On minima of a functional of the gradient: upper and lower solutions

dc.contributor.authorGoncharov, Vladimir
dc.contributor.authorOrnelas, António
dc.date.accessioned2011-02-10T10:00:50Z
dc.date.available2011-02-10T10:00:50Z
dc.date.issued2006
dc.description.abstractThis paper studies a scalar minimization problem with an integral functional of the gradient under affine boundary conditions. A new approach is proposed using a minimal and a maximal solution to the convexified problem. We prove a density result: any relaxed solution continuously depending on boundary data may be approximated uniformly by solutions of the nonconvex problem keeping continuity relative to data. We also consider solutions to the nonconvex problem having Lipschitz dependence on boundary data with the best Lipschitz constant.en
dc.format.extent249292 bytes
dc.format.mimetypeapplication/pdf
dc.identifier.accesstypelivreen
dc.identifier.authoremailgoncha@uevora.pt
dc.identifier.authoremailornelas@uevora.pt
dc.identifier.pagina1437-1459en
dc.identifier.revistaNonlinear Analysisen
dc.identifier.scientificarea334en
dc.identifier.urihttp://hdl.handle.net/10174/2548
dc.identifier.volume64en
dc.language.isoeng
dc.peerreviewedyesen
dc.publisherElsevier Ltd.en
dc.rightsopenAccessen
dc.subjectscalar variational problemen
dc.subjectnonconvex lagrangianen
dc.subjectBaire category theoremen
dc.subjectcontinuous selectionen
dc.subjectrelaxationen
dc.titleOn minima of a functional of the gradient: upper and lower solutionsen
dc.typearticleen

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