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dc.contributor.authorAlcazar, Juan Gerardo
dc.contributor.authorDahl, Heidi Elisabeth Iuell
dc.contributor.authorMuntingh, Agnar Georg Peder
dc.date.accessioned2018-01-10T07:41:34Z
dc.date.available2018-01-10T07:41:34Z
dc.date.created2018-01-03T13:58:34Z
dc.date.issued2017
dc.identifier.citationComputer Aided Geometric Design. 2017, 59 68-85.nb_NO
dc.identifier.issn0167-8396
dc.identifier.urihttp://hdl.handle.net/11250/2476556
dc.description.abstractWe develop a characterization for the existence of symmetries of canal surfaces defined by a rational spine curve and rational radius function. In turn, this characterization inspires an algorithm for computing the symmetries of such canal surfaces. For Dupin cyclides in canonical form, we apply the characterization to derive an intrinsic description of their symmetries and symmetry groups, which gives rise to a method for computing the symmetries of a Dupin cyclide not necessarily in canonical form. As a final application, we discuss the construction of patches and blends of rational canal surfaces with a prescribed symmetry.nb_NO
dc.language.isoengnb_NO
dc.relation.urihttps://www.researchgate.net/publication/310611126_Symmetries_of_Canal_Surfaces_and_Dupin_Cyclides
dc.titleSymmetries of canal surfaces and Dupin cyclidesnb_NO
dc.typeJournal articlenb_NO
dc.typePeer reviewednb_NO
dc.description.versionacceptedVersionnb_NO
dc.source.pagenumber68-85nb_NO
dc.source.volume59nb_NO
dc.source.journalComputer Aided Geometric Designnb_NO
dc.identifier.doi10.1016/j.cagd.2017.10.001
dc.identifier.cristin1534924
cristin.unitcode7401,90,11,0
cristin.unitnameAnvendt matematikk
cristin.ispublishedtrue
cristin.fulltextpostprint
cristin.qualitycode2


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