Existence of infinitely many solutions for the \((p, q)\)-Laplace equation (Q503123)
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scientific article; zbMATH DE number 6673677
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Existence of infinitely many solutions for the \((p, q)\)-Laplace equation |
scientific article; zbMATH DE number 6673677 |
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Existence of infinitely many solutions for the \((p, q)\)-Laplace equation (English)
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11 January 2017
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In this paper, the authors consider the \((p,q)\)-Laplace equation \[ - \Delta_p u - \Delta_q u = f(x,u) \] in a bounded domain under the Dirichlet boundary condition. By extending variational methods they give a sufficient condition of the nonlinear term for the existence of a sequence of solutions converging to zero or diverging to infinity. Moreover, also a priori estimates of the \(C^1\)-norms of solutions under a suitable condition on the nonlinear term are given.
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\((p, q)\)-Laplace equation
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superlinear
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sublinear
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infinitely many solutions
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a priori estimate
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variational method
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0.9527628
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