Shortcuts
Top of page (Alt+0)
Page content (Alt+9)
Page menu (Alt+8)
Your browser does not support javascript, some WebOpac functionallity will not be available.
.
Default
.
PageMenu
-
Main Menu
-
Simple Search
.
Advanced Search
.
Journal Search
.
Refine Search Results
.
Preferences
.
Search Menu
Simple Search
.
Advanced Search
.
New Items Search
.
Journal Search
.
Refine Search Results
.
Bottom Menu
Help
Italian
.
English
.
German
.
New Item Menu
New Items Search
.
New Items List
.
Links
SISSA Library
.
ICTP library
.
Italian National web catalog (SBN)
.
Trieste University web catalog
.
Udine University web catalog
.
© LIBERO v6.4.1sp220816
Page content
You are here
:
Catalogue Tag Display
Catalogue Tag Display
MARC 21
Ricci flow and the sphere theorem /
Tag
Description
006
$ a b 001 0
020
$a9781470411732 (online)
082
$a516.3/62$222
099
$aOnline Resource: AMS eBooks
100
$aBrendle, Simon,$d1981-
245
$aRicci flow and the sphere theorem /$h[EBook] $cSimon Brendle.
260
$aProvidence, R.I. :$bAmerican Mathematical Society,$cc2010.
300
$a1 online resource (vii, 176 p.)
440
$aGraduate Studies in Mathematics, $v 111
504
$aIncludes bibliographical references and index.
505
$tChapter 1. A survey of sphere theorems in geometry$tChapter 2. Hamilton's Ricci flow$tChapter 3. Interior estimates$tChapter 4. Ricci flow on $S 2$$tChapter 5. Pointwise curvature estimates$tChapter 6. Curvature pinching in dimension 3$tChapter 7. Preserved curvature conditions in higher dimensions$tChapter 8. Convergence results in higher dimensions$tChapter 9. Rigidity results$tAppendix A. Convergence of evolving metrics$tAppendix B. Results from complex linear algebra$tProblems
520
$a
"In 1982, R. Hamilton introduced a nonlinear evolution equation for Riemannian metrics with the aim of finding canonical metrics on manifolds. This evolution equation is known as the Ricci flow, and it has since been used widely and with great success, most notably in Perelman's solution of the Poincare conjecture. Furthermore, various convergence theorems have been established. This book provides a concise introduction to the subject as well as a comprehensive account of the convergence theory for the Ricci flow. The proofs rely mostly on maximum principle arguments. Special emphasis is placed on preserved curvature conditions, such as positive isotropic curvature. One of the major consequences of this theory is the Differentiable Sphere Theorem: a compact Riemannian manifold, whose sectional curvatures all lie in the interval (1,4], is diffeomorphic to a spherical space form. This question has a long history, dating back to a seminal paper by H. E. Rauch in 1951, and it was resolved in 2007 by the author and Richard Schoen."--Publisher's description.
533
$aElectronic reproduction.$bProvidence, Rhode Island :$cAmerican Mathematical Society.$d2012
533
$nMode of access: World Wide Web. System requirements: Internet Explorer 6.0 (or higher) or Firefox 2.0 (or higher). Available as searchable text in PDF format.
538
$aOnline access to this digital book is restricted to subscription institutions through IP address (only for SISSA internal users).
830
$aGraduate studies in mathematics ;$v 111.
856
$3Contents$u
http://www.ams.org/gsm/111
856
$3Contents$u
https://doi.org/10.1090/gsm/111
Quick Search
Search for
