English

Random Subgroups of Rationals

Logic in Computer Science 2019-01-18 v2

Abstract

This paper introduces and studies a notion of \emph{algorithmic randomness} for subgroups of rationals. Given a randomly generated additive subgroup (G,+)(G,+) of rationals, two main questions are addressed: first, what are the model-theoretic and recursion-theoretic properties of (G,+)(G,+); second, what learnability properties can one extract from GG and its subclass of finitely generated subgroups? For the first question, it is shown that the theory of (G,+)(G,+) coincides with that of the additive group of integers and is therefore decidable; furthermore, while the word problem for GG with respect to any generating sequence for GG is not even semi-decidable, one can build a generating sequence β\beta such that the word problem for GG with respect to β\beta is co-recursively enumerable (assuming that the set of generators of GG is limit-recursive). In regard to the second question, it is proven that there is a generating sequence β\beta for GG such that every non-trivial finitely generated subgroup of GG is recursively enumerable and the class of all such subgroups of GG is behaviourally correctly learnable, that is, every non-trivial finitely generated subgroup can be semantically identified in the limit (again assuming that the set of generators of GG is limit-recursive). On the other hand, the class of non-trivial finitely generated subgroups of GG cannot be syntactically identified in the limit with respect to any generating sequence for GG. The present work thus contributes to a recent line of research studying algorithmically random infinite structures and uncovers an interesting connection between the arithmetical complexity of the set of generators of a randomly generated subgroup of rationals and the learnability of its finitely generated subgroups.

Keywords

Cite

@article{arxiv.1901.04743,
  title  = {Random Subgroups of Rationals},
  author = {Ziyuan Gao and Sanjay Jain and Bakhadyr Khoussainov and Wei Li and Alexander Melnikov and Karen Seidel and Frank Stephan},
  journal= {arXiv preprint arXiv:1901.04743},
  year   = {2019}
}

Comments

27 pages

R2 v1 2026-06-23T07:12:08.960Z