114 research outputs found
Long-time analysis of 3 dimensional Ricci flow III
In this paper we analyze the long-time behavior of 3 dimensional Ricci flows
with surgery. Our main result is that if the surgeries are performed correctly,
then only finitely many surgeries occur and after some time the curvature is
bounded by . This result confirms a conjecture of Perelman. In the
course of the proof, we also obtain a qualitative description of the geometry
as .
This paper is the third part of a series. Previously, we had to impose a
certain topological condition to establish the finiteness of
the surgeries and the curvature control. The objective of this paper is to
remove this condition and to generalize the result to arbitrary closed
3-manifolds. This goal is achieved by a new area evolution estimate for minimal
simplicial complexes, which is of independent interest.Comment: 86 page
Uniqueness and stability of Ricci flow through singularities
We verify a conjecture of Perelman, which states that there exists a
canonical Ricci flow through singularities starting from an arbitrary compact
Riemannian 3-manifold. Our main result is a uniqueness theorem for such flows,
which, together with an earlier existence theorem of Lott and the second named
author, implies Perelman's conjecture. We also show that this flow through
singularities depends continuously on its initial condition and that it may be
obtained as a limit of Ricci flows with surgery.
Our results have applications to the study of diffeomorphism groups of three
manifolds --- in particular to the Generalized Smale Conjecture --- which will
appear in a subsequent paper.Comment: 182 pages, 10 figures, minor correction
Almost-rigidity and the extinction time of positively curved Ricci flows
We prove that Ricci flows with almost maximal extinction time must be nearly
round, provided that they have positive isotropic curvature when crossed with
. As an application, we show that positively curved metrics on
and with almost maximal width must be nearly round
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