There is no classification of the decidably presentable structures

Journal of Mathematical Logic 18 (2):1850010 (2018)
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Abstract

A computable structure [Formula: see text] is decidable if, given a formula [Formula: see text] of elementary first-order logic, and a tuple [Formula: see text], we have a decision procedure to decide whether [Formula: see text] holds of [Formula: see text]. We show that there is no reasonable classification of the decidably presentable structures. Formally, we show that the index set of the computable structures with decidable presentations is [Formula: see text]-complete. We also show that for each [Formula: see text] the index set of the computable structures with [Formula: see text]-decidable presentations is [Formula: see text]-complete.

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10.1142/s0219061318500101

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Generic copies of countable structures.Chris Ash, Julia Knight, Mark Manasse & Theodore Slaman - 1989 - Annals of Pure and Applied Logic 42 (3):195-205.
Stability of recursive structures in arithmetical degrees.C. J. Ash - 1986 - Annals of Pure and Applied Logic 32:113-135.

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