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dc.date.accessioned2013-03-12T08:18:08Z
dc.date.available2013-03-12T08:18:08Z
dc.date.issued2003en_US
dc.date.submitted2009-12-17en_US
dc.identifier.urihttp://hdl.handle.net/10852/10659
dc.description.abstractA variant of Murat and Tartar's div-curl lemma is stated and proved for Nédélec's edge elements. For sequences of vector fields in sequences of such finite element spaces the hypothesis on the divergence can be put into a somewhat weaker form well-suited for the analysis of some numerical schemes. The proof uses a uniform norm equivalence related to discrete compactness properties of vector FE spaces and a super-approximation property of scalar FE spaces.eng
dc.language.isoengen_US
dc.publisherMatematisk Institutt, Universitetet i Oslo
dc.relation.ispartofPreprint series. Pure mathematics http://urn.nb.no/URN:NBN:no-8076en_US
dc.relation.urihttp://urn.nb.no/URN:NBN:no-8076
dc.rights© The Author(s) (2003). This material is protected by copyright law. Without explicit authorisation, reproduction is only allowed in so far as it is permitted by law or by agreement with a collecting society.
dc.titleDiv-Curl lemma for Edge Elementsen_US
dc.typeResearch reporten_US
dc.date.updated2009-12-17en_US
dc.rights.holderCopyright 2003 The Author(s)
dc.creator.authorChristiansen, Snorre H.en_US
dc.subject.nsiVDP::410en_US
dc.identifier.urnURN:NBN:no-23774en_US
dc.type.documentForskningsrapporten_US
dc.identifier.duo97981en_US
dc.identifier.fulltextFulltext https://www.duo.uio.no/bitstream/handle/10852/10659/1/pm30-03.pdf


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