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Existence of weak solutions to a class of non-Newtonian flows

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dc.contributor.authorChoe, Hi Junko
dc.date.accessioned2013-02-27T23:41:07Z-
dc.date.available2013-02-27T23:41:07Z-
dc.date.created2012-02-06-
dc.date.created2012-02-06-
dc.date.issued2000-
dc.identifier.citationHOUSTON JOURNAL OF MATHEMATICS, v.26, no.2, pp.387 - 408-
dc.identifier.issn0362-1588-
dc.identifier.urihttp://hdl.handle.net/10203/71532-
dc.description.abstractWe show that there exist weak solutions to a class of non-Newtonian flows for the periodic domain. Galerkin approximation, an W-1,W-r+2 compactness theorem, and Kern type inequalities are main ingredients for the proof of the existence of weak solutions. Moreover, we estimate the Hausdorff dimension of the set of singular times for the weak solutions.-
dc.languageEnglish-
dc.publisherUNIV HOUSTON-
dc.titleExistence of weak solutions to a class of non-Newtonian flows-
dc.typeArticle-
dc.identifier.wosid000089485800012-
dc.identifier.scopusid2-s2.0-0040182712-
dc.type.rimsART-
dc.citation.volume26-
dc.citation.issue2-
dc.citation.beginningpage387-
dc.citation.endingpage408-
dc.citation.publicationnameHOUSTON JOURNAL OF MATHEMATICS-
dc.contributor.localauthorChoe, Hi Jun-
dc.type.journalArticleArticle-
dc.subject.keywordAuthornon-Newtonian flow-
dc.subject.keywordAuthorweak solution-
dc.subject.keywordAuthorHausdorff dimension-
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