The theory of ceers computes true arithmetic

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Annals of Pure and Applied Logic 171 (8):102811 (2020)
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Abstract

We show that the theory of the partial order of computably enumerable equivalence relations (ceers) under computable reduction is 1-equivalent to true arithmetic. We show the same result for the structure comprised of the dark ceers and the structure comprised of the light ceers. We also show the same for the structure of L-degrees in the dark, light, or complete structure. In each case, we show that there is an interpretable copy of (N, +, \times) .

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10.1016/j.apal.2020.102811

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Citations of this work

Investigating the Computable Friedman–Stanley Jump.Uri Andrews & Luca San Mauro - 2024 - Journal of Symbolic Logic 89 (2):918-944.
Initial Segments of the Degrees of Ceers.Uri Andrews & Andrea Sorbi - 2022 - Journal of Symbolic Logic 87 (3):1260-1282.

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References found in this work

Theorie der Numerierungen I.Ju L. Eršov - 1973 - Mathematical Logic Quarterly 19 (19‐25):289-388.
Classifying positive equivalence relations.Claudio Bernardi & Andrea Sorbi - 1983 - Journal of Symbolic Logic 48 (3):529-538.

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