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Mathematical Aspects of Classical and Celestial Mechanics Vladimir I. Arnold

Mathematical Aspects of Classical and Celestial Mechanics By Vladimir I. Arnold

Mathematical Aspects of Classical and Celestial Mechanics by Vladimir I. Arnold

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Summary

Dynamical Systems III

Mathematical Aspects of Classical and Celestial Mechanics Summary

Mathematical Aspects of Classical and Celestial Mechanics by Vladimir I. Arnold

The main purpose of the book is to acquaint mathematicians, physicists and engineers with classical mechanics as a whole, in both its traditional and its contemporary aspects. As such, it describes the fundamental principles, problems, and methods of classical mechanics, with the emphasis firmly laid on the working apparatus, rather than the physical foundations or applications. Chapters cover the n-body problem, symmetry groups of mechanical systems and the corresponding conservation laws, the problem of the integrability of the equations of motion, the theory of oscillations and perturbation theory.

Mathematical Aspects of Classical and Celestial Mechanics Reviews

From the reviews of the previous editions: ... 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

From the reviews of the third edition:

Mathematical Aspects of Classical and Celestial Mechanics is the third volume of Dynamical Systems section of Springer's Encyclopaedia of Mathematical sciences. ... if you wanted an idea of the broad scope of classical mechanics, this is a good place to visit. One advantage of the present book is that the authors are particularly skilled in balancing rigor with physical intuition. ... The authors provide an extensive bibliography and a well-selected set of recommended readings. Overall, this is a thoroughly professional offering. (William J. Satzer, MathDL, January, 2007)

The new edition is a considerable updating of the last. ... it is a reference for experts that will pull them back from their narrow subarea of expertise, give them a vast overview of what other experts know, and send them to the references if they actually want to be able to use something. ... In conclusion, this is a book that every mathematical library must own and that many experts will want to have on their shelves. (James Murdock, SIAM Review, Vol. 49 (4), 2007)

This book is the third English edition of an already classical piece devoted to classical mechanics as a whole, in its traditional and contemporary aspects ... . The book is significantly expanded with respect to its previous editions ... enriching further its already important contribution of acquainting mathematicians, physicists and engineers with the subject. ... New chapters on variational principles and tensor invariants were added, making the book more self-contained. ... Its purpose is to serve as a detailed guide on the subject ... . (Ernesto A. Lacomba, Mathematical Reviews, Issue 2008 a)

About Vladimir I. Arnold

V.I.Arnold

Famous author of various Springer books in the field of dynamical systems, differential equations, hydrodynamics, magnetohydrodynamics, classical and celestial mechanics, geometry, topology, algebraic geometry, symplectic geometry, singularity theory

1958 Award of the Mathematical Society of Moscow
1965 Lenin Award of the Government of the U.S.S.R.
1976 Honorary Member, London Mathematical Society
1979 Honorary Doctor, University P. and M. Curie, Paris
1982 Carfoord Award of the Swedish Academy
1983 Foreign Member, National Academy, U.S.A.
1984 Foreign Member, Academy of Sciences, Paris
1987 Foreign Member, Academy of Arts and Sciences, U.S.A.
1988 Honorary Doctor, Warwick University, Coventry
1988 Foreign Member, Royal Soc. London, GB
1988 Foreign Member, Accademia Nazionale dei Lincei, Rome, Italy
1990 Member, Academy of Sciences, Russia
1990 Foreign Member, American Philosophical Society
1991 Honorary Doctor, Utrecht
1991 Honorary Doctor, Bologna
1991 Member, Academy of Natural Sciences, Russia
1991 Member, Academia Europaea
1992 N.V. Lobachevsky Prize of Russian Academy of Sciences
1994 Harvey Prize Technion Award
1994 Honorary Doctor, University of Madrid, Complutense
1997 Honorary Doctor, University of Toronto, Canada
2001 Wolf Prize of Wolf Foundation

V.V.Kozlov

Famous Springer author working in the field of general principles of dynamics, integrability of equations of motion, variational methods in mechanics, rigid body dynamics, stability theory, non-holonomic mechanics, impact theory, symmetries and integral invariants, mathematical aspects of statistical mechanics, ergodic theory and mathematical physics.

1973 Lenin Komsomol Prize (the major prize for young scientists in USSR)
1986 M.V. Lomonosov 1st Degree Prize (the major prize awarded by M.V. Lomonosov Moscow State University)
1988 S. A. Chaplygin Prize of Russian Academy of Sciences
1994 State Prize of the Russian Federation
1995 Member, Russian Academy of Natural Sciences
2000 S.V. Kovalevskaya Prize of Russian Academy of Sciences
2000 Member, Academy of Sciences, Russia
2003 Foreign member of the Serbian Science Society


A.I.Neishtadt

Neishtadt is also Springer Author, working in the field of perturbation theory (in particular averaging of perturbations, adiabatic invariants), bifurcation theory, celestial mechanics

2001 A.M.Lyapunov Prize of Russian Academy of Sciences (joint with D.V.Anosov))

Table of Contents

Basic Principles of Classical Mechanics.- The n-Body Problem.- Symmetry Groups and Order Reduction.- Variational Principles and Methods.- Integrable Systems and Integration Methods.- Perturbation Theory for Integrable Systems.- Non-Integrable Systems.- Theory of Small Oscillations.- Tensor Invariants of Equations of Dynamics.

Additional information

NLS9783642066474
9783642066474
364206647X
Mathematical Aspects of Classical and Celestial Mechanics by Vladimir I. Arnold
Vladimir I. Arnold
Encyclopaedia of Mathematical Sciences
New
Paperback
Springer-Verlag Berlin and Heidelberg GmbH & Co. KG
2010-11-13
505
N/A
Book picture is for illustrative purposes only, actual binding, cover or edition may vary.
This is a new book - be the first to read this copy. With untouched pages and a perfect binding, your brand new copy is ready to be opened for the first time

Customer Reviews - Mathematical Aspects of Classical and Celestial Mechanics