Chain models, trees of singular cardinality and dynamic ef-games

Journal of Mathematical Logic 11 (1):61-85 (2011)
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Abstract

Let κ be a singular cardinal. Karp's notion of a chain model of size κ is defined to be an ordinary model of size κ along with a decomposition of it into an increasing union of length cf. With a notion of satisfaction and -isomorphism such models give an infinitary logic largely mimicking first order logic. In this paper we associate to this logic a notion of a dynamic EF-game which gauges when two chain models are chain-isomorphic. To this game is associated a tree which is a tree of size κ with no κ-branches -branches). The measure of how non-isomorphic the models are is reflected by a certain order on these trees, called reduction. We study the collection of trees of size κ with no κ-branches under this notion and prove that when cf = ω this collection is rather regular; in particular it has universality number exactly κ+. Such trees are then used to develop a descriptive set theory of the space cf κ. The main result of the paper gives in the case of κ strong limit singular an exact connection between the descriptive set-theoretic complexity of the chain isomorphism orbit of a model, the reduction order on the trees and winning strategies in the corresponding dynamic EF games. In particular we obtain a neat analog of the notion of Scott watershed from the Scott analysis of countable models.

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Author Profiles

Jouko A Vaananen
University of Helsinki
Džamonja Mirna
University of East Anglia

Citations of this work

On wide Aronszajn trees in the presence of ma.Mirna Džamonja & Saharon Shelah - 2021 - Journal of Symbolic Logic 86 (1):210-223.

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References found in this work

Model Theory.Gebhard Fuhrken - 1976 - Journal of Symbolic Logic 41 (3):697-699.
Infinitary analogs of theorems from first order model theory.Jerome Malitz - 1971 - Journal of Symbolic Logic 36 (2):216-228.
Trees and Π 1 1 -Subsets of ω1 ω 1.Alan Mekler & Jouko Vaananen - 1993 - Journal of Symbolic Logic 58 (3):1052 - 1070.
Trees and -subsets of ω1ω1.Alan Mekler & Jouko Väänänen - 1993 - Journal of Symbolic Logic 58 (3):1052-1070.

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