Existence, nonexistence and multiplicity results for some beam equations

dc.contributor.authorMinhós, Feliz Manuel
dc.date.accessioned2009-04-07T10:00:16Z
dc.date.available2009-04-07T10:00:16Z
dc.date.issued2007
dc.description.abstractThis paper studies some fourth order nonlinear fully equations with a parameter s ∈ R, with two point boundary conditions. These problems model several phenomena, such as, a cantilevered beam with a linear relation between the curvature and the shear force at both endpoints. For some values of the real constants, it will be presented an Ambrosetti–Prodi type discussion on s. The arguments used apply lower and upper solutions technique, a priori estimations and topological degree theory.en
dc.format.extent488256 bytes
dc.format.mimetypeapplication/pdf
dc.identifier.accesstypelivreen
dc.identifier.authoremailfminhos@uevora.pt
dc.identifier.isbnISBN: 978-3-7643-8481-4en
dc.identifier.locationBasel/Switzerlanden
dc.identifier.numpag245–255en
dc.identifier.scientificarea334en
dc.identifier.sharewithDepartamento de Matemáticaen
dc.identifier.urihttp://hdl.handle.net/10174/1417
dc.identifier.volume75en
dc.language.isoeng
dc.publisherBirkhauser Verlagen
dc.rightsopenAccessen
dc.subjectNagumo-type conditionsen
dc.subjectlower and upper solutionsen
dc.subjectLeray–Schauder degreeen
dc.subjectAmbrosetti–Prodi problemsen
dc.subjectbeam equationen
dc.titleExistence, nonexistence and multiplicity results for some beam equationsen
dc.typebookParten

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