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Tulczyjew, W. M.

An intrinsic formulation of nonrelativistic analytical mechanics and wave mechanics. (English) Zbl 0601.70001

J. Geom. Phys. 2, No. 3, 93-105 (1985).
An intrinsic formulation of analytical mechanics and wave mechanics is presented. Conventional formulations are obtained by reducing the dimension in a frame dependent way. Frame dependance (independance) of Hamilton Jacoby theory and Schrödinger wave mechanics is discussed in detail.
Reviewer: T.Atanackovič

Cited in 1 Review
Cited in 5 Documents

MSC:

70A05 Axiomatics, foundations
81P05 General and philosophical questions in quantum theory

Keywords:

Newtonian space time; Galilei transformations; intrinsic formulation; Frame dependance; independance; Hamilton Jacoby theory; Schrödinger wave mechanics
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\textit{W. M. Tulczyjew}, J. Geom. Phys. 2, No. 3, 93--105 (1985; Zbl 0601.70001)
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References:

[1] Bargmann, V., On unitary ray representations of continuous groups, Ann. Math., 59, 1 (1954) · Zbl 0055.10304
[2] Benenti, S., The Category of Symplectic Reductions, (Proceedings: International Meeting on Geometry and Physics. Proceedings: International Meeting on Geometry and Physics, Pitagora Editrice Bologna (1983)) · Zbl 0553.58002
[3] Benenti, S.; Tulczyjew, W. M., Sur le théoréme de Jacobi en mécanique analytique, C.R. Acad. Sc. Paris, 294, 677-680 (1982) · Zbl 0517.58008
[4] Duval, C.; Kunzle, H. P., Minimal Gravitational Coupling in the Newtonian Theory and the Covariant Schrödinger Equation, General Relativity and Gravitation, 16, 333 (1984)
[5] Levy-Leblond, J.-M., Nonrelativistic Particles and Wave Equations, Commun. Math. Phys., 6, 286 (1967) · Zbl 0154.46004
[6] Menzio, M. R.; Tulczyjew, W. M., Infinitesimal symplectic relations and generalized Hamiltonian dynamics, Ann. Inst. H. Poincaré, 28, 349 (1978) · Zbl 0405.58029
[7] Duval, C.; Burdet, G.; Kunzle, H. P.; Perrin, M., Bargmann structures and Newton-Cartan theory, Phys. Rev. D., 31, 1841 (1985)
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