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THE NEHARI MANIFOLD APPROACH FOR DIRICHLET PROBLEM INVOLVING THE p(x)-LAPLACIAN EQUATION
Abstract: In this paper, using the Nehari manifold approach and some variational techniques, we discuss the multiplicity of positive solutions for the p(x)-Laplacian problems with non-negative weight functions and prove that an elliptic equation has at least two positive solutions.
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Cited by 32 publications
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“…Proposition 3. (see [9])Assume that the boundary of D × Ω possesses the cone property and p (., .) ∈ C D × Ω .…”
Section: Compact Embedding Theoremsmentioning
confidence: 99%
“…Proposition 3. (see [9])Assume that the boundary of D × Ω possesses the cone property and p (., .) ∈ C D × Ω .…”
Section: Compact Embedding Theoremsmentioning
confidence: 99%
“…On the other hand, problems involving nonstandard growth conditions are extremely attractive because they can model phenomenons which arise from the study of electrorheological fluids or elastic mechanics, stationary thermo-rheological viscous flows of non-Newtonian fluids and they also appear in the mathematical description of the processes filtration of an ideal barotropic gas through a porous medium [1,14,15]. We refer the reader to [2,3,4,9,10,12,13] and the references therein for the study of p(x)-Laplacian equations.…”
Section: Introductionmentioning
confidence: 99%
“…However, in case p (x) ̸ = 2 the situation is very crucial, as for example, one encounters the lack of the homogeneity, and a result of this, some classical theories, such as the theory of Sobolev spaces, is not applicable. For the papers involving the p(x)-Laplacian operator we refer the readers to [3,5,11,13,16,17,18] and references therein. Moreover, the nonlinear problems involving the p (x)-Laplacian extremely attractive because they can be used to model dynamical phenomena which arise from the study of electrorheological fluids or elastic mechanics.…”
Section: Introductionmentioning
confidence: 99%
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