MARC Record from marc_columbia

LEADER: 03681mam a22004214a 4500
001 3290397
005 20221020030550.0
008 010627s2001 riua b 001 0 eng
010 $a 2001045217
015 $aGBA2-10447
020 $a0821821539 (alk. paper)
035 $a(OCoLC)ocm47650708
035 $9AUS5226CU
035 $a(NNC)3290397
035 $a3290397
040 $aDLC$cDLC$dC#P$dUKM$dOrLoB-B
041 1 $aeng$hfre
042 $apcc
050 00 $aQA612.4$b.O8313 2001
082 00 $a514.2$221
100 1 $aOtal, Jean-Pierre.$0http://id.loc.gov/authorities/names/n96109036
240 10 $aThéorème d'hyperbolisation pour les variétés fibrées de dimension 3.$lEnglish$0http://id.loc.gov/authorities/names/n2001011955
245 14 $aThe hyperbolization theorem for fibered 3-manifolds /$cJean-Pierre Otal ; translated by Leslie D. Kay.
260 $aProvidence, RI :$bAmerican Mathematical Society,$c2001.
300 $axiv, 126 pages :$billustrations ;$c26 cm.
336 $atext$btxt$2rdacontent
337 $aunmediated$bn$2rdamedia
490 1 $aSMF/AMS texts and monographs,$x1525-2302 ;$vv. 7
490 1 $aAstérisque,$x0303-1179 ;$v235
504 $aIncludes bibliographical references (p. 121-123) and index.
505 00 $gCh. 1.$tTeichmuller Spaces and Kleinian Groups.$g1.1.$tHyperbolic Space.$g1.2.$tQuasiconformal Homeomorphisms.$g1.3.$tTeichmuller Space; the Space of Quasi-Fuchsian Groups.$g1.4.$tThurston's Compactification of Teichmuller Space.$g1.5.$tClassification of the Elements of Mod(S) --$gCh. 2.$tReal Trees and Degenerations of Hyperbolic Structures.$g2.1.$tReal Trees.$g2.2.$tReal Trees and Degenerations of Actions on Hyperbolic Space.$g2.3.$tActions with Small Arc Stabilizers of Fuchsian Groups on Real Trees --$gCh. 3.$tGeodesic Laminations and Real Trees.$g3.1.$tRealization of a Geodesic Lamination in a Real Tree.$g3.2.$tProof of Theorem 3.1.4 --$gCh. 4.$tGeodesic Laminations and the Gromov Topology.$g4.1.$tRealization of a Train Track in a Hyperbolic Manifold.$g4.2.$tConclusion of the Proof of Theorem 4.0.1.$g4.3.$tProof of Lemma 4.2.2 --$gCh. 5.$tThe Double Limit Theorem.$g5.1.$tThe Ahlfors Lemma.$g5.2.$tA Convergence Criterion in the Space of Quasi-Fuchsian Groups --
505 80 $gCh. 6.$tThe Hyperbolization Theorem for Fibered Manifolds.$g6.1.$tConstruction of a Representation of the Subgroup [pi][subscript 1](S).$g6.2.$tStudy of the Limit Set of the Representation [rho][infinity].$g6.3.$tConstruction of a Representation of the Group [pi][subscript 1](M[subscript [phi]]).$g6.4.$tProof of the Hyperbolization Theorem for Fibered Manifolds --$gCh. 7.$tSullivan's Theorem.$g7.1.$tDecomposition of the Action of a Group into a Conservative and a Dissipative Part.$g7.2.$tThe Action of a Kleinian Group on a Conservative Borel Set.$g7.3.$tProof of Sullivan's Theorem --$gCh. 8.$tActions of Surface Groups on Real Trees.$g8.1.$tConstruction of a Transverse Map.$g8.2.$tConstruction of a Dual Tree.$g8.3.$tConstruction of a Measured Geodesic Lamination.$g8.4.$tProof of Theorem 8.1.1 --$gCh. 9.$tTwo Examples of Hyperbolic Manifolds That Fiber over the Circle.$g9.1.$tThe Gieseking Manifold.$g9.2.$tThe Right-Angled Regular Dodecahedron.$gApp.$tGeodesic Laminations.
650 0 $aLow-dimensional topology.$0http://id.loc.gov/authorities/subjects/sh85078631
650 0 $aGroup theory.$0http://id.loc.gov/authorities/subjects/sh85057512
650 0 $aGeometry, Hyperbolic.$0http://id.loc.gov/authorities/subjects/sh85054149
830 0 $aSMF/AMS texts and monographs ;$vv. 7.$0http://id.loc.gov/authorities/names/n99043808
830 0 $aAstérisque ;$v235.
852 00 $bmat$hQA612.4$i.O8313 2001