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Revista mexicana de física E
versão impressa ISSN 1870-3542
Rev. mex. fís. E vol.57 no.2 México Dez. 2011
Enseñanza
The generating function of a canonical transformation
G. F. Torres del Castillo
Departamento de Física Matemática, Instituto de Ciencias, Universidad Autónoma de Puebla, 72570 Puebla, Pue., México.
Recibido el 27 de junio de 2011.
Aceptado el 3 de octubre de 2011.
Abstract
An elementary proof of the existence of the generating function of a canonical transformation is given. A shorter proof, making use of the formalism of differential forms is also given.
Keywords: Canonical transformations; generating function.
Resumen
Se da una prueba elemental de la existencia de una función generatriz de una transformación canónica. Se da también una prueba más corta, usando el formalismo de formas diferenciales.
Descriptores: Transformaciones canónicas; función generatriz.
PACS: 45.20.Jj
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References
1. M.G. Calkin, Lagrangian and Hamiltonian Mechanics (World Scientific, Singapore, 1996). Chap. VII. [ Links ]
2. H.C. Corben and P. Stehle, Classical Mechanics, 2nd ed. (Wiley, New York, 1960). Sec. 58. [ Links ]
3. H. Goldstein, C. Poole and J. Safko, Classical Mechanics, 3rd ed. (Addison–Wesley, San Francisco, 2002). Chap. 9. [ Links ]
4. D.T. Greenwood, Classical Dynamics (Prentice–Hall, Englewood Cliffs, NJ, 1977). Chap. 6. [ Links ]
5. C. Lanczos, The Variational Principles of Mechanics, 4th ed. (University of Toronto Press, Toronto, 1970). Chap. VII. [ Links ]
6. D. ter Haar, Elements of Hamiltonian Mechanics, 2nd ed. (Pergamon, Oxford, 1971). Chap. 5 § 2. [ Links ]
7. V.I. Arnold, Mathematical Methods of Classical Mechanics 2nd ed. (Springer, New York, 2010). [ Links ]
8. M. Crampin and F. A. E. Pirani, Applicable Differential Geometry (Cambridge University Press, Cambridge, 1986). [ Links ]
9. L.H. Loomis and S. Sternberg, Advanced Calculus (Addison–Wesley, Reading, MA, 1968). [ Links ]
10. S. Sternberg, Lectures on Differential Geometry (Chelsea, New York, 1983). [ Links ]
11. G.F. Torres del Castillo, Differentiable Manifolds: A Theoretical Physics Approach (Birkhauser Science, New York, 2012). [ Links ]
