Periodic solutions with prescribed minimal period for convex autonomous hamiltonian systems.

H. Hofer; I. Ekeland

Inventiones mathematicae (1985)

  • Volume: 81, page 155-188
  • ISSN: 0020-9910; 1432-1297/e

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Hofer, H., and Ekeland, I.. "Periodic solutions with prescribed minimal period for convex autonomous hamiltonian systems.." Inventiones mathematicae 81 (1985): 155-188. <http://eudml.org/doc/143251>.

@article{Hofer1985,
author = {Hofer, H., Ekeland, I.},
journal = {Inventiones mathematicae},
keywords = {periodic solution; T-periodic solution; convex autonomous Hamiltonian systems; critical points of mountain pass type; minimal period},
pages = {155-188},
title = {Periodic solutions with prescribed minimal period for convex autonomous hamiltonian systems.},
url = {http://eudml.org/doc/143251},
volume = {81},
year = {1985},
}

TY - JOUR
AU - Hofer, H.
AU - Ekeland, I.
TI - Periodic solutions with prescribed minimal period for convex autonomous hamiltonian systems.
JO - Inventiones mathematicae
PY - 1985
VL - 81
SP - 155
EP - 188
KW - periodic solution; T-periodic solution; convex autonomous Hamiltonian systems; critical points of mountain pass type; minimal period
UR - http://eudml.org/doc/143251
ER -

Citations in EuDML Documents

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  1. Mario Girardi, Michele Matzeu, Periodic Solutions of Second Order Nonautonomous Systems with the Potentials Changing Sign
  2. Gabriella Tarantello, Subharmonic solutions for hamiltonian systems via a p pseudoindex theory
  3. M. Matzeu, M. Girardi, On periodic solutions of a class of second order nonautonomous systems with nonhomogeneous potentials indefinite in sign
  4. Andrzej Szulkin, Morse theory and existence of periodic solutions of convex hamiltonian systems
  5. Mourad Benabas, Étude d'un système différentiel non linéaire régissant un phénomène gyroscopique forcé
  6. Antonio Ambrosetti, Vittorio Coti Zelati, Solutions with minimal period for hamiltonian systems in a potential well
  7. Vittorio Coti Zelati, Ivar Ekeland, Pierre-Louis Lions, Index estimates and critical points of functionals not satisfying Palais-Smale
  8. Yiming Long, The minimal period problem of classical hamiltonian systems with even potentials
  9. Antonio Ambrosetti, Critical points and nonlinear variational problems

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