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On colimits and elementary embeddings

Joan Bagaria & Andrew Brooke-Taylor

Journal of Symbolic Logic 78 (2):562-578 (2013)

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C(n)-cardinals.Joan Bagaria - 2012 - Archive for Mathematical Logic 51 (3-4):213-240.details For each natural number n, let C(n) be the closed and unbounded proper class of ordinals α such that Vα is a Σn elementary substructure of V. We say that κ is a C(n)-cardinal if it is the critical point of an elementary embedding j : V → M, M transitive, with j(κ) in C(n). By analyzing the notion of C(n)-cardinal at various levels of the usual hierarchy of large cardinal principles we show that, starting at the level of superstrong (...) Download Export citation Bookmark 18 citations
The Higher Infinite.Akihiro Kanamori - 2000 - Studia Logica 65 (3):443-446.details Download Export citation Bookmark 211 citations
Limites in Kategorien von Relationalsystemen.Michael Richter - 1971 - Mathematical Logic Quarterly 17 (1):75-90.details Download Export citation Bookmark 1 citation
(1 other version)Elementary embeddings and infinitary combinatorics.Kenneth Kunen - 1971 - Journal of Symbolic Logic 36 (3):407-413.details One of the standard ways of postulating large cardinal axioms is to consider elementary embeddings,j, from the universe,V, into some transitive submodel,M. See Reinhardt–Solovay [7] for more details. Ifjis not the identity, andκis the first ordinal moved byj, thenκis a measurable cardinal. Conversely, Scott [8] showed that wheneverκis measurable, there is suchjandM. If we had assumed, in addition, that, thenκwould be theκth measurable cardinal; in general, the wider we assumeMto be, the largerκmust be. Download Export citation Bookmark 59 citations
(1 other version)[Omnibus Review].Akihiro Kanamori - 1981 - Journal of Symbolic Logic 46 (4):864-866.details Download Export citation Bookmark 71 citations

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