A Syntactic Proof of the Decidability of First-Order Monadic Logic

Eugenio Orlandelli; Matteo Tesi

doi:10.18778/0138-0680.2024.03

Bulletin of the Section of Logic (Feb 2024)

A Syntactic Proof of the Decidability of First-Order Monadic Logic

Eugenio Orlandelli,
Matteo Tesi

Affiliations

Eugenio Orlandelli: ORCiD; University of Bologna, Department of the Arts, Bologna, Italy
Matteo Tesi: Vienna University of Technology, Faculty of Informatics, Vienna, Austria

DOI: https://doi.org/10.18778/0138-0680.2024.03
Journal volume & issue: Vol. 53, no. 2
pp. 223 – 244

Abstract

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Decidability of monadic first-order classical logic was established by Löwenheim in 1915. The proof made use of a semantic argument and a purely syntactic proof has never been provided. In the present paper we introduce a syntactic proof of decidability of monadic first-order logic in innex normal form which exploits G3-style sequent calculi. In particular, we introduce a cut- and contraction-free calculus having a (complexity-optimal) terminating proof-search procedure. We also show that this logic can be faithfully embedded in the modal logic T.

Published in Bulletin of the Section of Logic

ISSN: 0138-0680 (Print); 2449-836X (Online)
Publisher: Lodz University Press
Country of publisher: Poland
LCC subjects: Philosophy. Psychology. Religion: Logic
Website: https://czasopisma.uni.lodz.pl/bulletin

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