Abstract
A modular proof-theoretic framework was recently developed to prove Craig interpolation for normal modal logics based on generalizations of sequent calculi (e.g. nested sequents, hypersequents and labelled sequents). In this paper, we turn to uniform interpolation, which is stronger than Craig interpolation. We develop a constructive method for proving uniform interpolation via nested sequents and apply it to reprove the uniform interpolation property for normal modal logics K, D and T. We then use the know-how developed for nested sequents to apply the same method to hypersequents and obtain the first direct proof of uniform interpolation for S5 via a cut-free sequent-like calculus. While our method is proof-theoretic, the definition of uniform interpolation for nested sequents and hypersequents also uses semantic notions, including bisimulation modulo an atomic proposition.
| Original language | English |
|---|---|
| Article number | exae053 |
| Journal | Journal of Logic and Computation |
| Volume | 35 |
| Issue number | 6 |
| Early online date | 16 Dec 2024 |
| DOIs | |
| Publication status | Published - Sept 2025 |
| Externally published | Yes |
Bibliographical note
Publisher Copyright:© The Author(s) 2024. Published by Oxford University Press. All rights reserved.
Funding
Roman Kuznets: This research was funded in whole or in part by the Austrian Science Fund (FWF) project ByzDEL [ https://doi.org/10.55776/P33600 ]. We thank the anonymous reviewer for their valuable comments. Iris van der Giessen and Raheleh Jalali: Acknowledge the support of the Netherlands Organizationfor Scientific Research under grant 639.073.807.Iris van der Giessen: Partially supported by the UKRI Future Leaders Fellowship, ’Structure vsInvariant in Proofs’, project reference MR/S035540/1.Raheleh Jalali: Partially supported by the Czech Science Foundation projects 22-01137S and 22-06414LRoman Kuznets: This research was funded in whole or in part by the Austrian Science Fund (FWF)project ByzDEL [https://doi.org/10.55776/P33600]. Iris van der Giessen: Partially supported by the UKRI Future Leaders Fellowship, ’Structure vs Invariant in Proofs’, project reference MR/S035540/1. Iris van der Giessen and Raheleh Jalali: Acknowledge the support of the Netherlands Organization for Scientific Research under grant 639.073.807. Raheleh Jalali: Partially supported by the Czech Science Foundation projects 22-01137S and 22-06414L
| Funders | Funder number |
|---|---|
| Austrian Science Fund | |
| Grantová Agentura České Republiky | |
| UKRI | |
| FWF | |
| Nederlandse Organisatie voor Wetenschappelijk Onderzoek | 639.073.807 |
| UK Research and Innovation | MR/S035540/1 |
| Czech Science Foundation | 22-06414L, 22-01137S |
Keywords
- Uniform interpolation
- hypersequents
- modal logic
- nested sequents