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Efthymiopoulos, Christos:
Perturbative methods in Celestial Mechanics and the roots of Quantum Mechanics: a historical note
La Matematica nella Società e nella Cultura. Rivista dell'Unione Matematica Italiana Serie 1 8 (2015), fasc. n.2, p. 191-224, (English)
pdf (466 Kb), djvu (319 Kb). | MR 3445577

Referenze Bibliografiche
[1] AITCHISON, I., MACMANUS, D.A., and SNYDER, T.M., 2004, Understanding Heisenberg's `magical' paper of July 1925: a new look at the calculational details, American J. Phys. 72, 1370. | fulltext (doi) | MR 2093526 | Zbl 1219.81004
[2] https://www.aip.org/history/heisenberg/p07.htm
[3] ALI, M.K., 1985, The quantum normal form and its equivalents, J. Math. Phys. 26, 2565. | fulltext (doi) | MR 803802
[4] ARNOLD, V.I., 1963, Small denominators and the problem of stability of motion in classical and celestial mechanics, Russ. Math. Surveys, 18, 9. | MR 170705
[5] BERRY, M., 1989, Quantum chaology, not quantum chaos, Phys. Scr. 40, 335. | fulltext (doi) | MR 1014859 | Zbl 1063.81572
[6] BIRKHOFF, G., 1927, Dynamical Systems. American Mathematical Society. Providence. | MR 209095 | Zbl 53.0732.01
[7] BOCCALETTI, D., and PUCACCO, G., 1998 Theory of Orbits Vol II. Perturbative and Geometric Methods, Springer, Berlin. | fulltext (doi) | MR 1391960 | Zbl 0927.70002
[8] BORN, M., 1935, Atomic Physics, Blackie & Son, Glasgow.
[9] BORN, M., and JORDAN, P., 1925, Zur Quantenmechanik, Zeitschrift für Physik 34, 858; Reprinted in translation in B. L. van der Waerden (Ed.), Sources of Quantum Mechanics, North-Holland, Amsterdam, 1967.
[10] BORN, M., HEISENBERG, W., and JORDAN, P., 1926, Zur Quantenmechanik II, Zeitschrift für Physik 35, 557; Reprinted in translation in B. L. van der Waerden (Ed.), Sources of Quantum Mechanics, North-Holland, Amsterdam, 1967.
[11] BUCHER, M., 2008, The rise and premature fall of the old quantum theory, ArXiv. 0802.1366.
[12] CARATI, A., and GALGANI, L., Fondamenti della meccanica quantistica: uno studio storico critico. electronic page http:/www.mat.unimi.it/users/galgani
[13] CHRISTODOULIDI, H., and EFTHYMIOPOULOS, C., 2013, Low-dimensional q-Tori in FPU Lattices: Dynamics and Localization Properties, Physica D 261, 92. | fulltext (doi) | MR 3144013 | Zbl 1336.37058
[14] CONTOPOULOS, G., 1960, A third integral of motion in a galaxy, Z. Astrophys., 49, 273. | MR 114635 | Zbl 0099.45007
[15] CONTOPOULOS, G., 1966, Tables of the third integral, Astrophys. J. Suppl., 13, 503.
[16] CONTOPOULOS, G., 2002, Order and Chaos in Dynamical Astronomy, Springer, Berlin. | fulltext (doi) | MR 1988785 | Zbl 1041.85001
[17] CREHAN, P, 1990, The proper quantum analogue of the Birkhoff-Gustavson method of normal forms, J. Phys. A Math. Gen. 23, 5815. | MR 1090015 | Zbl 0728.58033
[18] DEPRIT, A., 1969, Canonical Transformations Depending on a Small Parameter, Cel. Mech., 1, 12. | fulltext (doi) | MR 253611 | Zbl 0172.26002
[19] DIRAC, P.A.M., 1926, On the theory of Quantum Mechanics, Proc. Roy. Soc. A 109, 642. | MR 23198 | Zbl 52.0975.01
[20] DIRAC, P.A.M., 1930, The Principles of Quantum Mechanics, Oxford Science Publications. | MR 23198 | Zbl 56.0745.05
[21] DYSON, F.J., 1949, The Radiation Theories of Tomonaga, Schwinger, and Feynman, Phys. Rev. 75, 486. | MR 28203 | Zbl 0032.23702
[22] DYSON, F.J., 1952, Divergence of Perturbation Theory in Quantum Electrodynamics, Phys. Rev. 85, 631. | MR 46927 | Zbl 0046.21501
[23] Attempts to make quantum electrodynamics into a completely solvable theory http://www.webofstories.com/play/freeman.dyson/92
[24] ECKHARDT, B., 1986, Birkhoff-Gustavson normal form in classical and quantum mechanics, J. Phys. A Math. Gen. 19, 2961. | MR 861216 | Zbl 0622.70015
[25] EFTHYMIOPOULOS, C., 2012, Canonical perturbation theory; stability and diffusion in Hamiltonian systems: applications in dynamical astronomy, in P.M. Cincotta, C.M. Giordano, and C. Efthymiopoulos (Eds), Third La Plata International School on Astronomy and Geophysics, Asociación Argentina de Astronomía, Workshop Series, Vol. 3, p.3-146.
[26] EFTHYMIOPOULOS, C., and CONTOPOULOS, G., 2006, Chaos in Bohmian Quantum Mechanics, J. Phys. A. Math Gen 39, 1819. | fulltext (doi) | MR 2209303 | Zbl 1093.81032
[27] ELIASSON, L., 1996, Absolutely Convergent Series Expansions for Quasi Periodic Motions, Math. Phys. Electron. J. 2, 1. | fulltext EuDML | MR 1399458 | Zbl 0896.34035
[28] GIORGILLI, A, 1998, Small denominators and exponential stability: from Poincaré to the present time, Rend. Sem. Mat. Fis. Milano, LXVIII, 19. | fulltext (doi) | MR 1927002 | Zbl 1024.37039
[29] GUSTAVSON, F.G., 1966, On Constructing Formal Integrals of a Hamiltonian System. Near an Equilibrium Point, Astron. J. 71, 670.
[30] GUTZWILLER, M.C., 1990, Chaos in Classical and Quantum Mechanics, Springer, New York. | fulltext (doi) | MR 1077246 | Zbl 0727.70029
[31] HAMILTON, W.R., 1834, On a general method of dynamics; by which the study of the motions of all free systems of attracting or repelling points is reduced to the search and differentiation of one central relation, or characteristic function, Phil. Transactions, Part 2, pp. 247-308 (Mathematical Papers 2, 103).
[32] HEISENBERG, W., 1925, Über quantentheoretische Umdeutung kinematischer und mechanischer Beziehungen, Zeitschrift für Physik 33, 879.
[33] HÉNON, M., and HEILES, C., 1964, The applicability of the third integral of motion: Some numerical experiments, Astron. J. 69, 73. | fulltext (doi) | MR 158746
[34] HORI, G.I., 1966, Theory of General Perturbation with Unspecified Canonical Variables, Publ. Astron. Soc. Japan 18, 287.
[35] JACKSON, J.D., 1962, Classical Electrodynamics, John Wiley and Son. | MR 436782
[36] KOLMOGOROV, A.N., 1954, On the preservation of quasi-periodic motions under a small variation of Hamilton's function, Dokl. Akad. Nauk SSSR, 98, 527. | MR 68687
[37] LICHTENBERG, A.J., and LIEBERMAN, M.A., 1992, Regular and Chaotic Dynamics, Springer, New York. | fulltext (doi) | MR 1169466 | Zbl 0748.70001
[38] LYNDEN-BELL, D., private communication.
[39] MESSIAH, A., 1961, Quantum Mechanics, Dover Publications.
[40] MOSER, J., 1962, On Invariant Curves of Area-Preserving Mappings of an Annulus, Nachr. Akad. Wiss. Göttingen, Math. Phys. Kl II, 1-20. | MR 147741 | Zbl 0107.29301
[41] NIKOLAEV, A.S., 1996, On the diagonalization of quantum Birkhoff-Gustavson normal form, J. Math. Phys. 37, 2643. | fulltext (doi) | MR 1390227 | Zbl 0885.47031
[42] POINCARÉ, H., 1892, Les Méthodes Nouvelles de la Mécanique Céleste, Gauthier-Villars, Paris. | MR 926907
[43] ROBNIK, M., 1984, The algebraic quantisation of the Birkhoff-Gustavson normal form, J. Phys. A Math. Gen. 17, 109. | MR 734112 | Zbl 0548.70009
[44] SCHRÖDINGER, E., 1926, An Undulatory Theory of the Mechanics of Atoms and Molecules, Phys. Rev. 28, 1049.
[45] SCHRÖDINGER, E., 1926, Über das Verhältnis der Heisenberg Born Jordanischen Quantenmechanik zu der meinen, Annalen der Physik 79, 45.
[46] VON ZEIPEL, H., 1916, Recherches sur le mouvement de petites planètes, Arkiv. Mat. Astron. Physik, II, Nos, 1,3,7,9, 12. | Zbl 46.1379.01
[47] WEINBERG, S., 1992, Dreams of a Final Theory, Pantheon Books, New York.
[48] WOOD, W.R., and ALI, M.K., 1987, On the limitations of the Birkhoff-Gustavson normal form approach, J. Phys. A Math. Gen. 20, 351. | MR 874256
Home -> Mat. Soc. Cult. Riv. Unione Mat. Ital., Serie 1 -> Vol. 8 (2015), n. 2 -> pp. 191-224

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