English

Index Sets of Computable Structures

Logic 2008-03-25 v1

Abstract

The \emph{index set} of a computable structure A\mathcal{A} is the set of indices for computable copies of A\mathcal{A}. We determine the complexity of the index sets of various mathematically interesting structures, including arbitrary finite structures, Q\mathbb{Q}-vector spaces, Archimedean real closed ordered fields, reduced Abelian pp-groups of length less than ω2\omega^{2}, and models of the original Ehrenfeucht theory. The index sets for these structures all turn out to be mm-complete Πn0\Pi_{n}^{0}, dd-Σn0\Sigma_{n}^{0}, or Σn0\Sigma_{n}^{0}, for various nn. In each case, the calculation involves finding an \textquotedblleft optimal\textquotedblright% \ sentence (i.e., one of simplest form) that describes the structure. The form of the sentence (computable Πn\Pi_{n}, dd-Σn\Sigma_{n}, or Σn\Sigma_{n}) yields a bound on the complexity of the index set. When we show mm% -completeness of the index set, we know that the sentence is optimal. For some structures, the first sentence that comes to mind is not optimal, and another sentence of simpler form is shown to serve the purpose. For some of the groups, this involves Ramsey theory.

Keywords

Cite

@article{arxiv.0803.3294,
  title  = {Index Sets of Computable Structures},
  author = {Wesley Calvert and Valentina S. Harizanov and Julia F. Knight and Sara Miller},
  journal= {arXiv preprint arXiv:0803.3294},
  year   = {2008}
}
R2 v1 2026-06-21T10:23:44.721Z