Ricci flow

KÄHLER--RICCI FLOW (new results) -- GANG TIAN

Lecture given by Professor Gang Tian (Princeton University, Beijing University, Massachusetts Institute of Technology) on "New Results on Kähler--Ricci flow". This was recorded at the Banff International Research Station, the conference being Geometric Flows: Recent Developments and Applic

From playlist Research Lectures

Peter TOPPING - Sharp local decay estimates for the Ricci flow on surfaces

There are many tools available when studying 2D Ricci flow, equivalently the logarithmic fast diffusion equation, but one has always been missing: how do you get uniform smoothing estimates in terms of local L^1 data, i.e. in terms of local bounds on the area. The problem is th

From playlist Trimestre "Ondes Non Linéaires" - May Conference

Brett Kotschwar: Propagation of geometric structure under the Ricci flow & applications

Title: Propagation of geometric structure under the Ricci flow and applications to shrinking solitons Abstract: We will present some unique-continuation results which ensure the propagation of symmetry and other geometric features (e.g., warped product structures) backward in time along a

From playlist MATRIX-SMRI Symposium: Singularities in Geometric Flows

R. Bamler - Compactness and partial regularity theory of Ricci flows in higher dimensions

We present a new compactness theory of Ricci flows. This theory states that any sequence of Ricci flows that is pointed in an appropriate sense, subsequentially converges to a synthetic flow. Under a natural non-collapsing condition, this limiting flow is smooth on the complement of a sing

From playlist Ecole d'été 2021 - Curvature Constraints and Spaces of Metrics

R. Bamler - Compactness and partial regularity theory of Ricci flows in higher dimensions (vt)

We present a new compactness theory of Ricci flows. This theory states that any sequence of Ricci flows that is pointed in an appropriate sense, subsequentially converges to a synthetic flow. Under a natural non-collapsing condition, this limiting flow is smooth on the complement of a sing

From playlist Ecole d'été 2021 - Curvature Constraints and Spaces of Metrics

Nicolas Juillet: Examples in relation with a metric Ricci flow

Gigli and Mantegazza have observed how optimal transport and heat diffusion permit us to describe the Ricci flow (or at least its direction) uniquely from the metric aspects of Riemannian manifolds. The goal is to reformulate the Ricci flow so that it also makes sense for metric spaces. I

From playlist HIM Lectures: Follow-up Workshop to JTP "Optimal Transportation"

Paula Burkhardt-Guim - Lower scalar curvature bounds for $C^0$ metrics: a Ricci flow approach

We describe some recent work that has been done to generalize the notion of lower scalar curvature bounds to C^0 metrics, including a localized Ricci flow approach. In particular, we show the following: that there is a Ricci flow definition which is stable under greater-than-second-order p

From playlist Not Only Scalar Curvature Seminar

Comparison geometry for Ricci curvature I, Guofang Wei [2016]

Slides for this talk: https://drive.google.com/open?id=1d3IhMz2enIsBOuKRPA6JF80FPqbHSR9v Ricci curvature occurs in the Einstein equation, Ricci flow, optimal transport, and is important both in mathematics and physics. Comparison method is one of the key tools in studying the Ricci curvat

From playlist Mathematics

The Chern--Ricci flow | Ben Weinkove

This workshop seeks to explore connections between geometric flows and other areas of mathematics and physics. Geometric flows refer to ways in which geometry can be deformed smoothly in time, rather analogous to the way in which the geometry of the surface of a balloon becomes smooth and

From playlist Research Lectures

Ricci flows with Rough Initial Data - Peter Topping

Workshop on Geometric Functionals: Analysis and Applications Topic: Ricci flows with Rough Initial Data Speaker: Peter Topping Affiliation: University of Warwick Date: March 8, 2019 For more video please visit http://video.ias.edu

From playlist Mathematics

Bruce KLEINER - Ricci flow, diffeomorphism groups, and the Generalized Smale Conjecture

The Smale Conjecture (1961) may be stated in any of the following equivalent forms: • The space of embedded 2-spheres in R3 is contractible. • The inclusion of the orthogonal group O(4) into the group of diffeomorphisms of the 3-sphere is a homotopy equivalence. • The s

From playlist Riemannian Geometry Past, Present and Future: an homage to Marcel Berger

The Work of Grigory Perelman - John Lott [ICM 2006]

slides for this talk: https://www.mathunion.org/fileadmin/IMU/Videos/ICM2006/tars/laudationes2006_perelman.pdf The Work of Grigory Perelman John Lott University of Maryland, USA https://www.mathunion.org/icm/icm-videos/icm-2006-videos-madrid-spain/icm-madrid-videos-22082006

From playlist Mathematics

Ancient solutions to geometric flows IV - Panagiota Daskalopoulos

Women and Mathematics: Uhlenbeck Lecture Course Topic: Ancient solutions to geometric flows IV Panagiota Daskalopoulos Affiliation: Columbia University Date: May 24, 2019 For more video please visit http://video.ias.edu

From playlist Mathematics

Poincare Conjecture and Ricci Flow | A Million Dollar Problem in Topology

How do we use Riemannian Geometry and Surgery Theory to crack a million-dollar problem in topology? Ricci flow, that's how. In this video, we tackle the only Millennium Prize Problem that's been solved so far, and find the deep mathematics uncovered in the process. --- Official Problem St

From playlist Famous Unsolved Problems

The Kahler-Ricci flow, Ricci-flat metrics and collapsing limits - Ben Weinkove [2015]

Name: Ben Weinkove Event: Workshop: Collapsing Calabi-Yau Manifolds Event URL: view webpage Title: The Kahler-Ricci flow, Ricci-flat metrics and collapsing limits Date: 2015-09-02 @2:15 PM Location: 102 Abstract: I will discuss the behavior of collapsing metrics on holomorphic fiber spac

From playlist Mathematics

Ricci Flow - Numberphile

More links & stuff in full description below ↓↓↓ Ricci Flow was used to finally crack the Poincaré Conjecture. It was devised by Richard Hamilton but famously employed by Grigori Perelman in his acclaimed proof. It is named after mathematician Gregorio Ricci-Curbastro. In this video it i

From playlist Numberphile Videos

Ricci Flow Extra Footage - Numberphile

Main video at: http://youtu.be/hwOCqA9Xw6A More links & stuff in full description below ↓↓↓ Support us on Patreon: http://www.patreon.com/numberphile NUMBERPHILE Website: http://www.numberphile.com/ Numberphile on Facebook: http://www.facebook.com/numberphile Numberphile tweets: https://

From playlist Numberphile Videos

Richard Hamilton | The Poincare Conjecture | 2006

The Poincare Conjecture Richard Hamilton Columbia University, New York, USA https://www.mathunion.org/icm/icm-videos/icm-2006-videos-madrid-spain/icm-madrid-videos-22082006

From playlist Number Theory

Felix Schulze: A relative entropy and a unique continuation result for Ricci expanders

Abstract: We prove an optimal relative integral convergence rate for two expanding gradient Ricci solitons coming out of the same cone. As a consequence, we obtain a unique continuation result at infinity and we prove that a relative entropy for two such self-similar solutions to the Ricci

From playlist MATRIX-SMRI Symposium: Singularities in Geometric Flows