Titre : | Modern geometry, methods and applications. Part 1, The geometry of surfaces, transformation groups, and fields | Type de document : | document imprimé | Auteurs : | B. A. Dubrovin, Auteur ; A. T. Fomenko, Auteur ; S. P. Novikov, Auteur ; Trans. by Robert G. Burns, Autres | Mention d'édition : | 2nd ed. | Editeur : | New York : Springer-Verlag | Année de publication : | 1992 | Collection : | Graduate texts in mathematics | Importance : | XV-468 p. : ill. ; 25 cm | ISBN/ISSN/EAN : | 0-387-97663-9|3- | Note générale : | Hardback
| Langues : | Français (fre) | Index. décimale : | 02.40 Geometry, differential geometry, and topology | Résumé : | This revised second edition is the first volume of a three-volume introduction to modern geometry, with emphasis on applications to other areas of mathematics and theoretical physics. Topics covered include tensors and their differential calculus, the calculus of variations in one and several dimensions, and geometric field theory. Table of contents: 1: Geometry in Regions of a Spaces. Basic Concepts. 2: The Theory of Surfaces. 3: Tensors: The Algebraic Theory. 4: The Differential Calculus of Tensors. 5: The Elements of the Calculus of Variations. 6: The Calculus of Variations in Several Dimensions.
| Note de contenu : | ""Original Russian edition: Sovremennaja geometrija: metody i prilo¤enija. Moskva: Nauka, 1979""
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Modern geometry, methods and applications. Part 1, The geometry of surfaces, transformation groups, and fields [document imprimé] / B. A. Dubrovin, Auteur ; A. T. Fomenko, Auteur ; S. P. Novikov, Auteur ; Trans. by Robert G. Burns, Autres . - 2nd ed. . - Springer-Verlag, 1992 . - XV-468 p. : ill. ; 25 cm. - ( Graduate texts in mathematics) . ISSN : 0-387-97663-9|3- Hardback
Langues : Français ( fre) Index. décimale : | 02.40 Geometry, differential geometry, and topology | Résumé : | This revised second edition is the first volume of a three-volume introduction to modern geometry, with emphasis on applications to other areas of mathematics and theoretical physics. Topics covered include tensors and their differential calculus, the calculus of variations in one and several dimensions, and geometric field theory. Table of contents: 1: Geometry in Regions of a Spaces. Basic Concepts. 2: The Theory of Surfaces. 3: Tensors: The Algebraic Theory. 4: The Differential Calculus of Tensors. 5: The Elements of the Calculus of Variations. 6: The Calculus of Variations in Several Dimensions.
| Note de contenu : | ""Original Russian edition: Sovremennaja geometrija: metody i prilo¤enija. Moskva: Nauka, 1979""
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