Search and download archives of mathematical journals |
|||
|
|
Table of contents for this issue | Previous article | Next article McMullen, Curtis T. Polynomial invariants for fibered 3-manifolds and teichmüller geodesics for foliations. Annales scientifiques de l'École Normale Supérieure, Sér. 4, 33 no. 4 (2000), p. 519-560 Full text djvu | pdf | Reviews MR 2002d:57015 | Zbl 01702167 | 1 citation in Numdam stable URL: http://www.numdam.org/item?id=ASENS_2000_4_33_4_519_0 Bibliography [2] ATIYAH M., MACDONALD I., Commutative Algebra, Addison-Wesley, [3] BAUER M., An upper bound for the least dilatation, Trans. Amer. Math. Soc. 330 ( [4] BERS L., An extremal problem for quasiconformal maps and a theorem by Thurston, Acta Math. 141 ( [5] BESTVINA M., HANDEL M., Train-tracks for surface homeomorphisms, Topology 34 ( [6] BIRMAN J.S., Braids, Links and Mapping-Class Groups, Annals of Math. Studies, Vol. 82, Princeton University Press, [7] BONAHON F., Geodesic laminations with transverse Hölder distributions, Ann. Sci. École Norm. Sup. 30 ( Numdam | MR 98b:57027 | Zbl 0887.57018 [8] BONAHON F., Transverse Hölder distributions for geodesic laminations, Topology 36 ( [9] BRINKMAN P., An implementation of the Bestvina-Handel algorithm for surface homeomorphisms, J. Exp. Math., to appear. Zbl 0982.57005 [10] BURDE G., ZIESCHANG H., Knots, Walter de Gruyter & Co., [11] CANTWELL J., CONLON L., Isotopies of foliated 3-manifolds without holonomy, Adv. Math. 144 ( [12] CONNES A., Noncommutative Geometry, Academic Press, [13] COOPER D., LONG D.D., REID A.W., Finite foliations and similarity interval exchange maps, Topology 36 ( [14] DUNFIELD N., Alexander and Thurston norms of fibered 3-manifolds, Preprint, [15] FATHI A., Démonstration d'un théorème de Penner sur la composition des twists de Dehn, Bull. Sci. Math. France 120 ( Numdam | MR 93j:57005 | Zbl 0779.57005 [16] FATHI A., LAUDENBACH F., POÉNARU V., Travaux de Thurston sur les Surfaces, Astérisque, Vol. 66-67, [17] FRIED D., Fibrations over S1 with pseudo-Anosov monodromy, in : Travaux de Thurston sur les Surfaces, Astérisque, Vol. 66-67, [18] FRIED D., Flow equivalence, hyperbolic systems and a new zeta function for flows, Comment. Math. Helvetici 57 ( Article | MR 84g:58083 | Zbl 0503.58026 [19] FRIED D., The geometry of cross sections to flows, Topology 21 ( [20] FRIED D., Growth rate of surface homeomorphisms and flow equivalence, Ergod. Theory Dynamical Syst. 5 ( [21] GABAI D., Foliations and the topology of 3-manifolds, J. Differential Geom. 18 ( [22] GABAI D., Foliations and genera of links, Topology 23 ( [23] GANTMACHER F.R., The Theory of Matrices, Vol. II, Chelsea, New York, [24] HARER J.L., PENNER R.C., Combinatorics of Train Tracks, Annals of Math. Studies, Vol. 125, Princeton University Press, [25] HATCHER A., OERTEL U., Affine lamination spaces for surfaces, Pacific J. Math. 154 ( Article | MR 93b:57033 | Zbl 0772.57032 [26] HUBBARD J., MASUR H., Quadratic differentials and foliations, Acta Math. 142 ( [27] KRONHEIMER P., MROWKA T., Scalar curvature and the Thurston norm, Math. Res. Lett. 4 ( [28] LANG S., Algebra, Addison-Wesley, [29] LAUDENBACH F., BLANK S., Isotopie de formes fermées en dimension trois, Invent. Math. 54 ( Article | MR 81d:58003 | Zbl 0435.58002 [30] LIND D., MARCUS B., An Introduction to Symbolic Dynamics and Coding, Cambridge University Press, [31] LONG D., OERTEL U., Hyperbolic surface bundles over the circle, in : Progress in Knot Theory and Related Topics, Travaux en Cours, Vol. 56, Hermann, [32] MATSUMOTO S., Topological entropy and Thurston's norm of atoroidal surface bundles over the circle, J. Fac. Sci. Univ. Tokyo Sect. IA Math. 34 ( [33] MCMULLEN C., The Alexander polynomial of a 3-manifold and the Thurston norm on cohomology, Preprint, [34] MOSHER L., Surfaces and branched surfaces transverse to pseudo-Anosov flows on 3-manifolds, J. Differential Geom. 34 ( [35] NGÔ V.Q., ROUSSARIE R., Sur l'isotopie des formes fermées en dimension 3, Invent. Math. 64 ( Article | MR 83b:58006 | Zbl 0467.58004 [36] NORTHCOTT D.G., Finite Free Resolutions, Cambridge University Press, [37] OERTEL U., Homology branched surfaces : Thurston's norm on H2(M³), in : Epstein D.B. (Ed.), Low-Dimensional Topology and Kleinian Groups, Cambridge Univ. Press, [38] OERTEL U., Affine laminations and their stretch factors, Pacific J. Math. 182 ( [39] PENNER R., A construction of pseudo-Anosov homeomorphisms, Trans. Amer. Math. Soc. 310 ( [40] PENNER R., Bounds on least dilatations, Proc. Amer. Math. Soc. 113 ( [41] ROLFSEN D., Knots and Links, Publish or Perish, Inc., [42] THURSTON W.P., Geometry and Topology of Three-Manifolds, Lecture Notes, Princeton University, [43] THURSTON W.P., A norm for the homology of 3-manifolds, Mem. Amer. Math. Soc. 339 ( [44] THURSTON W.P., On the geometry and dynamics of diffeomorphisms of surfaces, Bull. Amer. Math. Soc. 19 ( Article | MR 89k:57023 | Zbl 0674.57008 [45] THURSTON W.P., Three-manifolds, foliations and circles, I, Preprint, [46] YOCCOZ J.-C., Petits Diviseurs en Dimension 1, Astérisque, Vol. 231, [47] ZHIROV A. YU., On the minimum dilation of pseudo-Anosov diffeomorphisms of a double torus, Uspekhi Mat. Nauk 50 ( |
||
| Copyright Cellule MathDoc 2005 | Credit | Site Map | |||