English

Punctual equivalence relations and their (punctual) complexity

Logic 2023-11-09 v1

Abstract

The complexity of equivalence relations has received much attention in the recent literature. The main tool for such endeavour is the following reducibility: given equivalence relations RR and SS on natural numbers, RR is computably reducible to SS if there is a computable function f ⁣:ωωf \colon \omega \to \omega that induces an injective map from RR-equivalence classes to SS-equivalence classes. In order to compare the complexity of equivalence relations which are computable, researchers considered also feasible variants of computable reducibility, such as the polynomial-time reducibility. In this work, we explore Peq\mathbf{Peq}, the degree structure generated by primitive recursive reducibility on punctual equivalence relations (i.e., primitive recursive equivalence relations with domain ω\omega). In contrast with all other known degree structures on equivalence relations, we show that Peq\mathbf{Peq} has much more structure: e.g., we show that it is a dense distributive lattice. On the other hand, we also offer evidence of the intricacy of Peq\mathbf{Peq}, proving, e.g., that the structure is neither rigid nor homogeneous.

Keywords

Cite

@article{arxiv.2109.04055,
  title  = {Punctual equivalence relations and their (punctual) complexity},
  author = {Nikolay Bazhenov and Keng Meng Ng and Luca San Mauro and Andrea Sorbi},
  journal= {arXiv preprint arXiv:2109.04055},
  year   = {2023}
}

Comments

37 pages

R2 v1 2026-06-24T05:48:48.849Z