16 found
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  1.  93
    Adding a closed unbounded set.J. E. Baumgartner, L. A. Harrington & E. M. Kleinberg - 1976 - Journal of Symbolic Logic 41 (2):481-482.
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  2.  59
    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 Mathematical Logic 12 (1):25.
  3.  44
    Strong partition properties for infinite cardinals.E. M. Kleinberg - 1970 - Journal of Symbolic Logic 35 (3):410-428.
  4.  33
    (1 other version)The independence of Ramsey's theorem.E. M. Kleinberg - 1969 - Journal of Symbolic Logic 34 (2):205-206.
    In [3] F. P. Ramsey proved as a theorem of Zermelo-Fraenkel set theory (ZF) with the Axiom of Choice (AC) the following result:(1) Theorem. Let A be an infinite class. For each integer n and partition {X, Y} of the size n subsets of A, there exists an infinite subclass of A all of whose size n subsets are contained in only one of X or Y.
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  5.  24
    (1 other version)A Combinatorial Property of Measurable Cardinals.E. M. Kleinberg - 1974 - Mathematical Logic Quarterly 20 (7):109-111.
  6.  22
    Infinitary combinatorics.E. M. Kleinberg - 1973 - In A. R. D. Mathias & Hartley Rogers (eds.), Cambridge Summer School in Mathematical Logic. New York,: Springer Verlag. pp. 361--418.
  7.  31
    Rowbottom cardinals and Jonsson cardinals are almost the same.E. M. Kleinberg - 1973 - Journal of Symbolic Logic 38 (3):423-427.
  8.  24
    (1 other version)A Flipping Characterization of Ramsey Cardinals.J. M. Henle & E. M. Kleinberg - 1978 - Mathematical Logic Quarterly 24 (1‐6):31-36.
  9.  21
    (1 other version)Filters for square‐bracket partition relations.James M. Henle, Aki Kanamori & E. M. Kleinberg - 1984 - Mathematical Logic Quarterly 30 (12):183-192.
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  10.  43
    On the ultrafilters and ultrapowers of strong partition cardinals.J. M. Henle, E. M. Kleinberg & R. J. Watro - 1984 - Journal of Symbolic Logic 49 (4):1268-1272.
  11.  45
    A measure representation theorem for strong partition cardinals.E. M. Kleinberg - 1982 - Journal of Symbolic Logic 47 (1):161-168.
  12.  33
    Infinite exponent partition relations and well-ordered choice.E. M. Kleinberg & J. I. Seiferas - 1973 - Journal of Symbolic Logic 38 (2):299-308.
  13.  56
    (1 other version)On large cardinals and partition relations.E. M. Kleinberg & R. A. Shore - 1971 - Journal of Symbolic Logic 36 (2):305-308.
  14.  57
    Producing measurable cardinals beyond κ.E. M. Kleinberg - 1981 - Journal of Symbolic Logic 46 (3):643-648.
    In this paper we prove, under the assumption of a strong partition property for an uncountable cardinal κ, the existence of more than κ-many measurable cardinals greater than κ. Our proof involves so-called seminormal measures, and, along the way, we establish several key facts about such measures.
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  15.  35
    Recursion theory and formal deducibility.E. M. Kleinberg - 1970 - Journal of Symbolic Logic 35 (4):556-558.
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  16.  31
    Weak compactness and square bracket partition relations.E. M. Kleinberg & R. A. Shore - 1972 - Journal of Symbolic Logic 37 (4):673-676.