Let $\Omega$ be a bounded smooth domain in $\mathbb{R}^{4}$ such that for
some integer $d\geq1$ its $d$-th singular cohomology group with coefficients in
some field is not zero, then problem
  {\Delta^{2}u-\rho^{4}k(x)e^{u}=0 & \hbox{in}\Omega,
  u=\Delta u=0 & \hbox{on}\partial\Omega,
  has a solution blowing-up, as $\rho\to0$, at $m$ points of $\Omega$, for any
given number $m$.Comment: 30 pages, to appear in Ann. IHP Non Linear Analysi

Adimurthi

Bahri

Baraket

Bartolucci

Branson

Brezis

Chang

Chen

Claudio Muñoz

del Pino

Dold

Druet

Esposito

Kazdan

Liouville

Malchiodi

Monica Musso

Mónica Clapp

Nagasaki

Paneitz

Pistoia

Suzuki

Tarantello

Weston

Annales de l Institut Henri Poincaré C Analyse non linéaire

English

arXiv

Let Omega be a bounded smooth domain in R-4 such that for some integer d >= 1 its d-th singular cohomology group with coefficients in some field is not zero, then problem
{Delta(2)u - rho(4)k(x)e(u) = 0 in Omega,

u = Delta u = 0 on partial derivative Omega,

has a solution blowing-up, as rho -> 0, at m points of Omega, for any given number in.This work has been partly supported by grants Fondecyt 1040936, Chile, and by grants CONACYT 43724 and
PAPIIT IN105106, Mexico

Clapp, Mónica

Muñoz, Claudio

Musso, Mónica

Repositorio Académico de la Universidad de Chile

Singular limits for the bi-Laplacian operator with exponential nonlinearity in R-4

M. CLAPP

C. MUNOZ

MUSSO, Monica

PORTO@iris (Publications Open Repository TOrino - Politecnico di Torino)

Singular limits for the bi-Laplacian operator with exponential nonlinearity in R4

Name not available

Let be a bounded smooth domain in R4 such that for some integer d  1 its d-th singular cohomology group with coe ¢ cients in some field is not zero, then problem( 2u  4k(x)eu = 0 in u = u = 0 on @ has a solution blowing-up, as  ! 0, at m points of, for any given number m

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Singular limits for the bi-laplacian operator with exponential nonlinearity in R^4

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Singular limits for the bi-Laplacian operator with exponential nonlinearity in
                    
                      
                        R

Musso, Monica

Numérisation de Documents Anciens Mathématiques

Singular limits for the bi-laplacian operator with exponential nonlinearity in ${R}^{4}$

Let Omega be a bounded smooth domain in R-4 such that for some integer d >= 1 its d-th singular cohomology group with coefficients in some field is not zero, then problem{Delta(2)u - rho(4)k(x)e(u) = 0 in Omega,u = Delta u = 0 on partial derivative Omega,has a solution blowing-up, as rho -> 0, at m points of Omega, for any given number in. (C) 2007 Elsevier Masson SAS. All rights reserved.Fondecyt, ChileCONACYTPAPIIT, Mexic

Clapp, Monica

Munoz, Claudio

Pontificia Universidad Católica de Chile: Repositorio UC

http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.244.9259

Singular limits for the bi-laplacian operator with exponential
  nonlinearity in $\R^4$

Singular limits for the bi-laplacian operator with exponential nonlinearity in $\R^4$

Abstract

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Repositorio Académico de la Universidad de Chile

PORTO@iris (Publications Open Repository TOrino - Politecnico di Torino)

Name not available

CiteSeerX

Crossref

Numérisation de Documents Anciens Mathématiques

Pontificia Universidad Católica de Chile: Repositorio UC

Singular limits for the bi-laplacian operator with exponential nonlinearity in R4\R^4R4

Abstract

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Full text

Available Versions

Repositorio Académico de la Universidad de Chile

PORTO@iris (Publications Open Repository TOrino - Politecnico di Torino)

Name not available

CiteSeerX

Crossref

Numérisation de Documents Anciens Mathématiques

Pontificia Universidad Católica de Chile: Repositorio UC

Singular limits for the bi-laplacian operator with exponential nonlinearity in $\R^4$