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Boundary modulus of continuity and quasiconformal mappings

dc.creatorArsenović, Miloš
dc.creatorTodorčević, Vesna
dc.creatorNakki, Raimo
dc.date.accessioned2023-05-12T10:31:30Z
dc.date.available2023-05-12T10:31:30Z
dc.date.issued2012
dc.identifier.issn1239-629X
dc.identifier.urihttps://rfos.fon.bg.ac.rs/handle/123456789/954
dc.description.abstractLet D be a bounded domain in R-n, n >= 2, and let f be a continuous mapping of (D) over bar into R-n which is quasiconformal in D. Suppose that vertical bar f(x) - f(y)vertical bar LT = omega(vertical bar x-y vertical bar) for all x and y in partial derivative D, where omega is a non-negative non-decreasing function satisfying omega(2t) LT = 2w(t) for t >= 0. We prove, with an additional growth condition on omega, that vertical bar f(x) - f(y)vertical bar LT = C max{omega(vertical bar x - y vertical bar), vertical bar x - y vertical bar(alpha)} for all x, y is an element of D, where alpha = K-1(f)(1/(1-n)).en
dc.publisherSuomalainen Tiedeakatemia, Helsinki
dc.relationinfo:eu-repo/grantAgreement/MESTD/Basic Research (BR or ON)/174017/RS//
dc.relationinfo:eu-repo/grantAgreement/MESTD/Basic Research (BR or ON)/174024/RS//
dc.rightsopenAccess
dc.sourceAnnales Academiae Scientiarum Fennicae-Mathematica
dc.subjectQuasiconformal mappingen
dc.subjectmodulus of continuityen
dc.titleBoundary modulus of continuity and quasiconformal mappingsen
dc.typearticle
dc.rights.licenseARR
dc.citation.epage118
dc.citation.issue1
dc.citation.other37(1): 107-118
dc.citation.rankM22
dc.citation.spage107
dc.citation.volume37
dc.identifier.doi10.5186/aasfm.2012.3718
dc.identifier.fulltexthttp://prototype2.rcub.bg.ac.rs/bitstream/id/1242/950.pdf
dc.identifier.rcubconv_1380
dc.identifier.scopus2-s2.0-84858711416
dc.identifier.wos000301012300008
dc.type.versionpublishedVersion


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