Abstract: Cohesive powers of computable structures are effective analogs of ultrapowers, where cohesive sets play the role of ultrafilters. Let ω, ζ and η denote the respective order-types of the natural numbers, the integers, and the rationals when thought of as linear orders. We investigate the cohesive powers of computable linear orders, with special emphasis on computable copies of ω. If L is a computable copy of ω that is computably isomorphic to the usual presentation of ω, then every cohesive power of L has order-type ω + ζη. However, there are computable copies of ω, necessarily not computably isomorphic to the usual presentation, having cohesive powers not elementarily equivalent to ω + ζη. For example, we show that there is a computable copy of ω with a cohesive power of order-type ω + η. Our most general result is that if X N \ {0} is a Boolean combination of Σ2 sets, thought of as a set of finite order-types, then there is a computable copy of ω with a cohesive power of order-type ω + σ(X ? {ω + ζη + ω*}), where σ(X ? {ω + ζη + ω*}) denotes the shuffle of the order-types in X and the order-type ω + ζη + ω*. Furthermore, if X is finite and non-empty, then there is a computable copy of ω with a cohesive power of order-type ω + σ(X ).

Cite: DIimitrov R. , Harizanov V. , Morozov A. , Shafer P. , Soskova A.A. , Vatev S.V.
On cohesive powers of linear orders
Journal of Symbolic Logic. 2023. V.88. N3. P.947-1004. DOI: 10.1017/jsl.2023.14 WOS Scopus РИНЦ OpenAlex

Dates:

Submitted:	Feb 18, 2021
Published print:	Mar 13, 2023
Published online:	Mar 13, 2023

Identifiers:

Web of science:	WOS:001058004400003
Scopus:	2-s2.0-85150368099
Elibrary:	61147581
OpenAlex:	W4324065242

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OpenAlex	1
Scopus	1
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