Local uniqueness and non-degeneracy of blow up solutions of mean field equations with singular data

Mean field equations on tori: Existence and uniqueness of evenly symmetric blow-up solutions

Daniele Bartolucci
Changfeng Gui
Yeyao Hu
Aleks Jevnikar
Wen Yang

January 2020

We are concerned with the blow-up analysis of mean field equations. It has been proven in [6] that s...

Uniqueness results for mean field equations with singular data

BARTOLUCCI, DANIELE
Lin, CS

January 2009

We prove uniqueness of solutions for mean field equations (Caglioti et. Al. Comm. Math. Phys. 174 (1...

EXISTENCE OF BUBBLING SOLUTIONS WITHOUT MASS CONCENTRATION

Lee, Youngae
Lin, Chang-Shou
Yang, Wen

June 2019

The seminal work by Brezis and Merle has been pioneering in studying the bubbling phenomena of the m...

Local uniqueness and non-degeneracy of blow up solutions of mean field equations with singular data

Bartolucci, Daniele
Jevnikar, Aleks
Lee, Youngae
Yang, Wen

July 2020

We are concerned with the mean field equation with singular data on bounded domains. By assuming a s...

Uniqueness and non-degeneracy of bubbling solutions for Liouville equations.

Jevnikar, Aleks

May 2019

We prove uniqueness and non-degeneracy of solutions for the mean field equation blowing-up on a non-...

Profile of Blow-up Solutions to Mean Field Equations with Singular Data

BARTOLUCCI, DANIELE
TARANTELLO, GABRIELLA
Chen, C
Lin, C

January 2004

Motivated by the study of selfdual vortices in gauge field theory, we consider a class of Mean Field...

Uniqueness of bubbling solutions of mean field equations

Bartolucci, D
Jevnikar, A
Lee, Y
Yang, W

January 2019

We prove the uniqueness of blow up solutions of the mean field equation as rn ! 8pm, m 2 N. If un,1 ...

Sharp estimates for solutions of mean field equations with collapsing singularity

Lee Y.
Lin C. -S.
Tarantello G.
Yang W.

January 2017

The pioneering work of Brezis-Merle cite{bm}, Li-Shafrir cite{ls}, Li cite{l} and Bartolucci-Tarante...

Non-degeneracy and uniqueness of solutions to singular mean field equations on bounded domains

D. Bartolucci
A. Jevnikar
C. S. Lin

July 2018

The aim of this paper is to complete the program initiated in [51], [23] and then carried out by sev...

On the existence of blowing-up solutions for a mean field equation

Massimo Grossi
Pierpaolo Esposito
Angela Pistoia

January 2005

In this paper we construct single and multiple blowing-up solutions to the mean field equation: [GRA...

Mean field equations on tori: Existence and uniqueness of evenly symmetric blow-up solutions

Daniele Bartolucci
Changfeng Gui
Yeyao Hu
Aleks Jevnikar
Wen Yang

January 2020

We are concerned with the blow-up analysis of mean field equations. It has been proven in [6] that s...

Uniqueness results for mean field equations with singular data

BARTOLUCCI, DANIELE
Lin, CS

January 2009

We prove uniqueness of solutions for mean field equations (Caglioti et. Al. Comm. Math. Phys. 174 (1...

EXISTENCE OF BUBBLING SOLUTIONS WITHOUT MASS CONCENTRATION

Lee, Youngae
Lin, Chang-Shou
Yang, Wen

June 2019

The seminal work by Brezis and Merle has been pioneering in studying the bubbling phenomena of the m...

Local uniqueness and non-degeneracy of blow up solutions of mean field equations with singular data

Bartolucci, Daniele
Jevnikar, Aleks
Lee, Youngae
Yang, Wen

July 2020

We are concerned with the mean field equation with singular data on bounded domains. By assuming a s...

Uniqueness and non-degeneracy of bubbling solutions for Liouville equations.

Jevnikar, Aleks

May 2019

We prove uniqueness and non-degeneracy of solutions for the mean field equation blowing-up on a non-...

Profile of Blow-up Solutions to Mean Field Equations with Singular Data

BARTOLUCCI, DANIELE
TARANTELLO, GABRIELLA
Chen, C
Lin, C

January 2004

Motivated by the study of selfdual vortices in gauge field theory, we consider a class of Mean Field...

Uniqueness of bubbling solutions of mean field equations

Bartolucci, D
Jevnikar, A
Lee, Y
Yang, W

January 2019

We prove the uniqueness of blow up solutions of the mean field equation as rn ! 8pm, m 2 N. If un,1 ...

Sharp estimates for solutions of mean field equations with collapsing singularity

Lee Y.
Lin C. -S.
Tarantello G.
Yang W.

January 2017

The pioneering work of Brezis-Merle cite{bm}, Li-Shafrir cite{ls}, Li cite{l} and Bartolucci-Tarante...

Non-degeneracy and uniqueness of solutions to singular mean field equations on bounded domains

D. Bartolucci
A. Jevnikar
C. S. Lin

July 2018

The aim of this paper is to complete the program initiated in [51], [23] and then carried out by sev...

On the existence of blowing-up solutions for a mean field equation

Massimo Grossi
Pierpaolo Esposito
Angela Pistoia

January 2005

In this paper we construct single and multiple blowing-up solutions to the mean field equation: [GRA...

Mean field equations on tori: Existence and uniqueness of evenly symmetric blow-up solutions

Daniele Bartolucci
Changfeng Gui
Yeyao Hu
Aleks Jevnikar
Wen Yang

January 2020

We are concerned with the blow-up analysis of mean field equations. It has been proven in [6] that s...

Uniqueness results for mean field equations with singular data

BARTOLUCCI, DANIELE
Lin, CS

January 2009

We prove uniqueness of solutions for mean field equations (Caglioti et. Al. Comm. Math. Phys. 174 (1...

EXISTENCE OF BUBBLING SOLUTIONS WITHOUT MASS CONCENTRATION

Lee, Youngae
Lin, Chang-Shou
Yang, Wen

June 2019

The seminal work by Brezis and Merle has been pioneering in studying the bubbling phenomena of the m...

Local uniqueness and non-degeneracy of blow up solutions of mean field equations with singular data

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Local uniqueness and non-degeneracy of blow up solutions of mean field equations with singular data

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