A Quantitative Analysis of Metrics on Rn with Almost Constant Positive Scalar Curvature, with Applications to Fast Diffusion Flows

Surveys in Differential Geometry XII On the Conformal Scalar Curvature Equation and Related Problems

Simon Brendle
The Yamabe Problem
S. Brendle

October 2016

A fundamental result in two-dimensional Riemannian geometry is the uniformization theorem, which ass...

Nonlinear diffusion equations and curvature conditions in metric measure spaces

Ambrosio, L
Mondino, A
Savaré, G

January 2020

The aim of this paper is to provide new characterizations of the curvature dimension condition in th...

Conformal metrics on R-2m with constant Q-curvature Luca Martinazzi

Martinazzi L

January 2008

We study the conformal metrics on R-2m with constant Q-curvature Q is an element of R having finite ...

A Quantitative Analysis of Metrics on Rn with Almost Constant Positive Scalar Curvature, with Applications to Fast Diffusion Flows

Ciraolo, G.
Figalli, A.
Maggi, F.

January 2017

We prove a quantitative structure theorem for metrics on R^n that are conformal to the flat metric, ...

Special fast diffusion with slow asymptotics. Entropy method and flow on a Riemannian manifold

BONFORTE M
VAZQUEZ J. L.
GRILLO, GABRIELE

January 2010

We consider the asymptotic behaviour of positive solutions of the fast diffusion equation u_t = \Del...

A scalar curvature flow in low dimensions

Mayer, Martin

January 2015

Let (Mn, g0) be a n=3,4,5 dimensional, closed Riemannian manifold of positive Yamabe invariant. For...

Diffusion, optimal transport and Ricci curvature for metric measure spaces

Luigi Ambrosio
Nicola Gigli
giuseppe Savare

January 2017

Lower Ricci curvature bounds play a crucial role in several deep geometric and functional inequaliti...

Diffusion, Optimal Transport and Ricci Curvature for Metric Measure Space

Ambrosio, Luigi
Gigli, Nicola
Savaré, Giuseppe

January 2017

Lower Ricci curvature bounds play a crucial role in several deep geometric and functional inequaliti...

GREEN FUNCTIONS AND CONFORMAL GEOMETRY

Lutz Habermann
Jürgen Jost

January 1999

We use the Green function of the Yamabe operator (conformal Laplacian) to construct a canonical metr...

Fast diffusion flow on manifolds of nonpositive curvature

M. BONFORTE
J. L. VAZQUEZ
GRILLO, GABRIELE

January 2008

We consider the fast diffusion equation on a nonparabolic Riemannian manifold M. Existence of weak s...

Almost-rigidity and the extinction time of positively curved Ricci flows

Bamler, RH
Maximo, D

October 2017

We prove that Ricci flows with almost maximal extinction time must be nearly round, provided that th...

Almost Rigidity of the Positive Mass Theorem

Sormani, Christina

July 2016

The Positive Mass Theorem includes a rigidity statement that an asymptotically flat manifold with no...

EVOLUTION OF RELATIVE YAMABE CONSTANT UNDER RICCI FLOW

Botvinnik, Boris
Lu, Peng

Let W be a manifold with boundary M given together with a conformal class C^^－ which restricts to a ...

Ricci curvature of Markov chains on metric spaces

Ollivier, Yann

February 2009

AbstractWe define the coarse Ricci curvature of metric spaces in terms of how much small balls are c...

Conformal tori with almost non-negative scalar curvature

Chu, Jianchun
Lee, Man-Chun

April 2022

In this work, we consider sequence of metrics with almost non-negative scalar curvature on torus. We...

Surveys in Differential Geometry XII On the Conformal Scalar Curvature Equation and Related Problems

Simon Brendle
The Yamabe Problem
S. Brendle

October 2016

A fundamental result in two-dimensional Riemannian geometry is the uniformization theorem, which ass...

Nonlinear diffusion equations and curvature conditions in metric measure spaces

Ambrosio, L
Mondino, A
Savaré, G

January 2020

The aim of this paper is to provide new characterizations of the curvature dimension condition in th...

Conformal metrics on R-2m with constant Q-curvature Luca Martinazzi

Martinazzi L

January 2008

We study the conformal metrics on R-2m with constant Q-curvature Q is an element of R having finite ...

A Quantitative Analysis of Metrics on Rn with Almost Constant Positive Scalar Curvature, with Applications to Fast Diffusion Flows

Ciraolo, G.
Figalli, A.
Maggi, F.

January 2017

We prove a quantitative structure theorem for metrics on R^n that are conformal to the flat metric, ...

Special fast diffusion with slow asymptotics. Entropy method and flow on a Riemannian manifold

BONFORTE M
VAZQUEZ J. L.
GRILLO, GABRIELE

January 2010

We consider the asymptotic behaviour of positive solutions of the fast diffusion equation u_t = \Del...

A scalar curvature flow in low dimensions

Mayer, Martin

January 2015

Let (Mn, g0) be a n=3,4,5 dimensional, closed Riemannian manifold of positive Yamabe invariant. For...

Diffusion, optimal transport and Ricci curvature for metric measure spaces

Luigi Ambrosio
Nicola Gigli
giuseppe Savare

January 2017

Lower Ricci curvature bounds play a crucial role in several deep geometric and functional inequaliti...

Diffusion, Optimal Transport and Ricci Curvature for Metric Measure Space

Ambrosio, Luigi
Gigli, Nicola
Savaré, Giuseppe

January 2017

Lower Ricci curvature bounds play a crucial role in several deep geometric and functional inequaliti...

GREEN FUNCTIONS AND CONFORMAL GEOMETRY

Lutz Habermann
Jürgen Jost

January 1999

We use the Green function of the Yamabe operator (conformal Laplacian) to construct a canonical metr...

Fast diffusion flow on manifolds of nonpositive curvature

M. BONFORTE
J. L. VAZQUEZ
GRILLO, GABRIELE

January 2008

We consider the fast diffusion equation on a nonparabolic Riemannian manifold M. Existence of weak s...

Almost-rigidity and the extinction time of positively curved Ricci flows

Bamler, RH
Maximo, D

October 2017

We prove that Ricci flows with almost maximal extinction time must be nearly round, provided that th...

Almost Rigidity of the Positive Mass Theorem

Sormani, Christina

July 2016

The Positive Mass Theorem includes a rigidity statement that an asymptotically flat manifold with no...

EVOLUTION OF RELATIVE YAMABE CONSTANT UNDER RICCI FLOW

Botvinnik, Boris
Lu, Peng

Let W be a manifold with boundary M given together with a conformal class C^^－ which restricts to a ...

Ricci curvature of Markov chains on metric spaces

Ollivier, Yann

February 2009

AbstractWe define the coarse Ricci curvature of metric spaces in terms of how much small balls are c...

Conformal tori with almost non-negative scalar curvature

Chu, Jianchun
Lee, Man-Chun

April 2022

In this work, we consider sequence of metrics with almost non-negative scalar curvature on torus. We...

Surveys in Differential Geometry XII On the Conformal Scalar Curvature Equation and Related Problems

Simon Brendle
The Yamabe Problem
S. Brendle

October 2016

A fundamental result in two-dimensional Riemannian geometry is the uniformization theorem, which ass...

Nonlinear diffusion equations and curvature conditions in metric measure spaces

Ambrosio, L
Mondino, A
Savaré, G

January 2020

The aim of this paper is to provide new characterizations of the curvature dimension condition in th...

Conformal metrics on R-2m with constant Q-curvature Luca Martinazzi

Martinazzi L

January 2008

We study the conformal metrics on R-2m with constant Q-curvature Q is an element of R having finite ...

A Quantitative Analysis of Metrics on Rn with Almost Constant Positive Scalar Curvature, with Applications to Fast Diffusion Flows

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A Quantitative Analysis of Metrics on Rn with Almost Constant Positive Scalar Curvature, with Applications to Fast Diffusion Flows

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