Minimax Principles for critical-point Theory in Applications to Quasilinear Boundary-value Problems

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dc.contributor.authorEl Amrouss, A. R.
dc.contributor.authorMoussaoui, M.
dc.date.accessioned2019-12-11T14:08:36Z
dc.date.available2019-12-11T14:08:36Z
dc.date.issued2000-03-08
dc.description.abstractUsing the variational method developed by the same author in [7], we establish the existence of solutions to the equation -∆pu = ƒ(x, u) with Dirichlet boundary conditions. Here ∆p denotes the p-Laplacian and ʃs0 ƒ(x, t) dt is assumed to lie between the first two eigenvalues of the p-Laplacian.
dc.description.departmentMathematics
dc.formatText
dc.format.extent9 pages
dc.format.medium1 file (.pdf)
dc.identifier.citationEl Amrouss, A. R., & Moussaoui, M. (2000). Minimax principles for critical-point theory in applications to quasilinear boundary-value problems. <i>Electronic Journal of Differential Equations, 2000</i>(18), pp. 1-9.
dc.identifier.issn1072-6691
dc.identifier.urihttps://hdl.handle.net/10877/9045
dc.language.isoen
dc.publisherSouthwest Texas State University, Department of Mathematics
dc.rightsAttribution 4.0 International
dc.rights.urihttps://creativecommons.org/licenses/by/4.0/
dc.sourceElectronic Journal of Differential Equations, 2000, San Marcos, Texas: Southwest Texas State University and University of North Texas.
dc.subjectMinimax methods
dc.subjectp-Laplacian
dc.subjectResonance
dc.titleMinimax Principles for critical-point Theory in Applications to Quasilinear Boundary-value Problems
dc.typeArticle

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