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dc.rights.licenseCC-BY-NC-ND
dc.contributor.advisorHeuts, Gijs
dc.contributor.authorRietmole, Erik te
dc.date.accessioned2021-11-25T00:00:16Z
dc.date.available2021-11-25T00:00:16Z
dc.date.issued2021
dc.identifier.urihttps://studenttheses.uu.nl/handle/20.500.12932/241
dc.description.sponsorshipUtrecht University
dc.language.isoEN
dc.subjectEquipping a category with a model structure, or with the structure of a category of fibrant objects, allows one to perform homotopy theoretic arguments in the given category. In this thesis the classical Kan-Quillen model structure on simplicial sets is generalized to (pre-)sheaves of simplicial sets on a site, following the work of Jardine. This structure has an important application, for it can used to describe sheaf cohomology in homotopy theoretic terms
dc.titleHomotopy Theory of Presheaves
dc.type.contentMaster Thesis
dc.rights.accessrightsOpen Access
dc.subject.keywordshomotopy theory; model categories; simplicial presheaves; sheaf cohomology
dc.subject.courseuuMathematical Sciences
dc.thesis.id1024


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