Literatura académica sobre el tema "Cartan, Élie (1869-1951) – Géométrie"
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Artículos de revistas sobre el tema "Cartan, Élie (1869-1951) – Géométrie"
Thomas, C. B. "ÉLIE CARTAN (1869-1951)". Bulletin of the London Mathematical Society 27, n.º 4 (julio de 1995): 410–12. http://dx.doi.org/10.1112/blms/27.4.410.
Texto completoHawkins, Thomas. "Élie Cartan (1869–1951).By M. A. Akivis and B. A. Rosenfeld. Translated from a Russian manuscript by V. V. Goldberg. Providence (American Mathematical Society)." Historia Mathematica 23, n.º 1 (febrero de 1996): 92–95. http://dx.doi.org/10.1006/hmat.1996.0010.
Texto completoTesis sobre el tema "Cartan, Élie (1869-1951) – Géométrie"
Imsatfia, Moheddine. "Géométrie de Cartan fondée sur la notion d'aire et application du problème d'équivalence". Phd thesis, Université Paris-Diderot - Paris VII, 2012. http://tel.archives-ouvertes.fr/tel-00850134.
Texto completoChorlay, Renaud. "L' émergence du couple local / global dans les théories géométriques : de Bernard Riemann à la théorie des faisceaux (1851-1953)". Paris 7, 2007. http://www.theses.fr/2007PA070063.
Texto completoSince the 1950's, the distinction between "local" and "global" has been used constantly when expounding various fields of mathematics. However, the first writings to make use of the opposition of local and global notions in a systematic way already appeared in the first years of the 20th century and expounded mathematical theories which had emerged as long ago as the 1850's. In the first part of this text, we present Riemann's work in global complex Analysis and in differential geometry, discuss its reading by Neumann and Klein, and study some of Poincaré's works. Besides specific mathematical results, we focus on the descriptive framework employed by these authors and their pre-set-theoretic manner of referring to loci. In the second part, we identify and explore two distinct frameworks, the "world of quantity" and the "world of sets" ; it allows us to characterise different periods in the evolution of Analysis in the 19th century, and to describe the conditions for the explicit emergence of the distinction between local and global notions. The third part is devoted to this explicit emergence, between 1898 and 1913, in the works of W. F. Osgood, Hadamard and Weyl. We distinguish between three levels on which the distinction emerged : the meta-Ievel, thematic level and structural level. The fourth part deals with the rise of global problems in differential geometry and in the theory of Lie groups, through a study of the deeply interconnected work of Weyl and Elie Cartan in the 1920's Lastly we study the emergence and elaboration of structures designed to express and address specifically global problems : differentiable manifolds, fibre spaces and sheaves
Libros sobre el tema "Cartan, Élie (1869-1951) – Géométrie"
Akivis, M. A. y B. A. Rosenfeld. Élie Cartan (1869-1951) (Translations of Mathematical Monographs). American Mathematical Society, 2011.
Buscar texto completoActas de conferencias sobre el tema "Cartan, Élie (1869-1951) – Géométrie"
Murakami, Hidenori. "Integrability Conditions in Nonlinear Beam Kinematics". En ASME 2016 International Mechanical Engineering Congress and Exposition. American Society of Mechanical Engineers, 2016. http://dx.doi.org/10.1115/imece2016-65293.
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