Remarks on spectral gaps on the Riemannian path space

Schrödinger operators on the Wiener space

ICHIRO SHIGEKAWA

January 2005

... Here L is the Ornstein-Uhlenbeck operator and V is a scalar potential. Our goal is to determine ...

A Poincaré inequality on loop spaces

Xin Chen
Xue-mei Li
Bo Wu

January 2010

We show that the Laplacian on the loop space over a class of Riemannian manifolds has a spectral gap...

SCHRÖDINGER OPERATORS ON THE WIENER SPACE

ICHIRO SHIGEKAWA

January 2007

We discuss a Schrödinger operator on the Wiener space of the form L ¡ V, L being the Ornstein-Uhlenb...

Remarks on spectral gaps on the Riemannian path space

Fang, Shizan
Wu, Bo

January 2017

International audienceIn this paper, we will give some remarks on links between the spectral gap of ...

Spectral gaps on path space over a nonsmooth metric measure space

January 2016

Abstract: Recently A. Naber obtained the characterization of the bound of the Ricci curvature by ana...

Spectral gap on Riemannian path space over static and evolving manifolds

Cheng, Li Juan
Thalmaier, Anton

February 2018

In this article, we continue the discussion of Fang–Wu (2015) to estimate the spectral gap of the Or...

Functional inequalities on path space of sub-Riemannian manifolds and applications

Cheng, Li Juan
Grong, Erlend
Thalmaier, Anton

September 2021

peer reviewedWe consider the path space of a manifold with a measure induced by a stochastic flow wi...

Gradient Estimates of Harmonic Functions and the Asymptotics of Spectral Gaps on Path Spaces

Aida Shigeki

January 2010

We show that the spectral gap of the Dirichlet form on the path space Px?(M?)T?=C?([0,T?]→M?;?γ(0)=x...

Spectral Gaps on Riemannian Manifolds

LEAL, Helton

January 2020

In this text, we survey some basic results related to the New Weyl criterion for the essential spect...

Some New Results on Eigenvectors via Dimension, Diameter, and Ricci Curvature

Bakry, Dominique
Qian, Zhongmin

October 2000

AbstractWe generalise for a general symmetric elliptic operator the different notions of dimension, ...

Polya-Szego inequality and Dirichlet p-spectral gap for non-smooth spaces with Ricci curvature bounded below

Mondino, A
Semola, D

January 2019

We study decreasing rearrangements of functions defined on (possibly non-smooth) metric measure spac...

Weak Poincare ́ Inequalities on Path Spaces ∗

Feng-yu Wang

March 2015

The weak Poincare ́ inequality is established on the finite time-interval Brownian path space over a...

Stability estimates for the sharp spectral gap bound under a curvature-dimension condition

Fathi, Max
Gentil, Ivan
Serres, Jordan

November 2022

We study stability of the sharp spectral gap bounds for metric-measure spaces satisfying a curvature...

Improved spectral gap bounds on positively curved manifolds

Veysseire, Laurent

May 2011

A coupling method and an analytic one allow us to prove new lower bounds for the spectral gap of rev...

A Poincaré inequality on loop spaces

Chen, Xin
Li, Xue-Mei
Wu, Bo

September 2010

AbstractWe show that the Laplacian on the loop space over a class of Riemannian manifolds has a spec...

Schrödinger operators on the Wiener space

ICHIRO SHIGEKAWA

January 2005

... Here L is the Ornstein-Uhlenbeck operator and V is a scalar potential. Our goal is to determine ...

A Poincaré inequality on loop spaces

Xin Chen
Xue-mei Li
Bo Wu

January 2010

We show that the Laplacian on the loop space over a class of Riemannian manifolds has a spectral gap...

SCHRÖDINGER OPERATORS ON THE WIENER SPACE

ICHIRO SHIGEKAWA

January 2007

We discuss a Schrödinger operator on the Wiener space of the form L ¡ V, L being the Ornstein-Uhlenb...

Remarks on spectral gaps on the Riemannian path space

Fang, Shizan
Wu, Bo

January 2017

International audienceIn this paper, we will give some remarks on links between the spectral gap of ...

Spectral gaps on path space over a nonsmooth metric measure space

January 2016

Abstract: Recently A. Naber obtained the characterization of the bound of the Ricci curvature by ana...

Spectral gap on Riemannian path space over static and evolving manifolds

Cheng, Li Juan
Thalmaier, Anton

February 2018

In this article, we continue the discussion of Fang–Wu (2015) to estimate the spectral gap of the Or...

Functional inequalities on path space of sub-Riemannian manifolds and applications

Cheng, Li Juan
Grong, Erlend
Thalmaier, Anton

September 2021

peer reviewedWe consider the path space of a manifold with a measure induced by a stochastic flow wi...

Gradient Estimates of Harmonic Functions and the Asymptotics of Spectral Gaps on Path Spaces

Aida Shigeki

January 2010

We show that the spectral gap of the Dirichlet form on the path space Px?(M?)T?=C?([0,T?]→M?;?γ(0)=x...

Spectral Gaps on Riemannian Manifolds

LEAL, Helton

January 2020

In this text, we survey some basic results related to the New Weyl criterion for the essential spect...

Some New Results on Eigenvectors via Dimension, Diameter, and Ricci Curvature

Bakry, Dominique
Qian, Zhongmin

October 2000

AbstractWe generalise for a general symmetric elliptic operator the different notions of dimension, ...

Polya-Szego inequality and Dirichlet p-spectral gap for non-smooth spaces with Ricci curvature bounded below

Mondino, A
Semola, D

January 2019

We study decreasing rearrangements of functions defined on (possibly non-smooth) metric measure spac...

Weak Poincare ́ Inequalities on Path Spaces ∗

Feng-yu Wang

March 2015

The weak Poincare ́ inequality is established on the finite time-interval Brownian path space over a...

Stability estimates for the sharp spectral gap bound under a curvature-dimension condition

Fathi, Max
Gentil, Ivan
Serres, Jordan

November 2022

We study stability of the sharp spectral gap bounds for metric-measure spaces satisfying a curvature...

Improved spectral gap bounds on positively curved manifolds

Veysseire, Laurent

May 2011

A coupling method and an analytic one allow us to prove new lower bounds for the spectral gap of rev...

A Poincaré inequality on loop spaces

Chen, Xin
Li, Xue-Mei
Wu, Bo

September 2010

AbstractWe show that the Laplacian on the loop space over a class of Riemannian manifolds has a spec...

Schrödinger operators on the Wiener space

ICHIRO SHIGEKAWA

January 2005

... Here L is the Ornstein-Uhlenbeck operator and V is a scalar potential. Our goal is to determine ...

A Poincaré inequality on loop spaces

Xin Chen
Xue-mei Li
Bo Wu

January 2010

We show that the Laplacian on the loop space over a class of Riemannian manifolds has a spectral gap...

SCHRÖDINGER OPERATORS ON THE WIENER SPACE

ICHIRO SHIGEKAWA

January 2007

We discuss a Schrödinger operator on the Wiener space of the form L ¡ V, L being the Ornstein-Uhlenb...

Remarks on spectral gaps on the Riemannian path space

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Remarks on spectral gaps on the Riemannian path space

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