Downloadable Papers

 


Bibliography of David Gabai

[1]  The Murasugi Sum is a Natural Geometric Operation, Contemporary Mathematics 20 (1983), 131-145.

[2]  Foliations and the Topology of 3-Manifolds, Bull. AMS 8 (1983), 77-80.

[3]  Foliations and the Topology of 3-Manifolds, J. of Diff. Geom. 18 (1983), 445-503.

[4]  Foliations and Genera of Links, Topology 23 (1984), 381-394.

[5]  The Murasugi Sum is a Natural Geometric Operation II, Contemporary Mathematics 44 (1985), 93-100.

[6]  The Simple Loop Conjecture, J. of Diff. Geom. 21 (1985), 143-149.

[7]  An Internal Hierarchy for 3-Manifolds, Lecture Notes in Mathematics, Springer 1144 (1985), 14-17.

[8]  Genera of the Arborescent Links, Memoirs of the AMS, number 339, 1986.

[9]  The Classification of Maps of Surfaces (with Will Kazez), Bull. AMS. 14 (1986), 283-286.

[10]  Foliations and Surgery on Knots, Bull. AMS. 15 (1986), 83-87.

[11]  Genera of the Alternating Links, Duke Math. J. 53 (1986), 677-681.

[12]  Detecting Fibred Links in S3", Commentarii Math. Helvetici, 61 (1986), 519-555.

[13]  On 3-Manifolds Covered by Surface Bundles, London Math. Soc. Lecture Notes #112 (1987) 145-156.

[14]  Foliations and the Topology of 3-Manifolds II, J. of Diff. Geom. 26 (1987) 461-478.

[15]  Foliations and the Topology of 3-Manifolds III, J. of Diff. Geom. 26 (1987) 479-536.

[16]  Genus is Superadditive under Band Connected Sum, Topology 26 (1987) 209-210.

[17]  The Classification of Maps of Surfaces (with Will Kazez), Invent. Math. 90 (1987) 219-242.

[18]  The Classification of Maps of Non Orientable Surfaces (with Will Kazez), Math. Annalen 281 (1988) 687-702.

[19]  Surgery on Knots in Solid Tori, Topology 28 (1989), 1-6.

[20]  Essential Laminations in 3-Manifolds (with Ulrich Oertel), Annals of Math. 130 (1989) 41-73.

[21]  Pseudo Anosov Maps and Surgery on Fibred 2-Bridge Knots (with Will Kazez), Topology and its Applications 37 (1990), 93-100.

[22]  1-Bridge Braids in Solid Tori, Topology and its Applications 37 (1990), 221-235.

[23]  Convergence Groups are Fuchsian Groups, Bull. AMS (2) 25 (1991), 395-402.

[24]  3-Manifolds and Foliations, Proc. Int. Cong. Math. 1990 Kyoto (1992), 609-619.

[25]  Taut Foliations of 3-Manifolds and Suspensions of S1, Ann. Inst. Fourier 42 (1992), 193-208.

[26]  Convergence Groups are Fuchsian Groups, Annals of Math. 136 (1992), 447-510.

[27]  3-Manifolds with Essential Laminations are Covered by Solid Tori (with Will Kazez), J. Lon. Math. Soc. (2) 47 (1993), 557-576.

[28]  Homotopy Hyperbolic 3-Manifolds are Virtually Hyperbolic, JAMS 7 (1994), 193-198.

[29]  On the Geometric and Topological Rigidity of Hyperbolic 3-Manifolds, Bull. AMS 31 (1994), 228-232.

[30]  Valentin Poenaru's Program for the Poincaré Conjecture, Geom. Top. Physics. for Raoul Bott, Int. Press., (1995), 139-166.

[31]  Homotopy, Isotopy and Genuine Laminations of 3-Manifolds (with Will Kazez), Proc. 1993 Georgia Top. Conf., Stud. in Adv. Math. Vol 2.1, (1997), 123-138.

[32]  Problems on the Geometric Theory of Foliations and Laminations on 3-Manifolds, Proc. 1993 Georgia Top. Conf., Stud. in Adv. Math. Vol 2.2, (1997), 1-34.

[33]  On the Geometric and Topological Rigidity of Hyperbolic 3-Manifolds, JAMS 10 (1997), 37-74.

[34]  Order trees and laminations of the plane (with Will Kazez), Math. Res. Letters 4 (1997), 603-616.

[35]  Group Negative Curvature for 3-Manifolds with Genuine Laminations (with Will Kazez), Geom. and Top. 2 (1998) 65-77.

[36]  Semi-Euclidean Laminations in 3-Manifolds, Surveys in Differential Geometry (Inter. Press) 3 (1998) 195-242.

[37]  Finiteness of the Mapping Class Group for 3-Manfolds with Essential Laminations, (with Will Kazez), J. Diff. Geom. 50 (1998), 123-127.

[38]  On Brittenham’s Theorem, to appear in Comm. in Analysis and Geometry.

[39]  Taut Foliations and Combinatorial Volume Preserving Flows, Comm. Math. Helv. 75 (2000), 109-124.

[40]  3 Lectures on Foliations and Laminations on 3-Manifolds, to appear in Proc. 1998 SUNY, Stony Brook, Laminations Conference.

[41]  Homotopy Hyperbolic 3-Manifolds are Hyperbolic (with Robert Meyerhoff, Nathaniel Thurston), to appear in Annals of Math.

[42]  Essential Laminations and Kneser Normal Form, to appear in  J. Diff. Geom.

[43]  Volumes of Tubes in Hyperbolic 3-Manifolds (with Robert Meyerhoff, Peter Milley), preprint.

[44] The Smale Conjecture for Hyperbolic 3-Manifolds: Isom(M 3)\simeq Diff(M 3), preprint


D. Gabai's Home Page

Math Department Home Page