Classifications of Computable Structures

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Notre Dame Journal of Formal Logic 59 (1):35-59 (2018)
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Abstract

Let K be a family of structures, closed under isomorphism, in a fixed computable language. We consider effective lists of structures from K such that every structure in K is isomorphic to exactly one structure on the list. Such a list is called a computable classification of K, up to isomorphism. Using the technique of Friedberg enumeration, we show that there is a computable classification of the family of computable algebraic fields and that with a 0'-oracle, we can obtain similar classifications of the families of computable equivalence structures and of computable finite-branching trees. However, there is no computable classification of the latter, nor of the family of computable torsion-free abelian groups of rank 1, even though these families are both closely allied with computable algebraic fields.

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10.1215/00294527-2017-0015

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Theorie Der Numerierungen III.Ju L. Erš - 1977 - Mathematical Logic Quarterly 23 (19-24):289-371.
Theorie Der Numerierungen III.Ju L. Erš - 1976 - Mathematical Logic Quarterly 23 (19‐24):289-371.

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