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Schauder type estimates for degenerate or singular elliptic equations with DMO coefficients

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dc.contributor.authorDong, Hongjie-
dc.contributor.authorJeon, Seongmin-
dc.contributor.authorVita, Stefano-
dc.date.accessioned2024-11-28T19:01:21Z-
dc.date.available2024-11-28T19:01:21Z-
dc.date.issued2024-12-
dc.identifier.issn0944-2669-
dc.identifier.issn1432-0835-
dc.identifier.urihttps://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/198156-
dc.description.abstractIn this paper, we study degenerate or singular elliptic equations in divergence form - div ( x (n) (alpha )A D u ) = div ( x (n) (alpha) g ) in B- 1 boolean AND { x( n) > 0} . When alpha > -1, we establish boundary Schauder type estimates under the conormal boundary condition on the flat boundary, provided that the coefficients satisfy Dini mean oscillation (DMO) type conditions. Additionally, as an application, we derive higher-order boundary Harnack principles for uniformly elliptic equations in divergence form with DMO coefficients.-
dc.description.abstractIn this paper, we study degenerate or singular elliptic equations in divergence form − div(xαn A∇u) = div(xαn g) in B1 ∩ {xn > 0}. When α > −1, we establish boundary Schauder type estimates under the conormal boundary condition on the flat boundary, provided that the coefficients satisfy Dini mean oscillation (DMO) type conditions. Additionally, as an application, we derive higher-order boundary Harnack principles for uniformly elliptic equations in divergence form with DMO coefficients.-
dc.format.extent42-
dc.language영어-
dc.language.isoENG-
dc.publisherSpringer Verlag-
dc.titleSchauder type estimates for degenerate or singular elliptic equations with DMO coefficients-
dc.typeArticle-
dc.publisher.location독일-
dc.identifier.doi10.1007/s00526-024-02840-3-
dc.identifier.scopusid2-s2.0-85209107887-
dc.identifier.wosid001352392300004-
dc.identifier.bibliographicCitationCalculus of Variations and Partial Differential Equations, v.63, no.9, pp 1 - 42-
dc.citation.titleCalculus of Variations and Partial Differential Equations-
dc.citation.volume63-
dc.citation.number9-
dc.citation.startPage1-
dc.citation.endPage42-
dc.type.docTypeArticle-
dc.description.isOpenAccessN-
dc.description.journalRegisteredClassscie-
dc.description.journalRegisteredClassscopus-
dc.relation.journalResearchAreaMathematics-
dc.relation.journalWebOfScienceCategoryMathematics, Applied-
dc.relation.journalWebOfScienceCategoryMathematics-
dc.subject.keywordPlusDIVERGENCE FORM-
dc.subject.keywordPlusC-1-
dc.subject.keywordPlusREGULARITY-
dc.subject.keywordPlusSYSTEMS-
dc.subject.keywordPlusRATIOS-
dc.subject.keywordAuthor35B45-
dc.subject.keywordAuthor35B65-
dc.subject.keywordAuthor35J70-
dc.subject.keywordAuthor35J75-
dc.identifier.urlhttps://link.springer.com/article/10.1007/s00526-024-02840-3-
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