Computable embeddability for algebraic structures

Nikolay Bazhenov, Manat Mustafa

Research output: Contribution to journalArticlepeer-review

Abstract

In computability theory, the standard tool to classify preorders is provided by the computable reducibility. If R and S are preorders with domain ω, then R is computably reducible to S if and only if there is a computable function f such that for all x and y, xRy f(x)Sf(y). We study the complexity of preorders which arise in a natural way in computable structure theory. We prove that the relation of computable isomorphic embeddability among computable torsion abelian groups is a Σ03 complete preorder. A similar result is obtained for computable distributive lattices. We show that the relation of primitive recursive embeddability among punctual structures (in the setting of Kalimullin et al.) is a Σ02 complete preorder.

Original languageEnglish
Article number2250126
JournalAsian-European Journal of Mathematics
Volume15
Issue number7
DOIs
Publication statusPublished - Jul 1 2022

Keywords

  • Computable reducibility
  • computable structure theory
  • distributive lattice
  • isomorphic embedding
  • preorder
  • primitive recursion
  • punctual structure
  • torsion abelian group

ASJC Scopus subject areas

  • General Mathematics

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