EUDML

In this paper we study the existence of solutions for quasilinear degenerated elliptic operators A(u) + g(x,u,∇u) = f, where A is a Leray-Lions operator from W (Ω,ω) into its dual, while g(x,s,ξ) is a nonlinear term which has a growth condition with respect to ξ and no growth with respect to s, but it satisfies a sign condition on s. The right hand side f is assumed to belong either to W(Ω,ω*) or to L(Ω).

Existence of Solution for Quasilinear Degenerated Elliptic Unilateral Problems

Youssef Akdim; Elhoussine Azroul; Abdelmoujib Benkirane — 2003

Annales mathématiques Blaise Pascal

An existence theorem is proved, for a quasilinear degenerated elliptic inequality involving nonlinear operators of the form $A u + g (x, u, \nabla u)$ , where $A$ is a Leray-Lions operator from $W_{0}^{1, p} (Ω, w)$ into its dual, while $g (x, s, ξ)$ is a nonlinear term which has a growth condition with respect to $ξ$ and no growth with respect to $s$ , but it satisfies a sign condition on $s$ , the second term belongs to $W^{- 1, p^{'}} (Ω, w^{*})$ .

On a necessary condition in the calculus of variations in Sobolev spaces with variable exponent

Elhoussine Azroul; Meryem El Lekhlifi; Badr Lahmi; Abdelfattah Touzani — 2014

Applicationes Mathematicae

We prove an approximation theorem in generalized Sobolev spaces with variable exponent $W^{1, p (\cdot)} (Ω)$ and we give an application of this approximation result to a necessary condition in the calculus of variations.

Entropy solutions for nonhomogeneous anisotropic $Δ_{p ⃗ (\cdot)}$ problems

Elhoussine Azroul; Abdelkrim Barbara; Mohamed Badr Benboubker; Hassane Hjiaj — 2014

Applicationes Mathematicae

We study a class of anisotropic nonlinear elliptic equations with variable exponent p⃗(·) growth. We obtain the existence of entropy solutions by using the truncation technique and some a priori estimates.

Existence of solutions for some quasilinear $\vec{p} (x)$ -elliptic problem with Hardy potential

Elhoussine Azroul; Mohammed Bouziani; Hassane Hjiaj; Ahmed Youssfi — 2019

Mathematica Bohemica

We consider the anisotropic quasilinear elliptic Dirichlet problem $\{\begin{matrix} - \sum_{i = 1}^{N} D^{i} a_{i} (x, u, \nabla u) + {| u |}^{s (x) - 1} u = f + λ \frac{{| u |}^{p_{0} (x) - 2} u}{{| x |}^{p_{0} (x)}} & in Ω, \\ u = 0 & on \partial Ω, \end{matrix}$ where $Ω$ is an open bounded subset of $ℝ^{N}$ containing the origin. We show the existence of entropy solution for this equation where the data $f$ is assumed to be in $L^{1} (Ω)$ and $λ$ is a positive constant.

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Pseudo-monotonicity and degenerate elliptic operators of second order.

Existence and regularity of entropy solutions for some nonlinear elliptic equations.

On the $L^{\infty}$ -regularity of solutions of nonlinear elliptic equations in Orlicz spaces.

On the solvability of degenerated quasilinear elliptic problems.

Existence of solutions for nonlinear parabolic systems via weak convergence of truncations.

Existence result for variational degenerated parabolic problems via pseudo-monotonicity.

Higher order nonlinear degenerate elliptic problems with weak monotonicity.

Strongly nonlinear degenerated unilateral problems with $L^{1}$ data.

Strongly nonlinear degenerated elliptic unilateral problems via convergence of truncations.

Quasilinear elliptic problems with nonstandard growth.

On a necessary condition in the calculus of variations in Orlicz-Sobolev spaces

Existence results for quasilinear degenerated equations via strong convergence of truncations.

Existence of Solution for Quasilinear Degenerated Elliptic Unilateral Problems

On a necessary condition in the calculus of variations in Sobolev spaces with variable exponent

Entropy solutions for nonhomogeneous anisotropic $Δ_{p ⃗ (\cdot)}$ problems

Existence of solutions for some quasilinear $\vec{p} (x)$ -elliptic problem with Hardy potential