English

Bi-interpretation in weak set theories

Logic 2020-08-05 v2

Abstract

In contrast to the robust mutual interpretability phenomenon in set theory, Ali Enayat proved that bi-interpretation is absent: distinct theories extending ZF are never bi-interpretable and models of ZF are bi-interpretable only when they are isomorphic. Nevertheless, for natural weaker set theories, we prove, including Zermelo-Fraenkel set theory ZFC\text{ZFC}^- without power set and Zermelo set theory Z, there are nontrivial instances of bi-interpretation. Specifically, there are well-founded models of ZFC\text{ZFC}^- that are bi-interpretable, but not isomorphic---even Hω1,\langle H_{\omega_1},\in\rangle and Hω2,\langle H_{\omega_2},\in\rangle can be bi-interpretable---and there are distinct bi-interpretable theories extending ZFC\text{ZFC}^-. Similarly, using a construction of Mathias, we prove that every model of ZF is bi-interpretable with a model of Zermelo set theory in which the replacement axiom fails.

Cite

@article{arxiv.2001.05262,
  title  = {Bi-interpretation in weak set theories},
  author = {Alfredo Roque Freire and Joel David Hamkins},
  journal= {arXiv preprint arXiv:2001.05262},
  year   = {2020}
}

Comments

25 pages. Commentary can be made about this article on the second author's blog at http://jdh.hamkins.org/bi-interpretation-in-weak-set-theories. Version 2 corrects the author order to alphabetical and makes some minor inclusions regarding the difference between solidity and semantic tightness and the mutual interpretation of a model of set theory with the theory of its forcing extensions

R2 v1 2026-06-23T13:11:50.137Z