Homotopy equivalences of 3-manifolds and deformation theory of Kleinian groups
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Homotopy equivalences of 3-manifolds and deformation theory of Kleinian groups by Richard Douglas Canary

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Published by American Mathematical Society in Providence, R.I .
Written in English

Subjects:

  • Three-manifolds (Topology),
  • Homotopy equivalences,
  • Low-dimensional topology,
  • Kleinian groups

Book details:

Edition Notes

Other titlesHomotopy equivalences of three-manifolds and deformation theory of Kleinian groups
StatementRichard D. Canary, Darryl McCullough
SeriesMemoirs of the American Mathematical Society -- no. 812
ContributionsMcCullough, Darryl, 1951-
Classifications
LC ClassificationsQA3 .A57 no.812
The Physical Object
Paginationxi, 218 p. :
Number of Pages218
ID Numbers
Open LibraryOL17135278M
ISBN 100821835491, 082183519X
LC Control Number2004054528

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  This text investigates a natural question arising in the topological theory of \(3\)-manifolds, and applies the results to give new information about the deformation theory of hyperbolic \(3\)-manifolds. It is well known that some compact \(3\)-manifolds with boundary admit homotopy equivalences that are not homotopic to homeomorphisms. Get this from a library! Homotopy equivalences of 3-manifolds and deformation theory of Kleinian groups. [Richard Douglas Canary; Darryl McCullough]. McCullough in their book Homotopy Equivalences of 3-Manifolds and Deformation Theory of Kleinian Groups [2]: Theorem Suppose that each of (M 1 . ISBN: OCLC Number: Notes: Literaturverz. S. Description: XI, Seiten. Contents: Introduction Johannson's characteristic submanifold theory Relative compression bodies and cores Homotopy types Pared 3-manifolds Small 3-manifolds Geometrically finite hyperbolic 3-manifolds Statements of main theorems The case when there is a .

phism. In the case of 3-manifolds with finite fundamental groups, it is known that there are homotopy equivalent manifolds which are not homeomorphic, but there are no known examples of closed orientable irreducible 3-manifolds with isomorphic infinite fundamental groups which are not homcomorphic. Save on Homotopy Equivalences of 3-Manifolds and Deformation Theory of Kleinian Groups by. Shop your textbooks from ZookalNZ today. This text investigates a natural question arising in the topological theory of $3$-manifolds, and applies the results to give new information about the deformation theory of hyperbolic $3$-manifolds. TITLE = {Homotopy equivalences of 3-manifolds and deformation theory of {K}leinian groups}, JOURNAL = {Mem. Amer. Math. Soc.}, FJOURNAL = {Memoirs of the American Mathematical Society}. Homotopy equivalences of 3-manifolds and deformation theory of Kleinian groups - Richard D. Canary and Darryl McCullough: Volume Number Title; MEMO/ Locally finite root systems - Ottmar Loos and Erhard Neher: MEMO/ Infinite dimensional complex symplectic spaces - W. N. Everitt and L. Markus: MEMO/

This text investigates a natural question arising in the topological theory of $3$-manifolds, and applies the results to give new information about the deformation theory of hyperbolic $3$-manifolds. It is well known that some compact $3$-manifolds with boundary admit homotopy equivalences that are not homotopic to : Libro de bolsillo. Homotopy equivalences of 3-manifolds and deformation theory of Kleinian groups. By Richard D Canary and Darryl McCullough. Topics: Mathematical Physics and Mathematics. Publisher: American Mathematical Society. Year: OAI identifier: oai: Algebraic limits of Kleinian groups which rearrange the pages of a book’, Homotopy equivalences of 3-manifolds and deformation theory of Kleinian groups’, (). Homotopy equivalences of 3-manifolds with boundaries, (). Hyperbolic Dehn surgery and convergence of Kleinian groups’. Homotopy Equivalences of 3-Manifolds with Boundaries It seems that you're in USA. We have a dedicated site Geometric properties of 3-manifold groups. Book Title Homotopy Equivalences of 3-Manifolds with Boundaries Authors. K. Johannson;.