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Universals as Generalized Sets

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dc.contributor.authorDaynes, Keith
dc.date.accessioned2008-07-29T02:27:47Z
dc.date.accessioned2022-10-13T01:32:48Z
dc.date.available2008-07-29T02:27:47Z
dc.date.available2022-10-13T01:32:48Z
dc.date.copyright1985
dc.date.issued1985
dc.description.abstractThis work is an attenpt to solve the problem of finding a natural generalization of set theory. The kind of generalization we would like to have is illustrated in the way that set theory generalizes number theory. Not only are the natural nuribers identified with certain sets, but the totality of alL natural numbers is itself identified with some object in the universe of sets. The existence of the set ur of aII natural numbers is postulated in the axiom of infinity of ZFC. So, we would like a theory of some domain of "generalized sets" such that each set can be identified with some object in this domain, and such that the totality of all sets can be construed as some particular generalized set.en_NZ
dc.formatpdfen_NZ
dc.identifier.urihttps://ir.wgtn.ac.nz/handle/123456789/21937
dc.languageen_NZ
dc.language.isoen_NZ
dc.publisherTe Herenga Waka—Victoria University of Wellingtonen_NZ
dc.rights.holderAll rights, except those explicitly waived, are held by the Authoren_NZ
dc.rights.licenseAuthor Retains Copyrighten_NZ
dc.rights.urihttps://www.wgtn.ac.nz/library/about-us/policies-and-strategies/copyright-for-the-researcharchive
dc.subjectSet theoryen_NZ
dc.subjectLogic, symbolic and methematicalen_NZ
dc.titleUniversals as Generalized Setsen_NZ
dc.typeTexten_NZ
thesis.degree.disciplineMathematicsen_NZ
thesis.degree.grantorTe Herenga Waka—Victoria University of Wellingtonen_NZ
thesis.degree.levelDoctoralen_NZ
thesis.degree.nameDoctor of Philosophyen_NZ
vuwschema.type.vuwAwarded Doctoral Thesisen_NZ

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