On the problem of optimal reconstruction

dc.creatorKushpel, A
dc.creatorTozoni, S
dc.date2007
dc.date2014-11-13T23:16:04Z
dc.date2015-11-26T16:03:14Z
dc.date2014-11-13T23:16:04Z
dc.date2015-11-26T16:03:14Z
dc.date.accessioned2018-03-28T22:52:31Z
dc.date.available2018-03-28T22:52:31Z
dc.identifierJournal Of Fourier Analysis And Applications. Birkhauser Boston Inc, v. 13, n. 4, n. 459, n. 475, 2007.
dc.identifier1069-5869
dc.identifierWOS:000248920200008
dc.identifier10.1007/s00041-006-6902-3
dc.identifierhttp://www.repositorio.unicamp.br/jspui/handle/REPOSIP/68758
dc.identifierhttp://www.repositorio.unicamp.br/handle/REPOSIP/68758
dc.identifierhttp://repositorio.unicamp.br/jspui/handle/REPOSIP/68758
dc.identifier.urihttp://repositorioslatinoamericanos.uchile.cl/handle/2250/1265229
dc.descriptionWe find lower bounds for linear and Alexandrov's cowidths of Sobolev's classes on Compact Riemannian homogeneous manifolds M-d. Using these results we give an explicit solution of the problem of optimal reconstruction of functions from Sobolev's classes W-p(y) (M-d) in L-q (M-d), 1 <= q <= p <= infinity.
dc.description13
dc.description4
dc.descriptionSI
dc.description459
dc.description475
dc.languageen
dc.publisherBirkhauser Boston Inc
dc.publisherCambridge
dc.publisherEUA
dc.relationJournal Of Fourier Analysis And Applications
dc.relationJ. Fourier Anal. Appl.
dc.rightsfechado
dc.sourceWeb of Science
dc.subjecthomogeneous space
dc.subjectsphere
dc.subjectreconstruction
dc.subjectdata points
dc.subjectpolynomial
dc.subjectspline
dc.subjectSpaces
dc.subjectInterpolation
dc.subjectApproximation
dc.subjectSphere
dc.titleOn the problem of optimal reconstruction
dc.typeArtículos de revistas


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