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dc.contributor.authorTenti, Andrea
dc.date.accessioned2016-08-17T15:59:23Z
dc.date.available2016-08-17T15:59:23Z
dc.date.issued2016-05-27
dc.date.submitted2016-05-27eng
dc.identifier.urihttp://hdl.handle.net/1956/12630
dc.description.abstractThe purpose of this thesis is to study the higher Hochschild homology of some rational algebras. We know that for some algebras the higher Hochschild homology is a stable invariant. Studying the homology over the spheres and over the torus, we can deduce that this is not true in the most general sense. We will give a counterexample based on the algebra of the dual numbers over a field of characteristic 0. Moreover we will study the equivariant structure of the iterated Hochschild homology for some particular algebras as a toy model, in order to shed some lights on the limits of the topological version of the Hochschild homology, which plays a key role in the understanding of the chromatic shift of K- theory.eng
dc.format.extent567614 byteseng
dc.format.mimetypeapplication/pdfeng
dc.language.isoengeng
dc.publisherThe University of Bergeneng
dc.titleHigher Hochschild homology is not a stable invarianteng
dc.typeMaster thesiseng
dc.type.degreeMastereng
dc.type.courseMAT399eng
dc.subject.archivecodeMastergradeng
dc.subject.nus753199eng
dc.type.programMAMN-MATeng
dc.rights.holderCopyright the Author. All rights reservedeng
bora.peerreviewedNot peer reviewedeng


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