Accepted for publication in JNEEA

Uniqueness result of entropy solution to nonlinear Neumann problems with variable exponent and L1-data


A. Jamea

Département de Mathématiques, Centre Régional des Métiers de l’Education et de Formation, El Jadida, Maroc

A. El Hachimi

Département de Mathématiques, Faculté des Sciences, Université Mohammed V, Agdal, Rabat, Maroc

Received on December 20, 2015; final version on May 25, 2016
Accepted on May 22, 2016 (with modifications), final version on June 17, 2016

Communicated by Alexander Pankov

Abstract.  Our aim in this paper is to study the uniqueness question of the nonlinear Neumann problems with variable exponent
|u| p(x)−2u − div [ |∇u − Θ(u)|p(x)−2 (∇u − Θ(u)) ] + α(u) = f   in Ω,
where Ω is a connected open bounded set in RN, p(.) is a continuous function defined on $\bar Ω$ with p(.) ∈ L(Ω) and p(x) > 1 for all x ∈ $\bar Ω$. We will have in mind especially the case when initial data are in L1.
Keywords: Nonlinear elliptic problem, Neumann-type boundary, entropy solution, variable exponent, uniqueness.
2010 Mathematics Subject Classification:   35J60, 35J65, 35J92.

This article is not yet published, it will be available for download soon.