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Download Vvedenie v geometrii͡u︡ mnogoobraziĭ s simmetrii͡a︡mi (Russian Edition) djvu

Download Vvedenie v geometrii͡u︡ mnogoobraziĭ s simmetrii͡a︡mi (Russian Edition) djvu

by V. V Trofimov

Author: V. V Trofimov
Subcategory: Foreign Language Study & Reference
Language: Russian
Publisher: Izd-vo Moskovskogo universiteta (1989)
Category: Reference
Rating: 4.8
Other formats: txt azw mobi lit

Are you sure you want to remove Vvedenie v geometrii͡u︡ mnogoobraziĭ s simmetrii͡a︡mi from your list? Vvedenie v geometrii͡u︡ mnogoobraziĭ s simmetrii͡a︡mi. Published 1989 by Izd-vo Moskovskogo universiteta in Moskva. Geometry, Manifolds (Mathematics), Symmetry.

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Vvedenie v geometriju.

File Name: Trofimov . Volume info: Series: Periodical: Author: Трофимов . Vvedenie v geometriju mnogoobrazij s simmetrijami (ru)(362s). Information: Volume info: Series: Periodical: Author: Трофимов .

Введение в геометрию многообразий с симметриями. VII Russian-Armenian Meeting. September 9-15, 2018. 2016-02-21T19:13:59Z.

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Описание: This book is an introductory graduate-level textbook on the theory of smooth manifolds Along the way, the book introduces students to some of the most important examples of geometric structures that manifolds can carry, such as Riemannian metrics.

Описание: This book is an introductory graduate-level textbook on the theory of smooth manifolds. Along the way, the book introduces students to some of the most important examples of geometric structures that manifolds can carry, such as Riemannian metrics, symplectic structures, and foliations.

Euclid took an abstract approach to geometry in his Elements, one of the most influential books ever written

Euclid took an abstract approach to geometry in his Elements, one of the most influential books ever written. Euclid introduced certain axioms, or postulates, expressing primary or self-evident properties of points, lines, and planes. He proceeded to rigorously deduce other properties by mathematical reasoning. In essence, their propositions concerning the properties of quadrangles which they considered, assuming that some of the angles of these figures were acute of obtuse, embodied the first few theorems of the hyperbolic and the elliptic geometries.