Skip to main content
SpringerLink
Log in

Invariant two-forms for geodesic flows

  • Published:
Mathematische Annalen Aims and scope Submit manuscript

This is a preview of subscription content, log in via an institution to check access.

Access this article

Log in via an institution

Price excludes VAT (USA)
Tax calculation will be finalised during checkout.

Instant access to the full article PDF.

Institutional subscriptions

References

  1. Y. Benoist, P. Foulon, F. Labourie: Flots d'Anosov à distributions stable et instable différentiables, Journal AMS 4 (1992), 33–74.

    Google Scholar 

  2. G. Besson, G. Courtois, S. Gallot: Entropies et rigidités des espaces localement symétriques de courbure strictement négative. Preprint 1994

  3. R. Feres, A. Katok: Invariant tensor fields of dynamical systems with pinched Lyapunov exponents and rigidity of geodesic flows. Erg. Th. & Dyn. Sys. 9 (1989), 427–432.

    Google Scholar 

  4. R. Feres, A. Katok: Anosov flows with smooth foliations and rigidity of geodesic flows in three-dimensional manifolds of negative curvature. Erg. Th & Dyn. Sys. 10 (1990), 657–670.

    Google Scholar 

  5. R. Feres: Geodesic flows on manifolds of negative curvature with smooth horospheric foliations. Erg. Th. & Dyn. Sys. 11 (1991), 653–686.

    Google Scholar 

  6. P. Foulon: Geométrie des équations différentielles du second ordre. Ann. Inst. Henri Poincaré 45 (1986), 1–28.

    Google Scholar 

  7. P. Foulon: Feuilletages des sphéres et dynamiques Nord-Sud. Preprint 1994.

  8. U. Hamenstädt: A geometric characterization of negatively curved locally symmetric spaces. J. Diff. Geo. 34 (1991), 193–221.

    Google Scholar 

  9. U. Hamenstädt: Regularity of time preserving conjugacies for contact Anosov flows withC 1 Anosov splitting. Erg. Th. & Dyn. Sys. 13 (1993), 65–72.

    Google Scholar 

  10. U. Hamenstädt: Anosov flows which are uniformly expanding at periodic points. Erg. Th. & Dyn. Sys. 14 (1994), 299–304

    Google Scholar 

  11. U. Hamenstädt: Regularity at infinity of compact negatively curved manifolds, to appear in Erg. Th. & Dyn. Sys.

  12. B. Hasselblatt: Regularity of the Anosov splitting and a new description of the Margulis measure, Ph. D. Thesis, California Institute of Technology (1989).

  13. S. Hurder, A. Katok: Differentiability, rigidity and Godbillon-Vey classes for Anosov flows, Publ. Math. IHES 72 (1990), 5–61.

    Google Scholar 

  14. M. Kanai: Geodesic flows on negatively curved manifolds with smooth stable and unstable foliations. Erg. Th. & Dyn. Sys. 8 (1988), 215–240.

    Google Scholar 

  15. M. Kanai: Tensorial ergodicity of geodesic flows. In “Geometry and Analysis on Manifolds”, Springer Lecture Notes in Math. 1339 (1988), 142–157.

    Google Scholar 

  16. M. Kanai: Differential geometric studies on dynamics of geodesic and frame flows

  17. A. Katok: Entropy and closed geodesics. Erg. Th. & Dyn. Sys. 2 (1982), 339–366.

    Google Scholar 

  18. F. Ledrappier, L.S. Young: The metric entropy of diffeomorphisms. Ann. Math. 122 (1985), 509–539.

    Google Scholar 

Download references

Author information

Authors and Affiliations

  1. Mathematisches Institut der Universität Bonn, Beringstrasse 1, D-53115, Bonn, Germany

    Ursula Hamenstädt

Authors
  1. Ursula Hamenstädt
    View author publications

    You can also search for this author in PubMed Google Scholar

Additional information

This work was partially supported by the Sonderforschungsbereich 256 of the Deutsche Forschungsgemeinschaft

Rights and permissions

Reprints and permissions

About this article

Cite this article

Hamenstädt, U. Invariant two-forms for geodesic flows. Math. Ann. 301, 677–698 (1995). https://doi.org/10.1007/BF01446654

Download citation

  • Received:

  • Issue Date:

  • DOI: https://doi.org/10.1007/BF01446654

Mathematics Subject Classification (1991)

Search

Navigation