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References
A. AMBROSETTI-G. MANCINI, Solutions of minimal period for a class of convex Hamiltonian systems, Preprint.
V. BENCI, On the critical point theory for indefinite functionals in the presence of symmetries, to appear on Trans. Amer.Math.Soc.
V. BENCI-A. CAPOZZI-D. FORTUNATO, Periodic solutions of Hamiltonian systems with a prescribed period, Preprint.
V. BENCI-D. FORTUNATO, Un teorema di molteplicità per un'equazione ellittica non lineare su varietà simmetriche, Proceedings of the Symposium "Metodi asintotici e topologici in problemi diff. non lineari", L'Aquila (1981).
V. BENCI-D. FORTUNATO, Soluzioni periodiche multiple per equazioni differenziali non lineari relative a sistemi conservativi, Proceedings of the Symposium "Metodi asintotici e topologici in problemi diff. non lineari", L'Aquila (1981).
V. BENCI-D. FORTUNATO, The dual method in critical point theory. Multiplicity results for indefinite functionals, to appear on Ann.Mat.Pura e Applicata.
V. BENCI-P.H. RABINOWITZ, Critical point theorems for indefinite functionals, Inv.math., 52, (1979), 336–352.
I. EKELAND, Periodic solutions of Hamiltonian equations and a theorem of P. Rabinowitz, J. Diff.Eq., 34, (1979), 523–534.
P.H. RABINOWITZ, Periodic solutions of Hamiltonian systems, Comm. Pure Appl.Math., 31, (1978), 157–184.
P.H. RABINOWITZ, Periodic solutions of Hamiltonian systems:a survey, Preprint.
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Benci, V., Capozzi, A., Fortunato, D. (1982). Periodic solutions of a class of Hamiltonian systems. In: Everitt, W., Sleeman, B. (eds) Ordinary and Partial Differential Equations. Lecture Notes in Mathematics, vol 964. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0064990
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DOI: https://doi.org/10.1007/BFb0064990
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