POINTWISE CONSTRAINED RADIALLY INCREASING MINIMIZERS IN THE QUASI-SCALAR CALCULUS OF VARIATIONS

dc.contributor.authorBicho, Luis
dc.contributor.authorOrnelas, António
dc.contributor.editorZuazua, Enrique
dc.date.accessioned2014-01-22T15:02:34Z
dc.date.available2014-01-22T15:02:34Z
dc.date.issued2013-12-10
dc.description.abstractWe prove uniform continuity of radially symmetric vector minimizers uA(x) = UA ( jxj ) to multiple integrals R BR L ( u(x); jDu(x) j ) d x on a ball BR Rd, among the Sobolev functions u( ) in A + W 1;1 0 (BR; Rm ), using a jointly convex lsc L : Rm R ! [0;1] with L ( S; ) even and superlinear. Besides such basic hypotheses, L ( ; ) is assumed to satisfy also a geometrical constraint, which we call quasi 􀀀 scalar ; the simplest example being the biradial case L ( j u(x) j ; jDu(x) j ). Complete liberty is given for L ( S; ) to take the 1 value, so that our minimization problem implicitly also represents e.g. distributed 􀀀 parameter optimal control problems, on constrained domains, under PDEs or inclusions in explicit or implicit form. While generic radial functions u(x) = U ( jxj ) in this Sobolev space oscillate wildly as jxj ! 0, our minimiz- ing profile􀀀curve UA( ) is, in contrast, absolutely continuous and tame, in the sense that its \static level" L (UA(r); 0 ) always increases with r, a original feature of our result.por
dc.identifier.authoremaillmbb@uevora.pt
dc.identifier.authoremailantonioornelas@icloud.com
dc.identifier.doi10.1051/cocv/2013058
dc.identifier.issn1292-8119
dc.identifier.revistaESAIM: COCV
dc.identifier.scientificarea334por
dc.identifier.urihttp://hdl.handle.net/10174/9883
dc.language.isoengpor
dc.peerreviewedyespor
dc.publisherESAIM: COCVpor
dc.rightsrestrictedAccesspor
dc.subjectvectorial calculus of variationspor
dc.subjectvectorial distributed-parameter optimal controlpor
dc.subjectcontinuous radially symmetric monotone minimizerspor
dc.titlePOINTWISE CONSTRAINED RADIALLY INCREASING MINIMIZERS IN THE QUASI-SCALAR CALCULUS OF VARIATIONSpor
dc.typearticlepor
degois.publication.firstPage1por
degois.publication.issue2013por
degois.publication.lastPage17por
degois.publication.locationCambridge University Presspor
degois.publication.titleESAIM: COCVpor

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