1 Introduction and Overview.- 2 Hamiltonian Systems on Linear Symplectic Spaces.- 3 An Introduction to Infinite-Dimensional Systems.- 4 Manifolds, Vector Fields, and Differential Forms.- 5 Hamiltonian Systems on Symplectic Manifolds.- 6 Cotangent Bundles.- 7 Lagrangian Mechanics.- 8 Variational Principles, Constraints, & Rotating Systems.- 9 An Introduction to Lie Groups.- 10 Poisson Manifolds.- 11 Momentum Maps.- 12 Computation and Properties of Momentum Maps.- 13 Lie—Poisson and Euler—Poincaré Reduction.- 14 Coadjoint Orbits.- 15 The Free Rigid Body.- References.
2nd edition
"The book is self-contained.It remains a good and solid
introduction to this subject."
Nieuw Archief voor Wiskunde, March 2001 "... This book takes the
reader on one of the greatest journeys in modern mathematics that
has as its roots a subject that is more than 300 years old. Armed
with this knowledge a reader is ready to pursue numerous topics of
active mathematical research, from the more pure domains of
symplectic geometry and topology to the geometric analysis of the
limitless supply of examples from mechanics."
Newsletter of the Newzealand Mathematical Society, No. 81, April
2001 Second Edition J.E. Marsden and T.S. Ratiu Introduction to
Mechanics and Symmetry A Basic Exposition of Classical Mechanical
Systems "As the name of the book implies, a consistent theme
running through the book is that of symmetry. Indeed the latter
half of the book focuses on Poisson manifolds, momentum maps,
Lie-Poisson reduction, co-adjoint orbits and the integrability of
the rigid body. The discussion of reduction must be the most
comprehensive yet given. A pleasant feature of the book is that
most of the theory that relates to finite-dimensional mechanical
systems is illustrated concretely in terms of local coordinates,
thereby making the book accessible even to beginners in the
field."—MATHEMATICAL REVIEWS
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