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- Scott–Potter_set_theory abstract "An approach to the foundations of mathematics that is of relatively recent origin, Scott–Potter set theory is a collection of nested axiomatic set theories set out by the philosopher Michael Potter, building on earlier work by the mathematician Dana Scott and the philosopher George Boolos.Potter (1990, 2004) clarified and simplified the approach of Scott (1974), and showed how the resulting axiomatic set theory can do what is expected of such theory, namely grounding the cardinal and ordinal numbers, Peano arithmetic and the other usual number systems, and the theory of relations.".
- Scott–Potter_set_theory wikiPageExternalLink review.cfm?id=2141.
- Scott–Potter_set_theory wikiPageExternalLink 308.
- Scott–Potter_set_theory wikiPageID "6152392".
- Scott–Potter_set_theory wikiPageLength "13732".
- Scott–Potter_set_theory wikiPageOutDegree "109".
- Scott–Potter_set_theory wikiPageRevisionID "705978669".
- Scott–Potter_set_theory wikiPageWikiLink Actual_infinity.
- Scott–Potter_set_theory wikiPageWikiLink Atomic_formula.
- Scott–Potter_set_theory wikiPageWikiLink Axiom_of_choice.
- Scott–Potter_set_theory wikiPageWikiLink Axiom_of_countable_choice.
- Scott–Potter_set_theory wikiPageWikiLink Axiom_of_extensionality.
- Scott–Potter_set_theory wikiPageWikiLink Axiom_of_infinity.
- Scott–Potter_set_theory wikiPageWikiLink Axiom_of_regularity.
- Scott–Potter_set_theory wikiPageWikiLink Axiom_schema.
- Scott–Potter_set_theory wikiPageWikiLink Axiom_schema_of_replacement.
- Scott–Potter_set_theory wikiPageWikiLink Axiom_schema_of_specification.
- Scott–Potter_set_theory wikiPageWikiLink Binary_relation.
- Scott–Potter_set_theory wikiPageWikiLink Burali-Forti_paradox.
- Scott–Potter_set_theory wikiPageWikiLink Cantors_paradox.
- Scott–Potter_set_theory wikiPageWikiLink Cardinal_number.
- Scott–Potter_set_theory wikiPageWikiLink Category:Systems_of_set_theory.
- Scott–Potter_set_theory wikiPageWikiLink Category:Urelements.
- Scott–Potter_set_theory wikiPageWikiLink Category:Wellfoundedness.
- Scott–Potter_set_theory wikiPageWikiLink Class_(set_theory).
- Scott–Potter_set_theory wikiPageWikiLink Consistency.
- Scott–Potter_set_theory wikiPageWikiLink Dana_Scott.
- Scott–Potter_set_theory wikiPageWikiLink Definite_description.
- Scott–Potter_set_theory wikiPageWikiLink Domain_of_a_function.
- Scott–Potter_set_theory wikiPageWikiLink Domain_of_discourse.
- Scott–Potter_set_theory wikiPageWikiLink Empty_set.
- Scott–Potter_set_theory wikiPageWikiLink Equinumerosity.
- Scott–Potter_set_theory wikiPageWikiLink First-order_logic.
- Scott–Potter_set_theory wikiPageWikiLink Foundations_of_mathematics.
- Scott–Potter_set_theory wikiPageWikiLink Free_variables_and_bound_variables.
- Scott–Potter_set_theory wikiPageWikiLink Function_(mathematics).
- Scott–Potter_set_theory wikiPageWikiLink George_Boolos.
- Scott–Potter_set_theory wikiPageWikiLink Hierarchy_(mathematics).
- Scott–Potter_set_theory wikiPageWikiLink Identity_(mathematics).
- Scott–Potter_set_theory wikiPageWikiLink Infinity.
- Scott–Potter_set_theory wikiPageWikiLink Injective_function.
- Scott–Potter_set_theory wikiPageWikiLink Isomorphism.
- Scott–Potter_set_theory wikiPageWikiLink List_of_set_theory_topics.
- Scott–Potter_set_theory wikiPageWikiLink Mathematician.
- Scott–Potter_set_theory wikiPageWikiLink Mathematics.
- Scott–Potter_set_theory wikiPageWikiLink Mereology.
- Scott–Potter_set_theory wikiPageWikiLink Model_theory.
- Scott–Potter_set_theory wikiPageWikiLink Morleys_categoricity_theorem.
- Scott–Potter_set_theory wikiPageWikiLink Morse–Kelley_set_theory.
- Scott–Potter_set_theory wikiPageWikiLink Naive_set_theory.
- Scott–Potter_set_theory wikiPageWikiLink Natural_number.
- Scott–Potter_set_theory wikiPageWikiLink New_Foundations.
- Scott–Potter_set_theory wikiPageWikiLink Number.
- Scott–Potter_set_theory wikiPageWikiLink Ontology.
- Scott–Potter_set_theory wikiPageWikiLink Ordinal_number.
- Scott–Potter_set_theory wikiPageWikiLink Paradox.
- Scott–Potter_set_theory wikiPageWikiLink Peano_axioms.
- Scott–Potter_set_theory wikiPageWikiLink Philosopher.
- Scott–Potter_set_theory wikiPageWikiLink Philosophy_of_mathematics.
- Scott–Potter_set_theory wikiPageWikiLink Range_(mathematics).
- Scott–Potter_set_theory wikiPageWikiLink Richard_Milton_Martin.
- Scott–Potter_set_theory wikiPageWikiLink Russells_paradox.
- Scott–Potter_set_theory wikiPageWikiLink S_(set_theory).
- Scott–Potter_set_theory wikiPageWikiLink Scotts_trick.
- Scott–Potter_set_theory wikiPageWikiLink Set-builder_notation.
- Scott–Potter_set_theory wikiPageWikiLink Set_(mathematics).
- Scott–Potter_set_theory wikiPageWikiLink Set_theory.
- Scott–Potter_set_theory wikiPageWikiLink Successor_function.
- Scott–Potter_set_theory wikiPageWikiLink Transitive_relation.
- Scott–Potter_set_theory wikiPageWikiLink Type_theory.
- Scott–Potter_set_theory wikiPageWikiLink Urelement.
- Scott–Potter_set_theory wikiPageWikiLink Von_Neumann_universe.
- Scott–Potter_set_theory wikiPageWikiLink Von_Neumann–Bernays–Gödel_set_theory.
- Scott–Potter_set_theory wikiPageWikiLink Well-order.
- Scott–Potter_set_theory wikiPageWikiLink Wikt:finite.
- Scott–Potter_set_theory wikiPageWikiLink Willard_Van_Orman_Quine.
- Scott–Potter_set_theory wikiPageWikiLink Zermelo_set_theory.
- Scott–Potter_set_theory wikiPageWikiLink Zermelo–Fraenkel_set_theory.
- Scott–Potter_set_theory wikiPageWikiLinkText "Scott–Potter set theory".
- Scott–Potter_set_theory wikiPageWikiLinkText "Scott–Potter set theory".
- Scott–Potter_set_theory subject Category:Systems_of_set_theory.
- Scott–Potter_set_theory subject Category:Urelements.
- Scott–Potter_set_theory subject Category:Wellfoundedness.
- Scott–Potter_set_theory hypernym Collection.
- Scott–Potter_set_theory type Book.
- Scott–Potter_set_theory type Redirect.
- Scott–Potter_set_theory comment "An approach to the foundations of mathematics that is of relatively recent origin, Scott–Potter set theory is a collection of nested axiomatic set theories set out by the philosopher Michael Potter, building on earlier work by the mathematician Dana Scott and the philosopher George Boolos.Potter (1990, 2004) clarified and simplified the approach of Scott (1974), and showed how the resulting axiomatic set theory can do what is expected of such theory, namely grounding the cardinal and ordinal numbers, Peano arithmetic and the other usual number systems, and the theory of relations.".
- Scott–Potter_set_theory label "Scott–Potter set theory".
- Scott–Potter_set_theory sameAs Q7438244.
- Scott–Potter_set_theory sameAs m.0fsx5k.
- Scott–Potter_set_theory sameAs Q7438244.
- Scott–Potter_set_theory wasDerivedFrom Scott–Potter_set_theory?oldid=705978669.
- Scott–Potter_set_theory isPrimaryTopicOf Scott–Potter_set_theory.