English

Provability and interpretability logics with restricted realizations

Logic 2020-06-19 v1

Abstract

The provability logic of a theory T is the set of modal formulas, which under any arithmetical realization are provable in T . We slightly modify this notion by requiring the arithmetical realizations to come from a specified set Γ\Gamma. We make an analogous modification for interpretability logics. This is a paper from 2012. We first studied provability logics with restricted realizations, and show that for various natural candidates of theory T and restriction set Γ\Gamma, where each sentence in Γ\Gamma has a well understood (meta)-mathematical content in T, the result is the logic of linear frames. However, for the theory Primitive Recursive Arithmetic (PRA), we define a fragment that gives rise to a more interesting provability logic, by capitalizing on the well-studied relationship between PRA and IΣ1\Sigma_1. We then study interpretability logics, obtaining some upper bounds for IL(PRA), whose characterization remains a major open question in interpretability logic. Again this upper bound is closely relatively to linear frames. The technique is also applied to yield the non-trivial result that IL(PRA) \subset ILM.

Keywords

Cite

@article{arxiv.2006.10539,
  title  = {Provability and interpretability logics with restricted realizations},
  author = {Thomas F. Icard and Joost J. Joosten},
  journal= {arXiv preprint arXiv:2006.10539},
  year   = {2020}
}
R2 v1 2026-06-23T16:26:06.228Z