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2 results

  • SQUARE WITH BUILT-IN DIAMOND-PLUS

  • ASSAF RINOT, RALF SCHINDLER
  • Journal:
    The Journal of Symbolic Logic / Volume 82 / Issue 3 / September 2017
    Published online by Cambridge University Press:
    08 September 2017, pp. 809-833
    Print publication:
    September 2017

  • We formulate combinatorial principles that combine the square principle with various strong forms of the diamond principle, and prove that the strongest amongst them holds in L for every infinite cardinal.

    As an application, we prove that the following two hold in L:

    1. 1. For every infinite regular cardinal λ, there exists a special λ+-Aronszajn tree whose projection is almost Souslin;

    2. 2. For every infinite cardinal λ, there exists a respecting λ+-Kurepa tree; Roughly speaking, this means that this λ+-Kurepa tree looks very much like the λ+-Souslin trees that Jensen constructed in L.

  • DOWNWARD TRANSFERENCE OF MICE AND UNIVERSALITY OF LOCAL CORE MODELS

  • ANDRÉS EDUARDO CAICEDO, MARTIN ZEMAN
  • Journal:
    The Journal of Symbolic Logic / Volume 82 / Issue 2 / June 2017
    Published online by Cambridge University Press:
    19 June 2017, pp. 385-419
    Print publication:
    June 2017

  • If M is a proper class inner model of ZFC and $\omega _2^{\bf{M}} = \omega _2 $, then every sound mouse projecting to ω and not past 0 belongs to M. In fact, under the assumption that 0 does not belong to M, ${\bf{K}}^{\bf{M}} \parallel \omega _2 $ is universal for all countable mice in V.

    Similarly, if M is a proper class inner model of ZFC, δ > ω1 is regular, (δ+)M = δ+ and in V there is no proper class inner model with a Woodin cardinal, then ${\bf{K}}^{\bf{M}} \parallel \delta $ is universal for all mice in V of cardinality less than δ.