Introduction to Geometry of Manifolds with Symmetry: 270 (Mathematics and Its Applications, 270) - Hardcover

Trofimov, V.V.

 
9780792325611: Introduction to Geometry of Manifolds with Symmetry: 270 (Mathematics and Its Applications, 270)
Hardcover
ISBN 10: 0792325613 ISBN 13: 9780792325611
Publisher: Springer, 1994

Synopsis

One ofthe most important features of the development of physical and mathematical sciences in the beginning of the 20th century was the demolition of prevailing views of the three-dimensional Euclidean space as the only possible mathematical description of real physical space. Apriorization of geometrical notions and identification of physical 3 space with its mathematical modellR were characteristic for these views. The discovery of non-Euclidean geometries led mathematicians to the understanding that Euclidean geometry is nothing more than one of many logically admissible geometrical systems. Relativity theory amended our understanding of the problem of space by amalgamating space and time into an integral four-dimensional manifold. One of the most important problems, lying at the crossroad of natural sciences and philosophy is the problem of the structure of the world as a whole. There are a lot of possibilities for the topology offour­ dimensional space-time, and at first sight a lot of possibilities arise in cosmology. In principle, not only can the global topology of the universe be complicated, but also smaller scale topological structures can be very nontrivial. One can imagine two "usual" spaces connected with a "throat", making the topology of the union complicated.

"synopsis" may belong to another edition of this title.

Synopsis

This volume provides an introduction to the geometry of manifolds equipped with additional structures connected with the notion of symmetry. The content is divided into five chapters. Chapter I presents the elements of differential geometry which are used in subsequent chapters. Part of the chapter is devoted to general topology, part to the theory of smooth manifolds, and the remaining sections deal with manifolds with additional structures. Chapter II is devoted to the basic notions of the theory of spaces. One of the main topics here is the realization of affinely connected symmetric spaces as totally geodesic submanifolds of Lie groups.In Chapter IV, the most important classes of vector bundles are constructed. This is carried out in terms of differential forms. The geometry of the Euler class is of special interest here. Chapter V presents some applications of the geometrical concepts discussed. In particular, an introduction to modern methods of integration of nonlinear differential equations is given, as well as considerations involving the theory of hydrodynamic-type Poisson brackets with connections to interesting algebraic structures.

It is useful for mathematicians and mathematical physicists wishing to obtain a good introduction to the geometry of manifolds. This volume can also be recommended as a supplementary graduate text.

"About this title" may belong to another edition of this title.

Publisher
Springer
Publication date
1994
Language
English
ISBN 10 
0792325613
ISBN 13 
9780792325611
Binding
Hardcover
Number of pages
339

Other Popular Editions of the Same Title

9789048143368: Introduction to Geometry of Manifolds with Symmetry: 270 (Mathematics and Its Applications, 270)

Featured Edition

ISBN 10:  9048143365 ISBN 13:  9789048143368
Publisher: Springer, 2010
Softcover