dc.contributor.advisor | Meyer, Ralf Prof. Dr. | |
dc.contributor.author | Grande, Vincent | |
dc.date.accessioned | 2018-11-13T14:11:31Z | |
dc.date.available | 2018-11-13T14:11:31Z | |
dc.date.issued | 2018-11-13 | |
dc.identifier.uri | http://hdl.handle.net/11858/00-1735-0000-002E-E4FD-D | |
dc.identifier.uri | http://dx.doi.org/10.53846/goediss-7128 | |
dc.language.iso | deu | de |
dc.rights.uri | http://creativecommons.org/licenses/by-nc-nd/4.0/ | |
dc.subject.ddc | 510 | de |
dc.title | Exakte Moduln über dem von Manuel Köhler beschriebenen Ring | de |
dc.type | masterThesis | de |
dc.title.translated | Exact modules over Manuel Köhler's ring | de |
dc.contributor.referee | Meyer, Ralf Prof. Dr. | |
dc.date.examination | 2018-09-12 | |
dc.description.abstracteng | When 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.coReferee | Mihailescu, Preda Prof. Dr. | |
dc.subject.ger | KK-Theorie | de |
dc.subject.ger | Zyklotomische Körper | de |
dc.subject.ger | p-adische Zahlen | de |
dc.subject.ger | Kommutative Algebra | de |
dc.subject.eng | KK-Theory | de |
dc.subject.eng | Cyclotomic fields | de |
dc.subject.eng | p-adic integers | de |
dc.subject.eng | commutative algebra | de |
dc.identifier.urn | urn:nbn:de:gbv:7-11858/00-1735-0000-002E-E4FD-D-7 | |
dc.affiliation.institute | Fakultät für Mathematik und Informatik | de |
dc.subject.gokfull | Mathematik (PPN61756535X) | de |
dc.identifier.ppn | 1040479510 | |