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Computable structures of rank
Journal of Mathematical Logic 10 (1):31-43 (2010)
Abstract
For countable structure, "Scott rank" provides a measure of internal, model-theoretic complexity. For a computable structure, the Scott rank is at most [Formula: see text]. There are familiar examples of computable structures of various computable ranks, and there is an old example of rank [Formula: see text]. In the present paper, we show that there is a computable structure of Scott rank [Formula: see text]. We give two different constructions. The first starts with an arithmetical example due to Makkai, and codes it into a computable structure. The second re-works Makkai's construction, incorporating an idea of Sacks.Author's Profile
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2012-09-02
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2012-09-02
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Citations of this work
The complexity of Scott sentences of scattered linear orders.Rachael Alvir & Dino Rossegger - 2020 - Journal of Symbolic Logic 85 (3):1079-1101.
Scott complexity of countable structures.Rachael Alvir, Noam Greenberg, Matthew Harrison-Trainor & Dan Turetsky - 2021 - Journal of Symbolic Logic 86 (4):1706-1720.
An introduction to the Scott complexity of countable structures and a survey of recent results.Matthew Harrison-Trainor - 2022 - Bulletin of Symbolic Logic 28 (1):71-103.
Classification from a computable viewpoint.Wesley Calvert & Julia F. Knight - 2006 - Bulletin of Symbolic Logic 12 (2):191-218.
Classes of Ulm type and coding rank-homogeneous trees in other structures.E. Fokina, J. F. Knight, A. Melnikov, S. M. Quinn & C. Safranski - 2011 - Journal of Symbolic Logic 76 (3):846 - 869.
References found in this work
Computable structures and the hyperarithmetical hierarchy.C. J. Ash - 2000 - New York: Elsevier. Edited by J. Knight.
Generic copies of countable structures.Chris Ash, Julia Knight, Mark Manasse & Theodore Slaman - 1989 - Annals of Pure and Applied Logic 42 (3):195-205.
Pairs of recursive structures.C. J. Ash & J. F. Knight - 1990 - Annals of Pure and Applied Logic 46 (3):211-234.
Effective model theory vs. recursive model theory.John Chisholm - 1990 - Journal of Symbolic Logic 55 (3):1168-1191.
Categoricity in hyperarithmetical degrees.C. J. Ash - 1987 - Annals of Pure and Applied Logic 34 (1):1-14.
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