An extremal property of the inf- and sup- convolutions regarding the Strong Maximum Principle

dc.contributor.authorGoncharov, Vladimir V.
dc.contributor.authorSantos, Telma J.
dc.contributor.editorBurenkov, V.I.
dc.contributor.editorGoldman, M.L.
dc.contributor.editorLaneev, E.B.
dc.contributor.editorStepanov, V.D.
dc.date.accessioned2013-09-23T14:10:44Z
dc.date.available2013-09-23T14:10:44Z
dc.date.issued2012
dc.description.abstractIn this paper we continue investigations started in the paper "Local estimates for minimizers of some convex integral functional of the gradient and the Strong Maximum Principle" concerning the extension of the variational Strong Maximum Principle for lagrangeans depending on the gradient through a Minkowski gauge. We essentially enlarge the class of comparison functions, which substitute the identical zero when the lagrangean is not longer strictly convex at the origin.por
dc.identifier.authoremailgoncha@uevora.pt
dc.identifier.authoremailtjfs@uevora.pt
dc.identifier.citationGoncharov, Vladimir V.; Santos, Telma J.; An extremal property of the inf- and sup- convolutions regarding the Strong Maximum Principle, Proc. of the 8th Congress of the Intern. Soc. for Analysis, its Appl. and Comp., Vol 2 (2012),185-195por
dc.identifier.scientificarea334por
dc.identifier.urihttp://hdl.handle.net/10174/8777
dc.language.isoengpor
dc.peerreviewednopor
dc.publisherProceedings of the 8th Congress of the International Society for Analysis, its Applications, and Computation (22–27 August 2011) Volume 2por
dc.rightsopenAccesspor
dc.subjectstrong maximum principlepor
dc.subjectconvex variational problempor
dc.subjectconvolutionpor
dc.subjectgauge functionpor
dc.titleAn extremal property of the inf- and sup- convolutions regarding the Strong Maximum Principlepor
dc.typearticlepor
degois.publication.locationMoscowpor
degois.publication.titleProceedings of the 8th Congress of the International Society for Analysis, its Applications, and Computationpor
degois.publication.volume2por

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