Mathematical Aspects of Classical and Celestial Mechanics

From the reviews: "... As an encyclopaedia article, this book does not seek to serve as a textbook, nor to replace the original articles whose results it describes. The book's goal is to provide an overview, pointing out highlights and unsolved problems, and putting individual results into...

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Bibliographic Details
Main Authors: Arnold, V.I. (Editor), Kozlov, Victor V. (Author), Neishtadt, A.I. (Author)
Format: eBook
Language:English
Published: Berlin, Heidelberg Springer Berlin Heidelberg 1997, 1997
Edition:2nd ed. 1997
Subjects:
Online Access:
Collection: Springer Book Archives -2004 - Collection details see MPG.ReNa
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245 0 0 |a Mathematical Aspects of Classical and Celestial Mechanics  |h Elektronische Ressource  |c by V.I. Arnold, Victor V. Kozlov, A.I. Neishtadt ; edited by V.I. Arnold 
250 |a 2nd ed. 1997 
260 |a Berlin, Heidelberg  |b Springer Berlin Heidelberg  |c 1997, 1997 
300 |a XIV, 294 p  |b online resource 
505 0 |a 1. Basic Principles of Classical Mechanics -- § 1. Newtonian Mechanics -- § 2. Lagrangian Mechanics -- § 3. Hamiltonian Mechanics -- § 4. Vakonomic Mechanics -- § 5. Hamiltonian Formalism with Constraints -- § 6. Realization of Constraints -- 2. The ?-Body Problem -- § 1. The Two-Body Problem -- § 2. Collisions and Regularization -- § 3. Particular Solutions -- § 4. Final Motions in the Three-Body Problem -- § 5. The Restricted Three-Body Problem -- § 6. Ergodic Theorems in Celestial Mechanics -- 3. Symmetry Groups and Reduction (Lowering the Order) -- § 1. Symmetries and Linear First Integrals -- § 2. Reduction of Systems with Symmetry -- § 3. Relative Equilibria and Bifurcations of Invariant Manifolds -- 4. Integrable Systems and Integration Methods -- § 1. Brief Survey of Various Approaches to the Integrability of Hamiltonian Systems -- § 2. Completely Integrable Systems -- §3. Some Methods of Integrating Hamiltonian Systems -- §4. Nonholonomic Integrable Systems -- 5. Perturbation Theory for Integrable Systems -- §1. Averaging of Perturbations -- §2. Averaging in Hamiltonian Systems -- §3. The KAM Theory -- § 4. Adiabatic Invariants -- 6. Nonintegrable Systems -- §1. Near-Integrable Hamiltonian Systems -- § 2. Splitting of Asymptotic Surfaces -- § 3. Quasi-Random Oscillations -- § 4. Nonintegrability in the Neighborhood of an Equilibrium Position (Siegel’s Method) -- § 5. Branching of Solutions and Nonexistence of Single-Valued First Integrals -- § 6. Topological and Geometrical Obstructions to Complete Integrability of Natural Systems with Two Degrees of Freedom -- 7. Theory of Small Oscillations -- §1. Linearization -- § 2. Normal Forms of Linear Oscillations -- § 3. Normal Forms of Hamiltonian Systems Near Equilibria -- § 4. Normal Forms of Hamiltonian Systems Near Closed Trajectories -- § 5. Stability of Equilibria in Conservative Fields -- Comments on the Bibliography -- Recommended Reading 
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653 |a Analysis (Mathematics) 
653 |a Theoretical, Mathematical and Computational Physics 
700 1 |a Kozlov, Victor V.  |e [author] 
700 1 |a Neishtadt, A.I.  |e [author] 
700 1 |a Arnold, V.I.  |e [editor] 
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520 |a From the reviews: "... As an encyclopaedia article, this book does not seek to serve as a textbook, nor to replace the original articles whose results it describes. The book's goal is to provide an overview, pointing out highlights and unsolved problems, and putting individual results into a coherent context. It is full of historical nuggets, many of them surprising. ... The examples are especially helpful; if a particular topic seems difficult, a later example frequently tames it. The writing is refreshingly direct, never degenerating into a vocabulary lesson for its own sake. The book accomplishes the goals it has set for itself. While it is not an introduction to the field, it is an excellent overview. ..." American Mathematical Monthly, Nov. 1989 "This is a book to curl up with in front of a fire on a cold winter's evening. ..." SIAM Reviews, Sept. 1989