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- Kripke–Platek_set_theory_with_urelements abstract "The Kripke–Platek set theory with urelements (KPU) is an axiom system for set theory with urelements, based on the traditional (urelement-free) Kripke-Platek set theory. It is considerably weaker than the (relatively) familiar system ZFU. The purpose of allowing urelements is to allow large or high-complexity objects (such as the set of all reals) to be included in the theory's transitive models without disrupting the usual well-ordering and recursion-theoretic properties of the constructible universe; KP is so weak that this is hard to do by traditional means.".
- Kripke–Platek_set_theory_with_urelements wikiPageID "1572078".
- Kripke–Platek_set_theory_with_urelements wikiPageRevisionID "554557239".
- Kripke–Platek_set_theory_with_urelements subject Category:Systems_of_set_theory.
- Kripke–Platek_set_theory_with_urelements subject Category:Urelements.
- Kripke–Platek_set_theory_with_urelements comment "The Kripke–Platek set theory with urelements (KPU) is an axiom system for set theory with urelements, based on the traditional (urelement-free) Kripke-Platek set theory. It is considerably weaker than the (relatively) familiar system ZFU.".
- Kripke–Platek_set_theory_with_urelements label "Kripke–Platek set theory with urelements".
- Kripke–Platek_set_theory_with_urelements sameAs Kripke%E2%80%93Platek_set_theory_with_urelements.
- Kripke–Platek_set_theory_with_urelements sameAs Q6437113.
- Kripke–Platek_set_theory_with_urelements sameAs Q6437113.
- Kripke–Platek_set_theory_with_urelements wasDerivedFrom Kripke–Platek_set_theory_with_urelements?oldid=554557239.