Kleinian groups and hyperbolic 3-manifolds : proceedings of the Warwick Workshop, September 11-14, 2001

Bibliographic Information

Kleinian groups and hyperbolic 3-manifolds : proceedings of the Warwick Workshop, September 11-14, 2001

edited by Y. Komori, V. Markovic, C. Series

(London Mathematical Society lecture note series, 299)

Cambridge University Press, 2003

  • : pbk

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Includes bibliographical references

Description and Table of Contents

Description

The subject of Kleinian groups and hyperbolic 3-manifolds is currently undergoing explosively fast development, with many old problems and conjectures close to resolution. This volume, proceedings of the Warwick workshop in September 2001, contains expositions of many of these breakthroughs including Minsky's lectures on the first half of the proof of the Ending Lamination Conjecture, the Bers Density Conjecture by Brock and Bromberg, the Tameness Conjecture by Kleineidam and Souto, the state of the art in cone manifolds by Hodgson and Kerckhoff, and the counter example to Thurston's K=2 conjecture by Epstein, Marden and Markovic. It also contains Jorgensen's famous paper 'On pairs of once punctured tori' in print for the first time. The excellent collection of papers here will appeal to graduate students, who will find much here to inspire them, and established researchers who will find this valuable as a snapshot of current research.

Table of Contents

  • Part I. Hyperbolic 3-Manifolds: 1. Combinatorial and geometrical aspects of hyperbolic 3-manifolds Y. Minsky
  • 2. Harmonic deformations of hyperbolic 3-manifolds C. D. Hodgson and S. P. Kerchoff
  • 3. Cone-manifolds and the density conjecture J. F. Brock and K. W. Bromberg
  • 4. Les geodesiques fermes d'une variete hyperbolique en tant que noeuds J.-P. Otal
  • 5. Ending laminations in the Masur domain G. Kleineidam and J. Souto
  • 6. Quasi-arcs in the limit set of a singly degenerate group with bounded geometry H. Miyachi
  • 7. On hyperbolic and spherical volumes for knot and link cone-manifolds A. D. Mednykh
  • 8. Remarks on the curve complex: classification of surface homeomorphisms W. J. Harvey
  • Part II. Once-punctured tori: 9. On pairs of once-punctured tori T. Jorgensen
  • 10. Comparing two convex hull constructions for cusped hyperbolic manifolds H. Akiyoshi and M. Sakuma
  • 11. Jorgensen's picture of punctured torus groups and its refinement H. Akiyoshi, M. Sakuma, M. Wada and Y. Yamashita
  • 12. Tetrahedral decompositions of punctured torus bundles J. R. Parker
  • 13. On the boundary of the Earle slice for punctured torus groups Y. Komori
  • Part III. Related Topics: 14. Variations on a theme of Horowitz J. W. Anderson
  • 15. Complex angle scattering D. B. A. Epstein, A. Marden and V. Markovic
  • 16. Schwarz's lemma and the Kobayashi and Caratheodory pseudometrics on complex Banach manifolds C. J. Earle, L. A. Harris, J. H. Hubbard and S. Mitra.

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