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  1. A forcing notion collapsing $\aleph _3 $ and preserving all other cardinals.David Asperó - 2018 - Journal of Symbolic Logic 83 (4):1579-1594.
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  • Mitchell-inspired forcing, with small working parts and collections of models of uniform size as side conditions, and gap-one simplified morasses.Charles Morgan - 2022 - Journal of Symbolic Logic 87 (1):392-415.
    We show that a $$ -simplified morass can be added by a forcing with working parts of size smaller than $\kappa $. This answers affirmatively the question, asked independently by Shelah and Velleman in the early 1990s, of whether it is possible to do so.Our argument use a modification of a technique of Mitchell’s for adding objects of size $\omega _2$ in which collections of models – all of equal, countable size – are used as side conditions. In our modification, (...)
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  • The approachability ideal without a maximal set.John Krueger - 2019 - Annals of Pure and Applied Logic 170 (3):297-382.
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  • Forcing with adequate sets of models as side conditions.John Krueger - 2017 - Mathematical Logic Quarterly 63 (1-2):124-149.
    We present a general framework for forcing on ω2 with finite conditions using countable models as side conditions. This framework is based on a method of comparing countable models as being membership related up to a large initial segment. We give several examples of this type of forcing, including adding a function on ω2, adding a nonreflecting stationary subset of, and adding an ω1‐Kurepa tree.
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  • Two applications of finite side conditions at omega _2.Itay Neeman - 2017 - Archive for Mathematical Logic 56 (7-8):983-1036.
    We present two applications of forcing with finite sequences of models as side conditions, adding objects of size \. The first involves adding a \ sequence and variants of such sequences. The second involves adding partial weak specializing functions for trees of height \.
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