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  1. The Higher Infinite: Large Cardinals in Set Theory From Their Beginnings.Akihiro Kanamori - 1994
  • Some Combinatorial Problems Concerning Uncountable Cardinals.Thomas J. Jech - 1973 - Annals of Mathematical Logic 5 (3):165.
  • Notes on Subtlety and Ineffability in P Κ Λ.Yoshihiro Abe - 2005 - Archive for Mathematical Logic 44 (5):619-631.
    .A type of subtlety for Pκλ called “strongly subtle” is introduced to show almost ineffability is consistencywise stronger than Shelah property. The following are also shown: is strongly subtle” has rather strong consequences. The ideal is not strongly subtle} is not λ-saturated, and completely ineffable ideal is not precipitous. In case that λ<κ=2λ, almost λ-ineffability coincides with λ-ineffability. It is not provable that κ is λ<κ-ineffable whenever κ is λ-ineffable.
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  • A Combinatorial Property of P Κλ.Telis K. Menas - 1976 - Journal of Symbolic Logic 41 (1):225-234.
  • On a Combinatorial Property of Menas Related to the Partition Property for Measures on Supercompact Cardinals.Kenneth Kunen & Donald H. Pelletier - 1983 - Journal of Symbolic Logic 48 (2):475-481.
    T. K. Menas [4, pp. 225-234] introduced a combinatorial property χ (μ) of a measure μ on a supercompact cardinal κ and proved that measures with this property also have the partition property. We prove here that Menas' property is not equivalent to the partition property. We also show that if α is the least cardinal greater than κ such that P κ α bears a measure without the partition property, then α is inaccessible and Π 2 1 -indescribable.
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