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References
R. Abraham, Foundations of Mechanics, Benjamin, New York, 1967.
J. Alfriend, The stability of the triangular Lagrangian points for commensurability of order 2, Celestial Mechanics, 1 (1970) 351–359.
D. Buchanan, Trojan satellites-limiting case, Trans. Roy. Soc. Canada, 31 (1941) 9–25.
A. Deprit & J. Henrard, A manifold of periodic orbits, Adv. Astron. Astrophy. 6 (1968), 2–124.
A. Deprit & J. Henrard, The Trojan manifolds—survey and conjectures in periodic orbits, stability and resonance, Giacaglia Ed., Reidel Publ. Comp., Dordrecht, 1970.
J. Henrard, Periodic orbits emanating from a resonant equilibrium, Celestial Mechanics, 1 (1970) 437–466.
W. Loud, Subharmonic solutions of second order equations arising near harmonic solutions, J. Diff. Eqs., 11 (1972) 628–660.
L. Markus & K. Meyer, Generic Hamiltonians are neither ergodic nor integrable, Memoirs of Amer. Math. Soc., 114, Providence, 1974.
K. Meyer, Generic bifurcation of periodic points, Trans. Amer. Math. Soc., 149 (1970) 95–107.
K. Meyer, Generic stability properties of periodic points, Trans. Amer. Math. Soc., 154 (1971) 273–277.
K. Meyer & J. Palmore, A new class of periodic solutions in the restricted three body problem, J. Diff. Eqs., 8 (1970) 264–276.
K. Meyer & D. Schmidt, Periodic orbits near L4 for mass ratios near the critical mass ratio of Routh, Celestial Mechanics, 4 (1971) 99–109.
J. Palmore, Bridges and natural centres in the restricted three body problem, University of Minnesota Report, 1969.
H. Poincaré, Les Méthodes Nouvelles de la Mécanique Céleste, Gauthier-Villars, Paris, 1892–1899.
D. Schmidt & D. Sweet, A unifying theory in determining periodic families for Hamiltonian systems at resonance, J. Diff. Eqs., 14 (1973) 596–609.
C. Simon, The index of a fixed point of an area preserving map is ≤1, to appear, report in these Proceedings.
C. Simon & A Weinstein, The method of averaging, to appear.
D. Sweet, Periodic solutions for dynamical systems possessing a first integral in the resonance case, J. Diff. Eqs., 14 (1973) 171–183.
F. Takens, Hamiltonian systems: Generic properties of closed orbits and local perturbations, Math. Ann., 188 (1970) 304–312.
A. Weinstein, Symplectic manifolds and their Lagrangian submanifolds, Adv. in Math., 6 (1971) 329–346.
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Meyer, K.R. (1975). Generic Bifurcations in Hamiltonian Systems. In: Manning, A. (eds) Dynamical Systems—Warwick 1974. Lecture Notes in Mathematics, vol 468. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0082603
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DOI: https://doi.org/10.1007/BFb0082603
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