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Table of contents for this issue | Previous article | Next article Bonahon, Francis Geodesic laminations with transverse Hölder distributions. Annales scientifiques de l'École Normale Supérieure, Sér. 4, 30 no. 2 (1997), p. 205-240 Full text djvu | pdf | Reviews MR 98b:57027 | Zbl 0887.57018 | 1 citation in Numdam stable URL: http://www.numdam.org/item?id=ASENS_1997_4_30_2_205_0 Bibliography [Bo1] F. BONAHON, Bouts des variétés hyperboliques de dimension 3 (Ann. of Math., Vol. 124, [Bo2] F. BONAHON, The geometry of Teichmüller space via geodesic currents (Invent. Math., Vol. 92, Article | MR 90a:32025 | Zbl 0653.32022 [Bo3] F. BONAHON, Ensembles limites et applications (45 minute address), Proceedings of the International Congress of Mathematicians, Kyoto, Japan, [Bo4] F. BONAHON, Transverse Hölder distributions for geodesic laminations, to appear in Topology. Zbl 0871.57027 [Bo5] F. BONAHON, Shearing hyperbolic surfaces, bending pleated surfaces, and Thurston's, symplectic form (Ann. Fac. Sci. Toulouse, Vol. 5, Numdam | MR 97i:57011 | Zbl 0880.57005 [Bo6] F. BONAHON, Variations of the boundary geometry of convex cores of hyperbolic 3-manifolds, preprint, [Bo7] F. BONAHON A Schläfli-type formula for the volume of convex cores of hyperbolic 3-manifolds, in preparation. [CEG] R. D. CANARY, D. B. A. EPSTEIN and P. GREEN, Notes on notes of Thurston (Analytical and Geometrical aspects of Hyperbolic space, D. B. A. Epstein ed., LMS Lecture Notes Series Vol. 111, [CaB] A. CASSON and S. A. BLEILER, Automorphisms of surfaces after Thurston and Nielsen, [EpM] D. B. A. EPSTEIN and A. MARDEN, Convex hulls in hyperbolic spaces, a theorem of Sullivan, and measured pleated surfaces (Analytical and geometric aspects of hyperbolic space, D. B. A. Epstein ed., [FLP] A. FATHI, F. LAUDENBACH and V. POENARU, Travaux de Thurston sur les surfaces (Astérisque 66-67, Société Mathématique de France, [Fl] W. J. FLOYD, Group completions and limit sets of Kleinian groups (Invent. Math., Vol. 57, Article | MR 81e:57002 | Zbl 0428.20022 [Gh] E. GHYS, Le cercle à l'infini des surfaces à courbure négative, (45 minute address) (Proceedings of the International Congress of Mathematicians, Kyoto, Japan, [Gr] M. GROMOV, Hyperbolic groups, (Essays in group theory, S. M. Gersten ed., MSRI Publications, Vol. 8, Springer-Verlag, Berlin, Heidelberg, New York, [Ka] A. KATOK, Invariant measures of flows on oriented surfaces, (Soviet Math. Dokl., Vol. 14, [Ke] S. P. KERCKHOFF, The Nielsen realization problem (Ann. of Math., Vol. 117, [Le] G. LEVITT, Foliations and laminations on hyperbolic surfaces (Topology, Vol. 22, [Mo] H. M. MORSE, A one-to-one representation of geodesics on a surface of negative curvature (Amer. J. Math., Vol. 43, [Pa] A. PAPADOPOULOS, Geometric intersection functions and Hamiltonian flows on the space of measured foliations of a surface (Pacific J. Math., Vol. 124, Article | MR 88c:58017 | Zbl 0608.58036 [PeH] R. C. PENNER and J. L. HARER, Combinatorics of train tracks (Ann. Math. Studies, Vol. 125, Princeton Univ. Press, [Pl] J. PLANTE, Foliations with measure preserving holonomy (Ann. Math., Vol. 127, [Th1] W. P. THURSTON, The topology and geometry of 3-manifolds, Lecture Notes, Princeton University, [Th2] W. P. THURSTON, Earthquakes in two-dimensional hyperbolic geometry (Low-dimensional Topology and Kleinian groups, D. B. A. Epstein ed., [Th3] W. P. THURSTON, On the geometry and dynamics of diffeomorphisms of surfaces (Bull. Amer. Math. Soc., Vol. 19, Article | MR 89k:57023 | Zbl 0674.57008 [Th4] W. P. THURSTON, Minimal stretch maps between hyperbolic surfaces, unpublished preprint, ca |
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