Forcing with Sequences of Models of Two Types

Notre Dame Journal of Formal Logic 55 (2):265-298 (2014)
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Abstract

We present an approach to forcing with finite sequences of models that uses models of two types. This approach builds on earlier work of Friedman and Mitchell on forcing to add clubs in cardinals larger than $\aleph_{1}$, with finite conditions. We use the two-type approach to give a new proof of the consistency of the proper forcing axiom. The new proof uses a finite support forcing, as opposed to the countable support iteration in the standard proof. The distinction is important since a proof using finite supports is more amenable to generalizations to cardinals greater than $\aleph_{1}$

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10.1215/00294527-2420666

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Citations of this work

Forcing with adequate sets of models as side conditions.John Krueger - 2017 - Mathematical Logic Quarterly 63 (1-2):124-149.
Quotients of strongly proper forcings and guessing models.Sean Cox & John Krueger - 2016 - Journal of Symbolic Logic 81 (1):264-283.
Adding a club with finite conditions, Part II.John Krueger - 2015 - Archive for Mathematical Logic 54 (1-2):161-172.
Coherent adequate forcing and preserving CH.John Krueger & Miguel Angel Mota - 2015 - Journal of Mathematical Logic 15 (2):1550005.
Two applications of finite side conditions at omega _2.Itay Neeman - 2017 - Archive for Mathematical Logic 56 (7-8):983-1036.

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References found in this work

Aronszajn trees and failure of the singular cardinal hypothesis.Itay Neeman - 2009 - Journal of Mathematical Logic 9 (1):139-157.
Adding Closed Unbounded Subsets of ω₂ with Finite Forcing.William J. Mitchell - 2005 - Notre Dame Journal of Formal Logic 46 (3):357-371.
BPFA and Inner Models.Sy-David Friedman - 2011 - Annals of the Japan Association for Philosophy of Science 19:29-36.

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