Scott's problem for Proper Scott sets

Journal of Symbolic Logic 73 (3):845-860 (2008)
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Abstract

Some 40 years ago, Dana Scott proved that every countable Scott set is the standard system of a model of PA. Two decades later, Knight and Nadel extended his result to Scott sets of size ω₁. Here, I show that assuming the Proper Forcing Axiom (PFA), every A-proper Scott set is the standard system of a model of PA. I define that a Scott set X is proper if the quotient Boolean algebra X/Fin is a proper partial order and A-proper if X is additionally arithmetically closed. I also investigate the question of the existence of proper Scott sets

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10.2178/jsl/1230396751

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Citations of this work

A note on standard systems and ultrafilters.Fredrik Engström - 2008 - Journal of Symbolic Logic 73 (3):824-830.
Proper and piecewise proper families of reals.Victoria Gitman - 2009 - Mathematical Logic Quarterly 55 (5):542-550.

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Models and types of Peano's arithmetic.Haim Gaifman - 1976 - Annals of Mathematical Logic 9 (3):223-306.
Set Theory.Thomas Jech - 1999 - Studia Logica 63 (2):300-300.

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