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Exakte Moduln über dem von Manuel Köhler beschriebenen Ring

dc.contributor.advisorMeyer, Ralf Prof. Dr.
dc.contributor.authorGrande, Vincent
dc.date.accessioned2018-11-13T14:11:31Z
dc.date.available2018-11-13T14:11:31Z
dc.date.issued2018-11-13
dc.identifier.urihttp://hdl.handle.net/11858/00-1735-0000-002E-E4FD-D
dc.identifier.urihttp://dx.doi.org/10.53846/goediss-7128
dc.language.isodeude
dc.rights.urihttp://creativecommons.org/licenses/by-nc-nd/4.0/
dc.subject.ddc510de
dc.titleExakte Moduln über dem von Manuel Köhler beschriebenen Ringde
dc.typemasterThesisde
dc.title.translatedExact modules over Manuel Köhler's ringde
dc.contributor.refereeMeyer, Ralf Prof. Dr.
dc.date.examination2018-09-12
dc.description.abstractengWhen proving an equivariant universal coefficient theorem for C*-Algebras acted on by a finite cyclic group Z/pZ, Manuel Köhler introduces the endomorphism ring R of the tuple (C,C(G),D). The aim of this thesis is to show a structure theorem and provide examples for a certain simple class of R-modules closely related to Cuntz-algebras by fixing the first of three components of the module to be 0, Z or Z/a. While we get a nice structure theorem for the case (a,p)=1, more complicated things happen in the case a=p. The resulting modules will turn out to have a close relation to the p-adic numbers.de
dc.contributor.coRefereeMihailescu, Preda Prof. Dr.
dc.subject.gerKK-Theoriede
dc.subject.gerZyklotomische Körperde
dc.subject.gerp-adische Zahlende
dc.subject.gerKommutative Algebrade
dc.subject.engKK-Theoryde
dc.subject.engCyclotomic fieldsde
dc.subject.engp-adic integersde
dc.subject.engcommutative algebrade
dc.identifier.urnurn:nbn:de:gbv:7-11858/00-1735-0000-002E-E4FD-D-7
dc.affiliation.instituteFakultät für Mathematik und Informatikde
dc.subject.gokfullMathematik (PPN61756535X)de
dc.identifier.ppn1040479510


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