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Finite computable dimension does not relativize
Archive for Mathematical Logic 41 (4):309-320 (2002)
Abstract
In many classes of structures, each computable structure has computable dimension 1 or $\omega$. Nevertheless, Goncharov showed that for each $n < \omega$, there exists a computable structure with computable dimension $n$. In this paper we show that, under one natural definition of relativized computable dimension, no computable structure has finite relativized computable dimension greater than 1Other Versions
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Citations of this work
Enumerations in computable structure theory.Sergey Goncharov, Valentina Harizanov, Julia Knight, Charles McCoy, Russell Miller & Reed Solomon - 2005 - Annals of Pure and Applied Logic 136 (3):219-246.
Degrees of categoricity on a Cone via η-systems.Barbara F. Csima & Matthew Harrison-Trainor - 2017 - Journal of Symbolic Logic 82 (1):325-346.
Non-density in punctual computability.Noam Greenberg, Matthew Harrison-Trainor, Alexander Melnikov & Dan Turetsky - 2021 - Annals of Pure and Applied Logic 172 (9):102985.
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.
Computably categorical structures and expansions by constants.Peter Cholak, Sergey Goncharov, Bakhadyr Khoussainov & Richard Shore - 1999 - Journal of Symbolic Logic 64 (1):13-37.
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