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  1. Some Pathological Examples of Precipitous Ideals.Moti Gitik - 2008 - Journal of Symbolic Logic 73 (2):492 - 511.
    We construct a model with an indecisive precipitous ideal and a model with a precipitous ideal with a non precipitous normal ideal below it. Such kind of examples were previously given by M. Foreman [2] and R. Laver [4] respectively. The present examples differ in two ways: first- they use only a measurable cardinal and second- the ideals are over a cardinal. Also a precipitous ideal without a normal ideal below it is constructed. It is shown in addition that if (...)
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  • Some properties of κ-complete ideals defined in terms of infinite games.Thomas J. Jech - 1984 - Annals of Pure and Applied Logic 26 (1):31-45.
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  • Some examples of precipitous ideals.Thomas J. Jech & William J. Mitchell - 1983 - Annals of Pure and Applied Logic 24 (2):131-151.
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  • Some properties of kappa-complete ideals defined in terms of infinite games.T. J. Jech - 1984 - Annals of Pure and Applied Logic 26 (1):31.
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  • On Ideals of Sets and the Power Set Operation.Thomas Jech, Karel Prikry, F. Galvin, T. Jech & M. Magidor - 1985 - Journal of Symbolic Logic 50 (1):239-240.
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  • Precipitous ideals.T. Jech, M. Magidor, W. Mitchell & K. Prikry - 1980 - Journal of Symbolic Logic 45 (1):1-8.
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  • More game-theoretic properties of boolean algebras.Thomas J. Jech - 1984 - Annals of Pure and Applied Logic 26 (1):11-29.
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  • Winning the Pressing down Game but Not Banach-Mazur.Jakob Kellner, Matti Pauna & Saharon Shelah - 2007 - Journal of Symbolic Logic 72 (4):1323 - 1335.
    Let S be the set of those α ∈ ω₂ that have cofinality ω₁. It is consistent relative to a measurable that the nonempty player wins the pressing down game of length ω₁, but not the Banach-Mazur game of length ω + 1 (both games starting with S).
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  • An ideal game.F. Galvin, T. Jech & M. Magidor - 1978 - Journal of Symbolic Logic 43 (2):284-292.
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  • Games played on Boolean algebras.Matthew Foreman - 1983 - Journal of Symbolic Logic 48 (3):714-723.
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  • On almost precipitous ideals.Asaf Ferber & Moti Gitik - 2010 - Archive for Mathematical Logic 49 (3):301-328.
    With less than 0# two generic extensions ofL are identified: one in which ${\aleph_1}$ , and the other ${\aleph_2}$ , is almost precipitous. This improves the consistency strength upper bound of almost precipitousness obtained in Gitik M, Magidor M (On partialy wellfounded generic ultrapowers, in Pillars of Computer Science, 2010), and answers some questions raised there. Also, main results of Gitik (On normal precipitous ideals, 2010), are generalized—assumptions on precipitousness are replaced by those on ∞-semi precipitousness. As an application it (...)
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  • Collapsing functions.Ernest Schimmerling & Boban Velickovic - 2004 - Mathematical Logic Quarterly 50 (1):3-8.
    We define what it means for a function on ω1 to be a collapsing function for λ and show that if there exists a collapsing function for +, then there is no precipitous ideal on ω1. We show that a collapsing function for ω2 can be added by forcing. We define what it means to be a weakly ω1-Erdös cardinal and show that in L[E], there is a collapsing function for λ iff λ is less than the least weakly ω1-Erdös (...)
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  • More on the cut and choose game.Jindřich Zapletal - 1995 - Annals of Pure and Applied Logic 76 (3):291-301.
    The cut and choose game is one of the infinitary games on a complete Boolean algebra B introduced by Jech. We prove that existence of a winning strategy for II in implies semiproperness of B. If the existence of a supercompact cardinal is consistent then so is “for every 1-distributive algebra B II has a winning strategy in ”.
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