Quasi-conformal mappings in n -space and the rigidity of hyperbolic space forms

G. D. Mostow

Publications Mathématiques de l'IHÉS (1968)

  • Volume: 34, page 53-104
  • ISSN: 0073-8301

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Mostow, G. D.. "Quasi-conformal mappings in $n$-space and the rigidity of hyperbolic space forms." Publications Mathématiques de l'IHÉS 34 (1968): 53-104. <http://eudml.org/doc/103882>.

@article{Mostow1968,
author = {Mostow, G. D.},
journal = {Publications Mathématiques de l'IHÉS},
keywords = {complex functions},
language = {eng},
pages = {53-104},
publisher = {Institut des Hautes Études Scientifiques},
title = {Quasi-conformal mappings in $n$-space and the rigidity of hyperbolic space forms},
url = {http://eudml.org/doc/103882},
volume = {34},
year = {1968},
}

TY - JOUR
AU - Mostow, G. D.
TI - Quasi-conformal mappings in $n$-space and the rigidity of hyperbolic space forms
JO - Publications Mathématiques de l'IHÉS
PY - 1968
PB - Institut des Hautes Études Scientifiques
VL - 34
SP - 53
EP - 104
LA - eng
KW - complex functions
UR - http://eudml.org/doc/103882
ER -

References

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  8. [8] F. W. GEHRING, Rings and quasi-conformal mappings in space, Trans. Amer. Math. Soc., 103 (1962), 353-393. Zbl0113.05805MR25 #3166
  9. [9] H. LEBESGUE, Sur le problème de Dirichlet, Rend. Circ. Palermo, 24 (1907), 371-402. JFM38.0392.01
  10. [10] C. LOEWNER, On the conformal capacity in space, J. Math. Mech., 8 (1959), 411-414. Zbl0086.28203MR21 #3538
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  14. [14] G. D. MOSTOW, Homogeneous spaces of finite invariant measure, Ann. of Math., 75 (1962), 17-37. Zbl0115.25702MR26 #2546
  15. [15] G. D. MOSTOW, On the conjugacy of subgroups of semi-simple groups, Proc. of Symposia in Pure Math., 9 (1966), 413-419. Zbl0199.06702MR34 #5965
  16. [16] R. NEVANLINNA, On differentiable mappings, Analytic Functions, Princeton Univ. Press (1960), 3-9. Zbl0100.35701MR22 #7075
  17. [17] H. RADEMACHER, Partielle und totale Differenzierbarkeit von Funktionen mehrerer Variabeln, Math. Annalen, 79 (1919), 340-359. JFM47.0243.01
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Citations in EuDML Documents

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  1. Pierre Cartier, Spectre de l'équation de Schrödinger, application à la stabilité de la matière
  2. Rufus Bowen, Hausdorff dimension of quasi-circles
  3. Richard Evan Schwartz, The quasi-isometry classification of rank one lattices
  4. Jean-Louis Koszul, Rigidité forte des espaces riemanniens localement symétriques
  5. Pierre Pansu, Pincement des variétés à courbure négative d'après M. Gromov et W. Thurston
  6. Jacqueline Ferrand, Histoire de la réductibilité du groupe conforme des variétés riemanniennes (1964-1994)
  7. Dennis Sullivan, Travaux de Thurston sur les groupes quasi-fuchsiens et les variétés hyperboliques de dimension 3 fibrées sur S 1
  8. Jacqueline Ferrand, Generalized condensers and conformal properties of riemannian manifolds with at least two ends
  9. Christophe Champetier, Structure quasi-conforme et dimension conforme d'après P. Pansu, M. Gromov et M. Bourdon
  10. Pekka Tukia, On isomorphisms of geometrically finite Möbius groups

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