English

Coarse groups, and the isomorphism problem for oligomorphic groups

Logic 2022-09-28 v4 Group Theory

Abstract

Let SS_\infty denote the topological group of permutations of the natural numbers. We study the complexity of the isomorphism relation on classes of closed subgroups SS_\infty in the setting of Borel reducibility between equivalence relations on Polish spaces. Given a closed subgroup GG of SS_\infty, the coarse group M(G)\mathcal M(G) is the structure with domain the cosets of open subgroups of GG, and a ternary relation ABCAB \sqsubseteq C. If GG has only countably many open subgroups, then M(G)\mathcal M(G) is a countable structure. Coarse groups form our main tool in studying such closed subgroups of SS_\infty. We axiomatise them abstractly as structures with a ternary relation. For appropriate classes of groups, including the profinite groups, we set up a Stone-type duality between the groups and the corresponding coarse groups. In particular we can recover an isomorphic copy of~GG from M(G)\mathcal M(G) in a Borel fashion. A closed subgroup GG of SS_\infty is called oligomorphic if for each nn, its natural action on nn-tuples of natural numbers has only finitely many orbits. We use the concept of a coarse group to show that the isomorphism relation for oligomorphic subgroups of SS_\infty is Borel reducible to a Borel equivalence relation with all classes countable. We show that the same upper bound applies to the larger class of closed subgroups of SS_\infty that are topologically isomorphic to oligomorphic groups.

Keywords

Cite

@article{arxiv.1903.08436,
  title  = {Coarse groups, and the isomorphism problem for oligomorphic groups},
  author = {Andre Nies and Philipp Schlicht and Katrin Tent},
  journal= {arXiv preprint arXiv:1903.08436},
  year   = {2022}
}

Comments

Typo on page 13 fixed. These should be A' and B'

R2 v1 2026-06-23T08:13:47.495Z