Index Sets for Classes of High Rank Structures
Abstract
This paper calculates, in a precise way, the complexity of the index sets for three classes of computable structures: the class $K_{\omega _{1}^{\mathit{CK}}}$ of structures of Scott rank $\omega _{1}^{\mathit{CK}}$ , the class $K_{\omega _{1}^{\mathit{CK}}+1}$ of structures of Scott rank $\omega _{1}^{\mathit{CK}}+1$ , and the class K of all structures of non-computable Scott rank. We show that I(K) is m-complete $\Sigma _{1}^{1},\,I(K_{\omega _{1}^{\mathit{CK}}})$ is m-complete $\Pi _{2}^{0}$ relative to Kleen's O, and $I(K_{\omega _{1}^{\mathit{CK}}+1})$ is m-complete $\Sigma _{2}^{0}$ relative to OAuthor's Profile
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Citations of this work
On Σ1 1 equivalence relations over the natural numbers.Ekaterina B. Fokina &Sy-David Friedman -2012 -Mathematical Logic Quarterly 58 (1-2):113-124.
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.
There is no classification of the decidably presentable structures.Matthew Harrison-Trainor -2018 -Journal of Mathematical Logic 18 (2):1850010.
References found in this work
Pairs of recursive structures.C. J. Ash &J. F. Knight -1990 -Annals of Pure and Applied Logic 46 (3):211-234.
On the complexity of categoricity in computable structures.Walker M. White -2003 -Mathematical Logic Quarterly 49 (6):603.
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