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  1. Strong Axioms of Infinity and Elementary Embeddings.R. M. SolovÀy - 1978 - Annals of Pure and Applied Logic 13 (1):73.
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  • Some Applications of Model Theory in Set Theory.Jack H. Silver - 1971 - Annals of Pure and Applied Logic 3 (1):45.
  • Some Strong Axioms of Infinity Incompatible with the Axiom of Constructibility.Frederick Rowbottom - 1971 - Annals of Pure and Applied Logic 3 (1):1.
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  • Some Combinatorial Problems Concerning Uncountable Cardinals.Thomas J. Jech - 1973 - Annals of Pure and Applied Logic 5 (3):165.
  • Flipping Properties: A Unifying Thread in the Theory of Large Cardinals.F. G. Abramson, L. A. Harrington, E. M. Kleinberg & W. S. Zwicker - 1977 - Annals of Pure and Applied Logic 12 (1):25.
  • Ackermann's Set Theory Equals ZF.William N. Reinhardt - 1970 - Annals of Pure and Applied Logic 2 (2):189.
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  • On Strong Compactness and Supercompactness.Telis K. Menas - 1975 - Annals of Mathematical Logic 7 (4):327-359.
  • How Large is the First Strongly Compact Cardinal? Or a Study on Identity Crises.Menachem Magidor - 1976 - Annals of Mathematical Logic 10 (1):33-57.
  • Ultrafilters Over a Measurable Cardinal.A. Kanamori - 1976 - Annals of Mathematical Logic 10 (3-4):315-356.
  • On the Warsaw Interactions of Logic and Mathematics in the Years 1919–1939.Roman Duda - 2004 - Annals of Pure and Applied Logic 127 (1-3):289-301.
    The article recalls shortly the early story of cooperation between the already existing Lvov philosophical school, headed by Twardowski, and the just then establishing Warsaw mathematical school, headed by Sierpiski. After that recollection the article proceeds to contributions made by men influenced by the two schools. Most prominent of them was Alfred Tarski whose work in those times, concentrated mainly upon the theory of deduction, axiom of choice, cardinal arithmetic, and measure problem, has been described in some detail.
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  • Partition Complete Boolean Algebras and Almost Compact Cardinals.Peter Jipsen & Henry Rose - 1999 - Mathematical Logic Quarterly 45 (2):241-255.
    For an infinite cardinal K a stronger version of K-distributivity for Boolean algebras, called k-partition completeness, is defined and investigated . It is shown that every k-partition complete Boolean algebra is K-weakly representable, and for strongly inaccessible K these concepts coincide. For regular K ≥ u, it is proved that an atomless K-partition complete Boolean algebra is an updirected union of basic K-tree algebras. Using K-partition completeness, the concept of γ-almost compactness is introduced for γ ≥ K. For strongly inaccessible (...)
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