Dehn surgery on knots—tracing the evolution of research-Reference-Cited by-同舟云学术

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Dehn surgery on knots—tracing the evolution of research

Published:2023-04-20 Issue:1 Volume:36 Page:1-33
ISSN:0898-9583
Container-title:Sugaku Expositions
language:en
Short-container-title:Sugaku Expositions

Author:

Motegi Kimihiko

Abstract

Every closed orientable 3 3 -manifold is obtained from the 3 3 -sphere S 3 S^3 by Dehn surgery on a link, and thus Dehn surgery is a useful way to construct 3 3 -manifolds. In this survey article we restrict our attention to Dehn surgery on knots in S 3 S^3 and take a quick look at the evolution of study on this field along developments of 3 3 -dimensional topology.

Publisher

American Mathematical Society (AMS)

Subject

General Medicine

Reference141 articles.

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2. Bounds on exceptional Dehn filling II;Agol, Ian;Geom. Topol.,2010

3. J. W. Alexander, On the subdivision of a 3-space by a polyhedron, Proc. Nat. Acad. Sci. USA, 10, (1924), 6–8.

4. D. Auckly, An irreducible homology sphere which is not Dehn surgery on any knot, preprint available at \url{http://www.math.ksu.edu/ dav}

5. EMS Series of Lectures in Mathematics;Aschenbrenner, Matthias,2015

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