English

Borel graphable equivalence relations

Logic 2025-12-30 v3 Dynamical Systems

Abstract

This paper is devoted to the study of analytic equivalence relations which are Borel graphable, i.e. which can be realized as the connectedness relation of a Borel graph. Our main focus is the question of which analytic equivalence relations are Borel graphable. First, we study an equivalence relation arising from the theory of countable admissible ordinals and show that it is Borel graphable if and only if there is a non-constructible real. As a corollary of the proof, we construct an analytic equivalence relation which is (provably in ZFC) not Borel graphable and an effectively analytic equivalence relation which is Borel graphable but not effectively Borel graphable. Next, we study analytic equivalence relations given by the isomorphism relation for some class of countable structures. We show that all such equivalence relations are Borel graphable, which implies that for every Borel action of SS_\infty, the associated orbit equivalence relation is Borel graphable. This leads us to study the class of Polish groups whose Borel actions always give rise to Borel graphable orbit equivalence relations; we refer to such groups as graphic groups. We show that besides SS_\infty, the class of graphic groups includes all connected Polish groups and is closed under countable products. We finish by studying structural properties of the class of Borel graphable analytic equivalence relations and by considering two variations on Borel graphability: a generalization with hypegraphs instead of graphs and an analogue of Borel graphability in the setting of computably enumerable equivalence relations.

Keywords

Cite

@article{arxiv.2409.08624,
  title  = {Borel graphable equivalence relations},
  author = {Tyler Arant and Alexander S. Kechris and Patrick Lutz},
  journal= {arXiv preprint arXiv:2409.08624},
  year   = {2025}
}

Comments

62 pages, updated to fix typos and add some remarks

R2 v1 2026-06-28T18:43:24.468Z