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Journal of Siberian Federal University. Mathematics & Physics, 2008, Volume 1, Issue 1, Pages 63–67
(Mi jsfu7)
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The Programm of Poincaré as Alternative to Klein's Programm (to Centenary of Publication)
Valery K. Beloshapka
Faculty of Mechanics and Mathematics, Moscow State University
Abstract:
In 1907, H. Poincaré suggested a new approach to infinite-dimensional geometry. In a sense, his approach is dual to the famous Klein's program. The first step of Poincaré's approach is to single out a canonical object and then to consider the symmetry group of the object, whereas the Klein's program is the passage from a prescribed structure group to objects. Now, a century later, Poincaré's methods can compete with É. Cartan's $G$-structure reduction. In the present paper, this competition is illustrated by some results in the geometry of real submanifolds of the complex space.
Keywords:
$G$-strucrure, pseudogroup of transformations, Lie group, Lie algebra, real submanifold, model surface, moduli space.
Received: 01.09.2007
Accepted: 10.10.2007
Citation:
Valery K. Beloshapka, “The Programm of Poincaré as Alternative to Klein's Programm (to Centenary of Publication)”, J. Sib. Fed. Univ. Math. Phys., 1:1 (2008), 63–67
Linking options:
https://www.mathnet.ru/eng/jsfu7 https://www.mathnet.ru/eng/jsfu/v1/i1/p63
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| Abstract page: | 973 | | Full-text PDF : | 308 | | References: | 101 |
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