral Culture: Göttingen in the Era of Klein and Hilbert
(/isis/citation/CBB000500124/)
Article
Schlimm, Dirk;
(2013)
The Correspondence between Moritz Pasch and Felix Klein
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Article
Le, François;
(2015)
“Geometrical equations”: Forgotten premises of Felix Klein's Erlanger Programm
(/isis/citation/CBB001552558/)
Article
Siqueira, Rogério Monteiro da;
(2015)
Editing Geometries: The Geometry Volumes in Klein's Encyclopedia
(/isis/citation/CBB001510467/)
Article
Schubring, Gert;
(2007)
Der Aufbruch zum “funktionalen Denken”: Geschichte des Mathematikunterrichts im Kaiserreich: 100 Jahre Meraner Reform
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Article
Glas, Eduard;
(2000)
Model-based reasoning and mathematical discovery: The Case of Felix Klein
(/isis/citation/CBB000110929/)
Article
Deng, Ming-li;
Zhang, Hong-mei;
(2008)
The Historical Origins of the Unification of Geometries by Means of Group Theory
(/isis/citation/CBB000760575/)
Article
Ausejo Martínez, Elena;
Ausejo Lifante, Elena;
(2017)
Correspondencia de Zoel García de Galdeano con matemáticos alemanes: Georg Cantor
(/isis/citation/CBB631684117/)
Chapter
Giulia Giannini;
(2009)
Poincaré, la nozione di gruppo e il Programma di Erlangen di F. Klein
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Article
Henning Heller;
(2022)
Felix Klein’s projective representations of the groups S6 and A7
(/isis/citation/CBB746243101/)
Chapter
Rowe, David E.;
(2001)
Felix Klein as Wissenschaftspolitiker
(/isis/citation/CBB000620151/)
Book
Renate Tobies;
(2019)
Felix Klein: Visionen für Mathematik, Anwendungen und Unterricht
(/isis/citation/CBB686145722/)
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