2003, ISBN: 0821833154
ID: 11234693692
[EAN: 9780821833155], Neubuch, [PU: American Mathematical Society, United States], Mathematics|General, Mathematics|Geometry|Differential, Language: English . Brand New Book. The notion of homotopy principle or $h$-principle is one of the key concepts in an elegant language developed by Gromov to deal with a host of questions in geometry and topology. Roughly speaking, for a certain differential geometric problem to satisfy the $h$-principle is equivalent to saying that a solution to the problem exists whenever certain obvious topological obstructions vanish. The foundational examples for applications of Gromov s ideas include Hirsch-Smale immersion theory, Nash-Kuiper $C^1$-isometric immersion theory, existence of symplectic and contact structures on open manifolds. Gromov has developed several powerful methods that allow one to prove $h$-principles. These notes, based on lectures given in the Graduiertenkolleg of Leipzig University, present two such methods which are strong enough to deal with applications Hirsch-Smale immersion theory, and existence of symplectic and contact structures on open manifolds.
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2003, ISBN: 0821833154
ID: 9285200146
[EAN: 9780821833155], Neubuch, [PU: American Mathematical Society, United States], Mathematics|General, Mathematics|Geometry|Differential, Language: English . Brand New Book. The notion of homotopy principle or $h$-principle is one of the key concepts in an elegant language developed by Gromov to deal with a host of questions in geometry and topology. Roughly speaking, for a certain differential geometric problem to satisfy the $h$-principle is equivalent to saying that a solution to the problem exists whenever certain obvious topological obstructions vanish. The foundational examples for applications of Gromov s ideas include Hirsch-Smale immersion theory, Nash-Kuiper $C^1$-isometric immersion theory, existence of symplectic and contact structures on open manifolds. Gromov has developed several powerful methods that allow one to prove $h$-principles. These notes, based on lectures given in the Graduiertenkolleg of Leipzig University, present two such methods which are strong enough to deal with applications Hirsch-Smale immersion theory, and existence of symplectic and contact structures on open manifolds.
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ISBN: 0821833154
ID: 16396777401
[EAN: 9780821833155], Neubuch, [PU: American Mathematical Society], Mathematics|General, Mathematics|Geometry|Differential, BRAND NEW, H-principles and Flexibility in Geometry, Hansjorg Geiges, The notion of homotopy principle or $h$-principle is one of the key concepts in an elegant language developed by Gromov to deal with a host of questions in geometry and topology. Roughly speaking, for a certain differential geometric problem to satisfy the $h$-principle is equivalent to saying that a solution to the problem exists whenever certain obvious topological obstructions vanish. The foundational examples for applications of Gromov's ideas include Hirsch-Smale immersion theory, Nash-Kuiper $C^1$-isometric immersion theory, existence of symplectic and contact structures on open manifolds. Gromov has developed several powerful methods that allow one to prove $h$-principles. These notes, based on lectures given in the Graduiertenkolleg of Leipzig University, present two such methods which are strong enough to deal with applications Hirsch-Smale immersion theory, and existence of symplectic and contact structures on open manifolds.
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2003, ISBN: 0821833154
ID: 2717383361
[EAN: 9780821833155], Neubuch, [PU: American Mathematical Society], Mathematics|General, Mathematics|Geometry|Differential, Brand new. We distribute directly for the publisher. The notion of homotopy principle or $h$-principle is one of the key concepts in an elegant language developed by Gromov to deal with a host of questions in geometry and topology. Roughly speaking, for a certain differential geometric problem to satisfy the $h$-principle is equivalent to saying that a solution to the problem exists whenever certain obvious topological obstructions vanish.The foundational examples for applications of Gromov's ideas include * (i) Hirsch-Smale immersion theory, * (ii) Nash-Kuiper $C^1$-isometric immersion theory, * (iii) existence of symplectic and contact structures on open manifolds.Gromov has developed several powerful methods that allow one to prove $h$-principles. These notes, based on lectures given in the Graduiertenkolleg of Leipzig University, present two such methods which are strong enough to deal with applications (i) and (iii).
Abebooks.de
Sequitur Books, Boonsboro, MD, U.S.A. [53436069] [Rating: 4 (von 5)]
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2003, ISBN: 9780821833155
ID: 319261257
American Mathematical Society, 2003-07-01. Mass Market Paperback. New. Brand new. We distribute directly for the publisher. The notion of homotopy principle or $h$-principle is one of the key concepts in an elegant language developed by Gromov to deal with a host of questions in geometry and topology. Roughly speaking, for a certain differential geometric problem to satisfy the $h$-principle is equivalent to saying that a solution to the problem exists whenever certain obvious topological obstructions vanish.The foundational examples for applications of Gromov's ideas include * (i) Hirsch-Smale immersion theory, * (ii) Nash-Kuiper $C^1$-isometric immersion theory, * (iii) existence of symplectic and contact structures on open manifolds.Gromov has developed several powerful methods that allow one to prove $h$-principles. These notes, based on lectures given in the Graduiertenkolleg of Leipzig University, present two such methods which are strong enough to deal with applications (i) and (iii)., American Mathematical Society, 2003-07-01
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Author: | |
Title: | H-Principles and Flexibility in Geometry (Memoirs of the American Mathematical Society) |
ISBN: | 0821833154 |
Details of the book - H-Principles and Flexibility in Geometry (Memoirs of the American Mathematical Society)
EAN (ISBN-13): 9780821833155
ISBN (ISBN-10): 0821833154
Paperback
Publishing year: 2003
Publisher: American Mathematical Society
Book in our database since 06.12.2007 22:34:03
Book found last time on 10.08.2016 10:21:57
ISBN/EAN: 0821833154
ISBN - alternate spelling:
0-8218-3315-4, 978-0-8218-3315-5
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