Eigenvalues of the $p(x)-$biharmonic operator with indefinite weight] {Eigenvalues of the $p(x)-$biharmonic  operator with indefinite weight under Neumann boundary conditions

Zakaria El Allali; Said Taarabti; Khalil Ben Haddouch

doi:10.5269/bspm.v36i1.31363

Authors

Zakaria El Allali Department of Mathematics, and Computer Polydisciplinary Faculty of Nador, The university Mohammed Premier, Oujda, Morocco
Said Taarabti Department of Mathematics and Computer Polydisciplinary Faculty of Nador, The university Mohammed Premier, Oujda, Morocco
Khalil Ben Haddouch Department of Mathematics and Computer Science, Faculty of Science, University Mohammed Premier, Oujda, Morocco

DOI:

https://doi.org/10.5269/bspm.v36i1.31363

Keywords:

Fourth order elliptic equation, variable exponent, Neumann boundary conditions, Ekeland variational principle

Abstract

In this paper we will study the existence of solutions for the nonhomogeneous elliptic equation with variable exponent $\Delta^2_{p(x)} u=\lambda V(x) |u|^{q(x)-2} u$, in a smooth bounded domain,under Neumann boundary conditions, where $\lambda$ is a positive real number, $p,q: \overline{\Omega} \rightarrow \mathbb{R}$, are continuous functions, and $V$ is an indefinite weight function. Considering different situations concerning the growth rates involved in the above quoted problem, we will prove the existence of a continuous family of eigenvalues.