Existence of infinitely many homoclinic orbits in hamiltonian systems.

Eric Séré

Mathematische Zeitschrift (1992)

  • Volume: 209, Issue: 1, page 27-42
  • ISSN: 0025-5874; 1432-1823

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Séré, Eric. "Existence of infinitely many homoclinic orbits in hamiltonian systems.." Mathematische Zeitschrift 209.1 (1992): 27-42. <http://eudml.org/doc/174347>.

@article{Séré1992,
author = {Séré, Eric},
journal = {Mathematische Zeitschrift},
keywords = {Hamiltonian systems; homoclinic orbits; chaos; variational problems; Palais-Smale condition; concentration-compactness},
number = {1},
pages = {27-42},
title = {Existence of infinitely many homoclinic orbits in hamiltonian systems.},
url = {http://eudml.org/doc/174347},
volume = {209},
year = {1992},
}

TY - JOUR
AU - Séré, Eric
TI - Existence of infinitely many homoclinic orbits in hamiltonian systems.
JO - Mathematische Zeitschrift
PY - 1992
VL - 209
IS - 1
SP - 27
EP - 42
KW - Hamiltonian systems; homoclinic orbits; chaos; variational problems; Palais-Smale condition; concentration-compactness
UR - http://eudml.org/doc/174347
ER -

Citations in EuDML Documents

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  1. Zhaoli Liu, Zhi-Qiang Wang, Multi-bump type nodal solutions having a prescribed number of nodal domains : I
  2. Massimiliano Berti, Heteroclinic solutions for perturbed second order systems
  3. Fukun Zhao, Leiga Zhao, Yanheng Ding, Infinitely many solutions for asymptotically linear periodic Hamiltonian elliptic systems
  4. P. H. Rabinowitz, E. Stredulinsky, On some results of Moser and of Bangert
  5. Enrico Serra, Massimo Tarallo, Susanna Terracini, On the existence of homoclinic solutions for almost periodic second order systems
  6. S. V. Bolotin, P. H. Rabinowitz, A variational construction of chaotic trajectories for a Hamiltonian system on a torus
  7. Éric Séré, Looking for the Bernoulli shift
  8. Antonio Ambrosetti, Vittorio Coti Zelati, Multiple homoclinic orbits for a class of conservative systems
  9. Francesca Alessio, Marta Calanchi, Homoclinic-type solutions for an almost periodic semilinear elliptic equation on R n
  10. Antonio Ambrosetti, Marino Badiale, Homoclinics : Poincaré-Melnikov type results via a variational approach

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