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On the rigidity of quasiconformal Anosov flows

Published online by Cambridge University Press:  01 December 2007

YONG FANG
YONG FANG*
Affiliation:
Département de Mathématiques, Université de Cergy-Pontoise, avenue Adolphe Chauvin, 95302 Cergy-Pontoise Cedex, France (email: [email protected])
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Abstract

We develop further our study of quasiconformal Anosov flows in our previous (Y. Fang. Smooth rigidity of uniformly quasiconformal Anosov flows. Ergod. Th. & Dynam. Sys.24 (2004), 1–23). For example, we prove the following result: Let φ be a transversely symplectic Anosov flow with dim  Ess≥2 and dim  Esu≥2. If φ is quasiconformal, then it is, up to finite covers, orbit equivalent either to the suspension of a symplectic hyperbolic automorphism of a torus or to the geodesic flow of a closed hyperbolic manifold.

Type
Research Article
Information
Ergodic Theory and Dynamical Systems , Volume 27 , Issue 6 , December 2007 , pp. 1773 - 1802
Copyright
Copyright © Cambridge University Press 2007

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References

[1]Anosov, V. D.. Geodesic flows on closed Riemannian manifolds with negative curvature. Proc. Inst. Steklov 90 (1967), 1235.Google Scholar
[2]Brunella, M.. On transversely holomorphic flows I. Invent. Math. 126 (1996), 265279.Google Scholar
[3]Barbot, T.. Caractérisation des flots d’Anosov en dimension 3 par leurs feuilletages faibles. Ergod. Th. & Dynam. Sys. 15 (1995), 247270.Google Scholar
[4]Dumitrescu, S.. Métriques riemanniennes holomorphes en petite dimension. Ann. Inst. Fourier 51(6) (2001), 16631690.Google Scholar
[5]Fang, Y.. Smooth rigidity of uniformly quasiconformal Anosov flows. Ergod. Th. & Dynam. Sys. 24 (2004), 123.CrossRefGoogle Scholar
[6]Fang, Y.. Structures géométriques rigides et systèmes dynamiques hyperboliques. PhD Thesis, Université de Paris-Sud. Available at:http://tel.ccsd.cnrs.fr/documents/archives0/00/00/87/34/indexfr.html.Google Scholar
[7]Fang, Y.. A remark about hyperbolic infranilautomorphisms. C. R. Acad. Sci. Paris, Ser. I 336(9) (2003), 769772.CrossRefGoogle Scholar
[8]Feres, R. and Katok, A.. Invariant tensor fields of dynamical systems with pinched Lyapunov exponents and rigidity of geodesic flows. Ergod. Th. & Dynam. Sys. 9 (1989), 427432.CrossRefGoogle Scholar
[9]Ghys, É.. On transversely holomorphic flows II. Invent. Math. 126 (1996), 281286.CrossRefGoogle Scholar
[10]Ghys, É.. Déformation des flots d’Anosov et de groupes fuchsiens. Ann. Inst. Fourier 42 (1992), 209247.CrossRefGoogle Scholar
[11]Ghys, É.. Holomorphic Anosov flows. Invent. Math. 119 (1995), 585614.Google Scholar
[12]Godbillon, C.. Feuilletages. Progr. Math. 98 (1991).Google Scholar
[13]Haefliger, A.. Groupoides d’holonomie et classifiants. Astérisque 116 (1984), 7097.Google Scholar
[14]Hamenstädt, U.. Cocycles, symplectic structures and intersection. Geom. Funct. Anal. 9(1) (1999), 90140.CrossRefGoogle Scholar
[15]Hamenstädt, U.. Invariant two-forms for geodesic flows. Math. Ann. 301(4) (1995), 677698.CrossRefGoogle Scholar
[16]Kanai, M.. Differential-geometric studies on dynamics of geodesic and frame flows. Japan. J. Math. 19 (1993), 130.CrossRefGoogle Scholar
[17]Katok, A. and Hasselblatt, B.. Introduction to the modern theory of dynamical systems, vol. 54 (Encyclopedia of Mathematics and its Applications). Cambridge University Press, Cambridge, 1995.CrossRefGoogle Scholar
[18]Katok, A. and Lewis, J.. Local rigidity for certain groups of toral automorphisms. Israel J. Math. 75 (1991), 203241.CrossRefGoogle Scholar
[19]Kobayashi, S. and Nomisu, K.. Foundations of Differential Geometry. Vol. 2. Interscience, New York, 1963.Google Scholar
[20]Kalinin, B. and Sadovskaya, V.. On local and global rigidity of quasiconformal Anosov diffeomorphisms. J. Inst. Math. Jussieu 2(4) (2003), 567582.CrossRefGoogle Scholar
[21]Livsic, A. N.. Cohomology of dynamical systems. Math. USSR Izvestija 6(6) (1972), 12781301.Google Scholar
[22]de La Llave, R.. Rigidity of higher-dimensional conformal Anosov systems. Ergod. Th. & Dynam. Sys. 22(6) (2002), 18451870.Google Scholar
[23]de La Llave, R.. Further rigidity properties of conformal Anosov systems. Ergod. Th.& Dynam. Sys. 24(5) (2004), 14251441.CrossRefGoogle Scholar
[24]de La Llave, R.. Smooth conjugacy and S-R-B measures for uniformly and non-uniformly hyperbolic systems. Comm. Math. Phys. 150 (1992), 289320.CrossRefGoogle Scholar
[25]de La Llave, R. and Moriyón, R.. Invariants for smooth conjugacy of hyperbolic dynamical systems, IV. Comm. Math. Phys. 116(2) (1988), 185192.Google Scholar
[26]de la Llave, R., Marco, J. and Moriyon, R.. Canonical perturbation theory of Anosov systems and regularity results for Livsic cohomology equation. Ann. of Math. 123(3) (1986), 537612.Google Scholar
[27]Margulis, G. A.. The isometry of closed manifolds of constant negative curvature with the same fundamental group. Soviet Math. Dokl. 11 (1970), 722723.Google Scholar
[28]McCleary, J.. User’s Guide to Spectral Sequences (Mathematics Lectures Series, 12). Publish or Perish, Wilmington, DE, 1985.Google Scholar
[29]Mostow, G. D.. Quasi-conformal mappings in n-space and the rigidity of hyperbolic space forms. Publ. Math. Inst. Hautes Études Sci. 34 (1968), 53104.Google Scholar
[30]Paternain, G. P.. On the regularity of the Anosov splitting for twisted geodesic flows. Math. Res. Lett. 4 (1997), 871888.CrossRefGoogle Scholar
[31]Paternain, G. P.. Geodesic flows. Progr. Math. 180 (1999).Google Scholar
[32]Plante, J. F.. Anosov flows. Amer. J. Math. 94 (1972), 729754.CrossRefGoogle Scholar
[33]Plante, J.. Anosov flows, transversely affine foliations and a conjecture of Verjovsky. J. London Math. Soc. (2) 23 (1981), 359362.Google Scholar
[34]Sadovskaya, V.. On uniformly quasiconformal Anosov systems. Math. Res. Lett. 12 (2005), 425441.CrossRefGoogle Scholar
[35]Yue, C.. Quasiconformality in the geodesic flow of negatively curved manifolds. Geom. Funct. Anal. 6(4) (1996), 740750.CrossRefGoogle Scholar