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dc.contributor.advisorTholen, Walter
dc.creatorSozubek, Serdar
dc.date.accessioned2016-09-13T13:15:21Z
dc.date.available2016-09-13T13:15:21Z
dc.date.copyright2013-06
dc.identifier.urihttp://hdl.handle.net/10315/32010
dc.description.abstractLawvere's notion of completeness for quantale-enriched categories has been extended to the theory of lax algebras under the name of L-completeness. In this work we introduce the corresponding morphism concept and examine its properties. We explore some important relativized topological concepts like separation, density, compactness and compactification with respect to L-complete morphisms. We show that separated L-complete morphisms belong to a factorization system. Moreover, we investigate relativized topological concepts with respect to maps that preserve L-closure which is the natural symmetrized closure for lax algebras. We provide concrete characterizations of Zariski closure and Zariski compactness for approach spaces.
dc.rightsAuthor owns copyright, except where explicitly noted. Please contact the author directly with licensing requests.
dc.titleA topological theory of (T,V)-categories
dc.typeElectronic Thesis or Dissertation
dc.degree.disciplineMathematics & Statistics
dc.degree.namePhD - Doctor of Philosophy
dc.degree.levelDoctoral
dc.subject.keywordsL-completeness
dc.subject.keywordsL-complete morphisms
dc.subject.keywordsLax algebras
dc.subject.keywordsTopological concepts


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