Nawal Irzi scite author profile

This paper is devoted to the study of the nonhomogeneous problem −div (a(|∇u|)) is a continuous function, a is mapping such that ϕ(|t|)t is increasing homeomorphism from R to R and g : Ω × R → R is a continuous function. We establish there main results with various assumptions, the first one asserts that any λ > 0 is an eigenvalue of our problem. The second Theorem states the existence of a constant λ * such that every λ ∈ (0, λ * ) is an eigenvalue of the problem. While the third Theorem claims the existence of a constant λ * * such that every λ ∈ [λ * * , ∞) is an eigenvalue of the problem. Our approach relies on adequate variational methods in Orlicz-Sobolev spaces.

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The fractional p(.,.)-Neumann boundary conditions for the nonlocal p(.,.)-Laplacian operator

Irzi

Kefi

2021

Applicable Analysis

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Existence of three weak solutions for fourth-order Leray–Lions problem with indefinite weights

Kefi

Irzi

Al-Shomrani

2022

Complex Variables and Elliptic Equations

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Nawal Irzi

Nonhomogeneousp(x)-Laplacian Steklov problem with weights

Eigenvalues of some $p(x)$-biharmonic problems under Neumann boundary conditions

Multiplicity of solutions for a nonhomogeneous problem involving a potential in Orlicz-Sobolev spaces

The fractional p(.,.)-Neumann boundary conditions for the nonlocal p(.,.)-Laplacian operator

Existence of three weak solutions for fourth-order Leray–Lions problem with indefinite weights

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