Singular limits for 2-dimensional elliptic problem involving exponential nonlinearity with nonlinear gradient term

Sami Baraket; Ines Ben Omrane; Taieb Ouni

doi:10.1007/s00030-010-0084-z

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Singular limits for 2-dimensional elliptic problem involving exponential nonlinearity with nonlinear gradient term

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Singular limits for 2-dimensional elliptic problem involving exponential nonlinearity with nonlinear gradient term

Sami Baraket, Ines Ben Omrane and Taieb Ouni

Nonlinear differential equations and applications, Vol.18(1), pp.59-78

01/02/2011

DOI: https://doi.org/10.1007/s00030-010-0084-z

Abstract

Mathematics

Mathematics, Applied

Physical Sciences

Science & Technology

Given a bounded open regular set Omega subset of R(2) and x(1), x(2), ... , x(m) is an element of Omega, we give a sufficient condition for the problem -div(a(u)del u) = rho(2) f(u) to have a positive weak solution u in Omega with u = 0 on partial derivative Omega, which is singular at each x(i) as the parameter rho tends to 0 and under suitable assumptions on exponential functions a(u) and f(u).

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Title: Singular limits for 2-dimensional elliptic problem involving exponential nonlinearity with nonlinear gradient term
Creators - without role: Sami Baraket - King Saud University
Ines Ben Omrane - Tunis University
Taieb Ouni - Tunis University
Publication Details: Nonlinear differential equations and applications, Vol.18(1), pp.59-78
Publisher: Walter De Gruyter
Number of pages: 20
Grant note: Math/2010/31 / College of Science of King Saud University, Research Center
Identifiers: 9916424908331
Academic Unit: Imam Mohammad Ibn Saud Islamic University (IMSIU)
Language: English
Resource Type: Journal article