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37 research outputs found

Entropies, volumes, and Einstein metrics

Author: A Manning
A Sambusetti
AL Besse
B Hanke
D Kotschick
D Kotschick
D Kotschick
D Kotschick
F Ledrappier
G Besson
G. Besson
GP Paternain
GP Paternain
GP Paternain
J Milnor
J. Kedra
JA Hillman
L Bessières
M Brunnbauer
M. Brunnbauer
M. Gromov
NJ Hitchin
P Ozsváth
R Fintushel
S Bauer
S Bauer
Publication venue: 'Springer Science and Business Media LLC'
Publication date: 28/01/2013
Field of study

We survey the definitions and some important properties of several asymptotic invariants of smooth manifolds, and discuss some open questions related to them. We prove that the (non-)vanishing of the minimal volume is a differentiable property, which is not invariant under homeomorphisms. We also formulate an obstruction to the existence of Einstein metrics on four-manifolds involving the volume entropy. This generalizes both the Gromov--Hitchin--Thorpe inequality and Sambusetti's obstruction.Comment: This is a substantial revision and expansion of the 2004 preprint, which I prepared in spring of 2010 and which has since been published. The version here is essentially the published one, minus the problems introduced by Springer productio

arXiv.org e-Print Archive

Crossref

A simple proof of Perelman's collapsing theorem for 3-manifolds

Author: A. Petrunin
B. Kleiner
D. Burago
E. Calabi
G. Perelman
G. Perelman
G. Perelman
H. Cao
H. Wu
J. Cao
J. Cao
J. Cheeger
J. Cheeger
J. Cheeger
J. Morgan
Jian Ge
Jianguo Cao
K. Grove
K. Grove
K. Grove
L. Bessières
M. Gromov
R.S. Hamilton
R.S. Hamilton
T. Colding
T. Colding
T. Colding
T. Shioya
T. Shioya
T. Shioya
V. Kapovitch
V. Kapovitch
V. Kapovitch
X. Rong
Y. Burago
Z. Shen
Publication venue: 'Springer Science and Business Media LLC'
Publication date: 09/05/2010
Field of study

We will simplify earlier proofs of Perelman's collapsing theorem for 3-manifolds given by Shioya-Yamaguchi and Morgan-Tian. Among other things, we use Perelman's critical point theory (e.g., multiple conic singularity theory and his fibration theory) for Alexandrov spaces to construct the desired local Seifert fibration structure on collapsed 3-manifolds. The verification of Perelman's collapsing theorem is the last step of Perelman's proof of Thurston's Geometrization Conjecture on the classification of 3-manifolds. Our proof of Perelman's collapsing theorem is almost self-contained, accessible to non-experts and advanced graduate students. Perelman's collapsing theorem for 3-manifolds can be viewed as an extension of implicit function theoremComment: v1: 9 Figures. In this version, we improve the exposition of our arguments in the earlier arXiv version. v2: added one more grap

arXiv.org e-Print Archive

CiteSeerX

Crossref

Perelman’s ${\bar{\lambda}}$ -invariant and collapsing via geometric characteristic splittings

Author: B. Kleiner
B. Leeb
C. LeBrun
E. Rips
G. Besson
G. Besson
G. Paternain
G. Paternain
H. Inoue
J. Cheeger
K. Akutagawa
K. Johanson
L. Bessières
M. Brunnbauer
M. Gromov
M. Gromov
P. Eberlein
P. Suárez-Serrato
P. Suárez-Serrato
R. Mañé
R. Schoen
W. Ballman
Publication venue: 'Springer Science and Business Media LLC'
Publication date
Field of study

Crossref

Introduction à l'étude philosophique de la phrénologie et nouvelle classification des facultés cérébrales / par le Dr G.-L. Bessières

Author: Bessières G L (Dr). Auteur du texte
Publication venue: chez les principaux libraires (Paris)
Publication date
Field of study

Contient une table des matièresAvec mode text

49 ref. 5 graph.International audienc

HAL Descartes