English

On small analytic relations

General Topology 2020-05-28 v1 Logic

Abstract

We study the class of analytic binary relations on Polish spaces, compared with the notions of continuous reducibility or injective continuous reducibility. In particular, we characterize when a locally countable Borel relation is Σ\Sigma 0 ξ\xi (or Π\Pi 0 ξ\xi), when ξ\xi \ge 3, by providing a concrete finite antichain basis. We give a similar characterization for arbitrary relations when ξ\xi = 1. When ξ\xi = 2, we provide a concrete antichain of size continuum made of locally countable Borel relations minimal among non-Σ\Sigma 0 2 (or non-Π\Pi 0 2) relations. The proof of this last result allows us to strengthen a result due to Baumgartner in topological Ramsey theory on the space of rational numbers. We prove that positive results hold when ξ\xi = 2 in the acyclic case. We give a general positive result in the non-necessarily locally countable case, with another suitable acyclicity assumption. We provide a concrete finite antichain basis for the class of uncountable analytic relations. Finally, we deduce from our positive results some antichain basis for graphs, of small cardinality (most of the time 1 or 2).

Keywords

Cite

@article{arxiv.2005.13212,
  title  = {On small analytic relations},
  author = {Dominique Lecomte},
  journal= {arXiv preprint arXiv:2005.13212},
  year   = {2020}
}
R2 v1 2026-06-23T15:50:44.929Z