The Amalgamation Property for automorphisms of ordered abelian groups

Dobrowolski, Jan; Mennuni, Rosario

doi:10.1090/tran/9217

Trans. Amer. Math. Soc.

2024

DOI: 10.1090/tran/9217

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The Amalgamation Property for automorphisms of ordered abelian groups

Jan Dobrowolski,

Rosario Mennuni

Abstract: We prove that the category of ordered abelian groups equipped with an automorphism has the Amalgamation Property, deduce that their inductive theory is N I P \mathsf {NIP} in the sense of positive logic, and initiate a development of the latter framework. As byproducts of the proof, we obtain a generalised version of the Hahn Embedding Theorem which allows to lift each automorphism of an ordered abelian group to one of an ordered real vector space, and we show that, o… Show more

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2024

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Cited by 2 publications

References 42 publications

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Positive indiscernibles

Kamsma

2024

Arch. Math. Logic

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We generalise various theorems for finding indiscernible trees and arrays to positive logic: based on an existing modelling theorem for s-trees, we prove modelling theorems for str-trees, str$$_0$$ 0 -trees (the reduct of str-trees that forgets the length comparison relation) and arrays. In doing so, we prove stronger versions for basing—rather than locally basing or EM-basing—str-trees on s-trees and str$$_0$$ 0 -trees on str-trees. As an application we show that a thick positive theory has k-$$\mathsf {TP_2}$$ TP 2 iff it has 2-$$\mathsf {TP_2}$$ TP 2

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Positive indiscernibles

Kamsma

2024

Arch. Math. Logic

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Dividing Lines Between Positive Theories

DMITRIEVA,

GALLINARO,

KAMSMA

2023

J. symb. log.

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We generalise the properties $\mathsf {OP}$ , $\mathsf {IP}$ , k- $\mathsf {TP}$ , $\mathsf {TP}_{1}$ , k- $\mathsf {TP}_{2}$ , $\mathsf {SOP}_{1}$ , $\mathsf {SOP}_{2}$ , and $\mathsf {SOP}_{3}$ to positive logic, and prove various implications and equivalences between them. We also provide a characterisation of stability in positive logic in analogy with the one in full first-order logic, both on the level of formulas and on the level of theories. For simple theories there are the classically equivalent definitions of not having $\mathsf {TP}$ and dividing having local character, which we prove to be equivalent in positive logic as well. Finally, we show that a thick theory T has $\mathsf {OP}$ iff it has $\mathsf {IP}$ or $\mathsf {SOP}_{1}$ and that T has $\mathsf {TP}$ iff it has $\mathsf {SOP}_{1}$ or $\mathsf {TP}_{2}$ , analogous to the well-known results in full first-order logic where $\mathsf {SOP}_{1}$ is replaced by $\mathsf {SOP}$ in the former and by $\mathsf {TP}_{1}$ in the latter. Our proofs of these final two theorems are new and make use of Kim-independence.

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The Amalgamation Property for automorphisms of ordered abelian groups

Cited by 2 publications

References 42 publications

Positive indiscernibles

Positive indiscernibles

Dividing Lines Between Positive Theories

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