Dynamique des homéomorphismes du plan au voisinage d'un point fixe

Patrice Le Calvez

Annales scientifiques de l'École Normale Supérieure (2003)

  • Volume: 36, Issue: 1, page 139-171
  • ISSN: 0012-9593

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Le Calvez, Patrice. "Dynamique des homéomorphismes du plan au voisinage d'un point fixe." Annales scientifiques de l'École Normale Supérieure 36.1 (2003): 139-171. <http://eudml.org/doc/82595>.

@article{LeCalvez2003,
author = {Le Calvez, Patrice},
journal = {Annales scientifiques de l'École Normale Supérieure},
keywords = {homomorphism of a surface; fixed point; Lefschetz indices; iterates of the map; periodic orbits},
language = {fre},
number = {1},
pages = {139-171},
publisher = {Elsevier},
title = {Dynamique des homéomorphismes du plan au voisinage d'un point fixe},
url = {http://eudml.org/doc/82595},
volume = {36},
year = {2003},
}

TY - JOUR
AU - Le Calvez, Patrice
TI - Dynamique des homéomorphismes du plan au voisinage d'un point fixe
JO - Annales scientifiques de l'École Normale Supérieure
PY - 2003
PB - Elsevier
VL - 36
IS - 1
SP - 139
EP - 171
LA - fre
KW - homomorphism of a surface; fixed point; Lefschetz indices; iterates of the map; periodic orbits
UR - http://eudml.org/doc/82595
ER -

References

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  1. [1] Birkhoff G.-D., An extension of Poincaré's last geometric theorem, Acta Math.47 (1926) 297-311, in: Collected Math. Papers, Vol. II, Dover, pp. 252–260. Zbl52.0573.02MR1555218JFM52.0573.02
  2. [2] Birkhoff G.-D., Sur quelques courbes fermées remarquables, Bull. Soc. Math. France80 (1932) 1-26, in: Collected Math. Papers, Vol. II, Dover, pp. 444–461. Zbl0005.22002MR1504983
  3. [3] Bonino M., Propriétés locales de l'espace des homéomorphismes de Brouwer, Ergodic Theory Dynam. Systems19 (1999) 1405-1423. Zbl0984.37043MR1738944
  4. [4] Brouwer L.E.J., Beweis des ebenen Translationssatzes, Math. Ann.72 (1912) 37-54. Zbl43.0569.02MR1511684JFM43.0569.02
  5. [5] Brown M., A new proof of Brouwer's lemma on translation arcs, Houston J. Math.10 (1984) 35-41. Zbl0551.57005MR736573
  6. [6] Brown M., On the fixed point index of iterates of planar homeomorphisms, Proc. Amer. Math. Soc.108 (1990) 1109-1114. Zbl0686.58028MR994772
  7. [7] Carathéodory C., Über die begrenzung einfach zusammenhangender Gebiete, Math. Ann.73 (1913) 323-370. Zbl44.0757.02MR1511737JFM44.0757.02
  8. [8] Carter P.H., An improvment of the Poincaré–Birkhoff theorem, Trans. Amer. Math. Soc.269 (1982) 285-299. Zbl0507.55002MR637039
  9. [9] Cartwright M.L., Littlewood J.C., Some fixed point theorems, Ann. of Math.54 (1951) 1-37. Zbl0058.38604MR42690
  10. [10] Fathi A., An orbit closing proof of Brouwer's lemma on translation arcs, L'Enseignement Math.33 (1987) 315-322. Zbl0649.54022MR925994
  11. [11] Flucher M., Fixed points of measure preserving torus homeomorphisms, Manuscripta Math.68 (1990) 271-293. Zbl0722.58027MR1065931
  12. [12] Ford L.R., Automorphic Functions, Chelsea Publishing, New York, 1951. Zbl55.0810.04
  13. [13] Franks J., Generalizations of the Poincaré–Birkhoff theorem, Ann. of Math.128 (1988) 139-151. Zbl0676.58037MR951509
  14. [14] Franks J., A variation on the Poincaré–Birkhoff theorem, Contemp. Math.81 (1988) 139-151. Zbl0679.58026MR986260
  15. [15] Franks J., Recurrence and fixed points of surface homeomorphims, Ergodic Theory Dynam. Systems8∗ (1988) 99-107. Zbl0634.58023
  16. [16] Franks J., Area preserving homeomorphisms of open surfaces of genus zero, New York J. Math.2 (1996) 1-19. Zbl0891.58033MR1371312
  17. [17] Guillou L., Théorème de translation plane de Brouwer et généralisations du théorème de Poincaré–Birkhoff, Topology33 (1994) 331-351. Zbl0924.55001MR1273787
  18. [18] Handel M., There are no minimal homeomorphisms of the multipunctured plane, Ergodic Theory Dynam. Systems12 (1992) 75-83. Zbl0769.58037MR1162400
  19. [19] Herman M., Sur les courbes invariantes par les difféomorphismes de l'anneau, vol. 2, Astérisque, Soc. Math. de France144 (1986). Zbl0613.58021
  20. [20] Hocking J., Young G., Topology, Dover Publications, New York, 1961. Zbl0718.55001MR125557
  21. [21] Hofer H., Zehnder E., Symplectic Invariants and Hamiltonian Dynamics, Birkhäuser, 1994. Zbl0837.58013MR1306732
  22. [22] Kérékjártó B.V., Vorlesungen u&#x030B;ber Topologie (I), Springer-Verlag, Berlin, 1923. 
  23. [23] Le Calvez P., Une propriété dynamique des homéomorphismes du plan au voisinage d'un point fixe d'indice &gt;1, Topology38 (1999) 23-35. Zbl0976.54046MR1644067
  24. [24] Le Calvez P., Yoccoz J.-C., Un théorème d'indice pour les homéomorphismes du plan au voisinage d'un point fixe, Ann. of Math.146 (1997) 241-293. Zbl0895.58032MR1477759
  25. [25] Le Calvez P., Yoccoz J.-C., Suite des indices de Lefschetz des itérés pour un domaine de Jordan qui est un bloc isolant, Manuscrit. 
  26. [26] Le Roux F., Dynamique des homéomorphismes de surfaces, versions topologiques des théorèmes de la fleur de Leau–Fatou et de la variété stable, Prépublication, Orsay. 
  27. [27] Mather J., Invariant subsets of area-preserving homeomorphisms of surfaces, Adv. Math. Suppl. Stud.7B (1994) 331-351. Zbl0505.58027
  28. [28] Newman M.H.A., Elements of the Topology of Plane Sets of Points, Cambridge University Press, Cambridge, 1951. Zbl0045.44003MR44820
  29. [29] Nikishin N.A., Fixed points of diffeomorphisms of two-dimensional spheres preserving an oriented plane, Funktional Anal. i Prilozen.8 (1974) 84-85. Zbl0298.57019MR346846
  30. [30] Perez-Marco R., Fixed points and circles maps, Acta Math.179 (1997) 243-294. Zbl0914.58027MR1607557
  31. [31] Pelikan S., Slaminka E., A bound for the fixed point index of area-preserving homeomorphisms of two-manifolds, Ergodic Theory Dynam. Systems7 (1987) 463-479. Zbl0632.58014MR912377
  32. [32] Salamon D., Zehnder E., Morse theory for periodic solutions of Hamiltonian systems and the Maslov index, Comm. Pure Appl. Math.45 (1992) 1303-1360. Zbl0766.58023MR1181727
  33. [33] Schwarz M., On the action spectrum for closed symplectically aspherical manifolds, Pacific J. Math.193 (2) (2000) 419-461. Zbl1023.57020MR1755825
  34. [34] Simon C.P., A bound for the fixed-point index of an area-preserving map with applications to mechanics, Inventiones Math.26 (1974) 187-200. Zbl0331.55006MR353372

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