An innovative and mathematically sound treatment of the foundations of analytical mechanics and the relation of classical mechanics to relativity and quantum theory. It is intended for use at the introductory graduate level. A distinguishing feature of the book is its integration of special relativity into teaching of classical mechanics. After a thorough review of the traditional theory, Part II of the book introduces extended Lagrangian and Hamiltonian methods that treat time as a transformable coordinate rather than the fixed parameter of Newtonian physics. Advanced topics such as covariant Langrangians and Hamiltonians, canonical transformations, and Hamilton-Jacobi methods are simplified by the use of this extended theory. And the definition of canonical transformation no longer excludes the Lorenz transformation of special relativity. This is also a book for those who study analytical mechanics to prepare for a critical exploration of quantum mechanics. Comparisons to quantum mechanics appear throughout the text. The extended Hamiltonian theory with time as a coordinate is compared to Dirac's formalism of primary phase space constraints. The chapter on relativistic mechanics shows how to use covariant Hamiltonian theory to write the Klein-Gordon and Dirac equations. The chapter on Hamilton-Jacobi theory includes a discussion of the closely related Bohm hidden variable model of quantum mechanics. Classical mechanics itself is presented with an emphasis on methods, such as linear vector operators and dyadics, that will familiarize the student with similar techniques in quantum theory. Several of the current fundamental problems in theoretical physics - the development of quantum information technology, and the problem of quantizing the gravitational field, to name two - require a rethinking of the quantum-classical connection. Graduate students preparing for research careers will find a graduate mechanics course based on this book to be an essential bridge between their undergraduate training and advanced study in analytical mechanics, relativity, and quantum mechanics.
| ISBN | 0191001627 | | Weight (grammes) | 1446 | | ISBN13 | 9780191001628
(What's this?) | | Published in | Oxford | | Publisher | Oxford University Press | | Series title | Oxford Graduate Texts | | Imprint | Oxford University Press | | Previous ISBN | 9780198567264 | | Format | Hardback | | Height (mm) | 244 | | Publication date | 19 May 2011 | | Width (mm) | 178 | | DEWEY | 531.01515 | | Spine width (mm) | 37 | | DEWEY edition | DC22 | | Academic level | Undergraduate | | Pages | 656 | |
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I: INTRODUCTION: THE TRADITIONAL THEORY; 1. Basic Dynamics of Point Particles and Collections; 2. Introduction to Lagrangian Mechanics; 3. Lagrangian Theory of Constraints; 4. Introduction to Hamiltonian Mechanics; 5. The Calculus of Variations; 6. Hamilton's Principle; 7. Linear Operators and Dyadics; 8. Kinematics of Rotation; 9. Rotational Dynamics; 10. Small Vibrations About Equilibrium; 11. Two-body Central Force Systems; 12. Introduction to Scattering; II:MECHANICS WITH TIME AS A COORDINATE; 13. Lagrangian Mechanics with Time as a Coordinate; 14. Hamiltonian Mechanics with Time as a Coordinate; 15. Hamilton's Principle and Noether's Theorem; 16. Relativity and Spacetime; 17. Fourvectors and Operators; 18. Relativistic Mechanics; 19. Canonical Transformations; 20. Generating Functions; 21. Hamilton-Jacobi Theory; III: MATHEMATICAL APPENDICES; A. Vector Fundamentals; B. Matrices and Determinants; C. Eigenvalue Problem with General Metric; D. The Calculus of Many Variables; E. Geometry of Phase Space
Review from previous edition: "The author deserves to be congratulated on the production of what soon will establish itself as a well-respected and useful book which I am pleased to have on my shelf. In short, it would be difficult to conceive of any initial course of instruction and study on the subject of analytical mechanics for relatively and quantum mechanics which would not benefit from use of this well-planned and conceived and refreshing presentation." --Current Engineering Practice
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