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dc.contributor.authorFinster, Myriam*
dc.date.accessioned2021-02-12T07:24:46Z
dc.date.available2021-02-12T07:24:46Z
dc.date.issued2013*
dc.date.submitted2019-07-30 20:01:59*
dc.identifier34872*
dc.identifier.urihttps://directory.doabooks.org/handle/20.500.12854/61886
dc.description.abstractA translation surface is obtained by taking plane polygons and gluing their edges by translations. We ask which subgroups of the Veech group of a primitive translation surface can be realised via a translation covering. For many primitive surfaces we prove that partition stabilising congruence subgroups are the Veech group of a covering surface. We also address the coverings via their monodromy groups and present examples of cyclic coverings in short orbits, i.e. with large Veech groups.*
dc.languageEnglish*
dc.subjectQA1-939*
dc.subject.classificationbic Book Industry Communication::P Mathematics & scienceen_US
dc.subject.othercyclic covering*
dc.subject.othermonodromy group*
dc.subject.otherKongruenzgruppe*
dc.subject.otherzyklische Überlagerung*
dc.subject.otherTranslationsüberlagerung*
dc.subject.othertranslation coveringVeechgruppe*
dc.subject.othercongruence subgroup*
dc.subject.otherMonodromiegruppe*
dc.subject.otherVeech group*
dc.titleVeech Groups and Translation Coverings*
dc.typebook
oapen.identifier.doi10.5445/KSP/1000038927*
oapen.relation.isPublishedBy68fffc18-8f7b-44fa-ac7e-0b7d7d979bd2*
oapen.relation.isbn9783731501800*
oapen.pagesX, 136 p.*
peerreview.review.typeFull text
peerreview.anonymityAll identities known
peerreview.reviewer.typeInternal editor
peerreview.reviewer.typeExternal peer reviewer
peerreview.review.stagePre-publication
peerreview.open.reviewNo
peerreview.publish.responsibilityScientific or Editorial Board
peerreview.id8ad5c235-9810-49eb-b358-27c8675324d9
peerreview.titleDissertations (Dissertationen)


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