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A posteriori error estimates for elliptic problems with Dirac measure terms in weighted spaces

dc.contributor.authorAgnelli, Juan Pablo
dc.contributor.authorGarau, Eduardo Mario
dc.contributor.authorMorin, Pedro
dc.date.accessioned2021-10-15T17:25:36Z
dc.date.available2021-10-15T17:25:36Z
dc.date.issued2014
dc.identifier.citationAgnelli, J. P., Garau, E. M. y Morin, P. (2014). A posteriori error estimates for elliptic problems with Dirac measure terms in weighted spaces. ESAIM: Mathematical Modelling and Numerical Analysis, 48 (6), 1557-1581. https://doi.org/10.1051/m2an/2014010es
dc.identifier.urihttp://hdl.handle.net/11086/20821
dc.identifier.urihttps://doi.org/10.1051/m2an/2014010
dc.description.abstractIn this article we develop a posteriori error estimates for second order linear elliptic problems with point sources in two- and three-dimensional domains. We prove a global upper bound and a local lower bound for the error measured in a weighted Sobolev space. The weight considered is a (positive) power of the distance to the support of the Dirac delta source term, and belongs to the Muckenhoupt’s class A2. The theory hinges on local approximation properties of either Clément or Scott–Zhang interpolation operators, without need of modifications, and makes use of weighted estimates for fractional integrals and maximal functions. Numerical experiments with an adaptive algorithm yield optimal meshes and very good effectivity indices.en
dc.format.mediumImpreso; Electrónico y/o Digital
dc.language.isoenges
dc.rightsAttribution-NonCommercial-NoDerivatives 4.0 International*
dc.rights.urihttp://creativecommons.org/licenses/by-nc-nd/4.0/*
dc.sourceISSN 0764-583X
dc.subjectElliptic problemsen
dc.subjectPoint sourcesen
dc.subjectA posteriori error estimatesen
dc.subjectFinite elementsen
dc.subjectWeighted Sobolev spacesen
dc.titleA posteriori error estimates for elliptic problems with Dirac measure terms in weighted spacesen
dc.typearticlees
dc.description.versionpublishedVersiones
dc.description.filFil: Agnelli, Juan Pablo. Consejo Nacional de Investigaciones Científicas y Técnicas. Instituto de Matemática Aplicada del Litoral; Argentina.es
dc.description.filFil: Agnelli, Juan Pablo. Universidad Nacional del Litoral. Instituto de Matemática Aplicada del Litoral; Argentina.es
dc.description.filFil: Agnelli, Juan Pablo. Universidad Nacional de Córdoba. Facultad de Matemática, Astronomía y Física; Argentina.es
dc.description.filFil: Garau, Eduardo Mario. Consejo Nacional de Investigaciones Científicas y Técnicas. Instituto de Matemática Aplicada del Litoral; Argentina.es
dc.description.filFil: Garau, Eduardo Mario. Universidad Nacional del Litoral. Instituto de Matemática Aplicada del Litoral; Argentina.es
dc.description.filFil: Garau, Eduardo Mario. Universidad Nacional del Litoral. Facultad de Ingeniería Química. Departamento de Matemática; Argentina.es
dc.description.filFil: Morin, Pedro. Consejo Nacional de Investigaciones Científicas y Técnicas. Instituto de Matemática Aplicada del Litoral; Argentina.es
dc.description.filFil: Morin, Pedro. Universidad Nacional del Litoral. Instituto de Matemática Aplicada del Litoral; Argentina.es
dc.description.filFil: Morin, Pedro. Universidad Nacional del Litoral. Facultad de Ingeniería Química. Departamento de Matemática; Argentina.es
dc.journal.cityParíses
dc.journal.countryFranciaes
dc.journal.editorialEDP Sciencesen
dc.journal.number6es
dc.journal.pagination1557-1581es
dc.journal.referatoCon referato
dc.journal.titleESAIM: Mathematical Modelling and Numerical Analysisen
dc.journal.volume48es
dc.description.fieldMatemática Aplicada


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