Ratner’s rigidity theorem for geometrically finite Fuchsian groups

Flaminio, L.; Spatzier, R. J.

doi:10.1007/BFb0082831

L. Flaminio¹ &
R. J. Spatzier²

Part of the book series: Lecture Notes in Mathematics ((LNM,volume 1342))

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References

J. Feldman, D. Ornstein, Semirigidity of horocycle flows over compact surfaces of variable negative curvature, to appear in Erg. Th. and Dyn. Syst.
Google Scholar
L. Flaminio, An extension of Ratner’s rigidity theorem to n-dimensional hyperbolic space, to appear in Erg. Th. and Dyn. Syst.
Google Scholar
L. Flaminio, R. J. Spatzier, Ratner’s Rigidity Theorem for Geometrically Finite Groups, to appear.
Google Scholar
S. J. Patterson, The limit set of a Fuchsian group, Acta Mathematica, 136 (1976), 241–273.
Article MathSciNet MATH Google Scholar
M. Ratner, Rigidity of the horocycle flows, Ann. of Math., 115 (1982), 597–614.
Article MathSciNet MATH Google Scholar
M. Ratner, Factors of horocycle flows, Erg. Th. and Dyn. Syst., 2 (1982), 465–489.
Article MathSciNet MATH Google Scholar
M. Ratner, Horocycle flows, joinings and rigidity of products, Ann. of Math., 118 (1983), 277–313.
Article MathSciNet MATH Google Scholar
D. Rudolph, Ergodic behavior of Sullivan’s geometric measure on a geometrically finite hyperbolic manifold, Erg. Th. and Dyn. Syst., 2 (1982), 491–512.
MathSciNet MATH Google Scholar
D. Sullivan, The density of infinity of a discrete group of hyperbolic isometries, IHES, Publications Mathematiques, 50 (1979), 171–209.
Article MATH Google Scholar
D. Sullivan, Entropy, Hausdorff measures old and new, and limit sets of geometrically finite groups, Acta Mathematica, 153 (1984), 259–277.
Article MathSciNet MATH Google Scholar
D. Witte, Rigidity of some translations on homogeneous spaces, Inventiones Math., 81 (1985), 1–27.
Article MathSciNet MATH Google Scholar
D. Witte, Zero entropy affine maps on homogeneous spaces, preprint.
Google Scholar

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Authors and Affiliations

Department of Mathematics, California Institute of Technology, 91125, Pasadena, CA, USA
L. Flaminio
Department of Mathematics, SUNY at Stony Brook, 11794, N.Y., USA
R. J. Spatzier

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L. Flaminio
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R. J. Spatzier
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James C. Alexander

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Flaminio, L., Spatzier, R.J. (1988). Ratner’s rigidity theorem for geometrically finite Fuchsian groups. In: Alexander, J.C. (eds) Dynamical Systems. Lecture Notes in Mathematics, vol 1342. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0082831

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DOI: https://doi.org/10.1007/BFb0082831
Published: 28 September 2006
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-50174-9
Online ISBN: 978-3-540-45946-0
eBook Packages: Springer Book Archive

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