Coarse groups, and the isomorphism problem for oligomorphic groups
Abstract
Let denote the topological group of permutations of the natural numbers. We study the complexity of the isomorphism relation on classes of closed subgroups in the setting of Borel reducibility between equivalence relations on Polish spaces. Given a closed subgroup of , the coarse group is the structure with domain the cosets of open subgroups of , and a ternary relation . If has only countably many open subgroups, then is a countable structure. Coarse groups form our main tool in studying such closed subgroups of . 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~ from in a Borel fashion. A closed subgroup of is called oligomorphic if for each , its natural action on -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 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 that are topologically isomorphic to oligomorphic groups.
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'