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doi:10.22028/D291-39696
Titel: | Synthetic Undecidability and Incompleteness of First-Order Axiom Systems in Coq |
VerfasserIn: | Kirst, Dominik Hermes, Marc |
Sprache: | Englisch |
Titel: | Journal of Automated Reasoning |
Bandnummer: | 67 |
Heft: | 1 |
Verlag/Plattform: | Springer Nature |
Erscheinungsjahr: | 2023 |
Freie Schlagwörter: | Undecidability Synthetic computability First-order logic Incompleteness Peano arithmetic ZF set theory Constructive type theory Coq |
DDC-Sachgruppe: | 004 Informatik |
Dokumenttyp: | Journalartikel / Zeitschriftenartikel |
Abstract: | We mechanise the undecidability of various frst-order axiom systems in Coq, employing the synthetic approach to computability underlying the growing Coq Library of Undecidability Proofs. Concretely, we cover both semantic and deductive entailment in fragments of Peano arithmetic (PA) as well as ZF and related fnitary set theories, with their undecidability established by many-one reductions from solvability of Diophantine equations, i.e. Hilbert’s tenth problem (H10), and the Post correspondence problem (PCP), respectively. In the synthetic setting based on the computability of all functions defnable in a constructive foundation, such as Coq’s type theory, it sufces to defne these reductions as metalevel functions with no need for further encoding in a formalised model of computation. The concrete cases of PA and the considered set theories are supplemented by a general synthetic theory of undecidable axiomatisations, focusing on well-known connections to consistency and incompleteness. Specifcally, our reductions rely on the existence of standard models, necessitating additional assumptions in the case of full ZF, and all axiomatic extensions still justifed by such standard models are shown incomplete. As a by-product of the undecidability of set theories formulated using only membership and no equality symbol, we obtain the undecidability of frst-order logic with a single binary relation. |
DOI der Erstveröffentlichung: | 10.1007/s10817-022-09647-x |
URL der Erstveröffentlichung: | https://link.springer.com/article/10.1007/s10817-022-09647-x |
Link zu diesem Datensatz: | urn:nbn:de:bsz:291--ds-396960 hdl:20.500.11880/35767 http://dx.doi.org/10.22028/D291-39696 |
ISSN: | 1573-0670 0168-7433 |
Datum des Eintrags: | 8-Mai-2023 |
Fakultät: | MI - Fakultät für Mathematik und Informatik |
Fachrichtung: | MI - Informatik |
Professur: | MI - Prof. Dr. Gert Smolka |
Sammlung: | SciDok - Der Wissenschaftsserver der Universität des Saarlandes |
Dateien zu diesem Datensatz:
Datei | Beschreibung | Größe | Format | |
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s10817-022-09647-x.pdf | 2,42 MB | Adobe PDF | Öffnen/Anzeigen |
Diese Ressource wurde unter folgender Copyright-Bestimmung veröffentlicht: Lizenz von Creative Commons