# Integrable Problems of Celestial Mechanics in Spaces of Constant Curvature

Part of the Astrophysics and Space Science Library book series (ASSL, volume 295)

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Part of the Astrophysics and Space Science Library book series (ASSL, volume 295)

Introd uction The problem of integrability or nonintegrability of dynamical systems is one of the central problems of mathematics and mechanics. Integrable cases are of considerable interest, since, by examining them, one can study general laws of behavior for the solutions of these systems. The classical approach to studying dynamical systems assumes a search for explicit formulas for the solutions of motion equations and then their analysis. This approach stimulated the development of new areas in mathematics, such as the al gebraic integration and the theory of elliptic and theta functions. In spite of this, the qualitative methods of studying dynamical systems are much actual. It was Poincare who founded the qualitative theory of differential equa tions. Poincare, working out qualitative methods, studied the problems of celestial mechanics and cosmology in which it is especially important to understand the behavior of trajectories of motion, i.e., the solutions of differential equations at infinite time. Namely, beginning from Poincare systems of equations (in connection with the study of the problems of ce lestial mechanics), the right-hand parts of which don't depend explicitly on the independent variable of time, i.e., dynamical systems, are studied.

Area Celestial mechanics differential geometry dynamics geometry mechanics topology

- DOI https://doi.org/10.1007/978-94-017-0303-1
- Copyright Information Springer Science+Business Media B.V. 2003
- Publisher Name Springer, Dordrecht
- eBook Packages Springer Book Archive
- Print ISBN 978-90-481-6382-3
- Online ISBN 978-94-017-0303-1
- Series Print ISSN 0067-0057
- Buy this book on publisher's site

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