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dc.date.accessioned2020-07-08T14:22:08Z
dc.date.available2020-07-08T14:22:08Z
dc.date.issued2020
dc.identifierdoi:10.17170/kobra-202007081428
dc.identifier.urihttp://hdl.handle.net/123456789/11635
dc.language.isoengeng
dc.subjectDrinfeld moduleseng
dc.subjectiosgeny classeseng
dc.subjectisomorphism classeseng
dc.subjectendomorphism ringseng
dc.subject.ddc510
dc.titleExplicit Description Of Isogeny And Isomorphism Classes Of Drinfeld Modules Of Higher Rank Over Finite Fieldseng
dc.typeDissertation
dcterms.abstractWhen jumping from the number fields theory to the function fields theory, one cannot miss the deep analogy between rank 1 Drinfeld modules and the group of root of unity and the analogy between rank 2 Drinfeld modules and elliptic curves. But so far, there is no known structure in number fields theory that is analogous to the Drinfeld modules of higher rank r ≥ 3. In this thesis we investigate the classes of those Drinfeld modules of higher rank r ≥ 3 defined over a finite field L. We describe explicitly the Weil polynomials defining the isogeny classes of rank r Drinfeld modules defined over a finite field L for any rank r ≥ 3, which generalizes what Yu already did for r = 2. We also provide a necessary and sufficient condition for an order O in the endomorphism algebra corresponding to some isogeny classes, to be the endomorphism ring of a Drinfeld module. To complete the classification, we define the notion of fine isomorphy invariants for any rank r Drinfeld module defined over a finite field L and we prove that the fine isomorphy invariants together with the J-invariants describe the L-isomorphism classes of rank r Drinfeld modules defined over the finite field L.eng
dcterms.accessRightsopen access
dcterms.creatorNkotto Nkung Assong, Sedric
dcterms.dateAccepted2020-07-01
dcterms.extentvii, 107 Seiten
dc.contributor.corporatenameKassel, Universität Kassel, Fachbereich Mathematik und Naturwissenschaften, Institut für Mathematik
dc.contributor.refereeRück, Hans Georg (Prof. Dr.)
dc.subject.swdDrinfeld-Modulger
dc.subject.swdIsogenieger
dc.subject.swdEndomorphismusger
dc.type.versionpublishedVersion
kup.iskupfalse


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