Models of true arithmetic are integer parts of models of real exponentation
Lade...
Dateien
Datum
2021
Autor:innen
Herausgeber:innen
ISSN der Zeitschrift
Electronic ISSN
ISBN
Bibliografische Daten
Verlag
Schriftenreihe
Auflagebezeichnung
URI (zitierfähiger Link)
DOI (zitierfähiger Link)
Internationale Patentnummer
Link zur Lizenz
Angaben zur Forschungsförderung
Projekt
Open Access-Veröffentlichung
Open Access Gold
Sammlungen
Core Facility der Universität Konstanz
Titel in einer weiteren Sprache
Publikationstyp
Zeitschriftenartikel
Publikationsstatus
Published
Erschienen in
Journal of Logic and Analysis. Department of Philosophy, Carnegie Mellon University. 2021, (13), 3. ISSN 1759-9008. Available under: doi: 10.4115/jla.2021.13.3
Zusammenfassung
Exploring further the connection between exponentiation on real closed fields and the existence of an integer part modelling strong fragments of arithmetic, we demonstrate that each model of true arithmetic is an integer part of an exponential real closed field that is elementarily equivalent to the real numbers with exponentiation and that each model of Peano arithmetic is an integer part of a real closed field that admits an isomorphism between its ordered additive and its ordered multiplicative group of positive elements. Under the assumption of Schanuel’s Conjecture, we obtain further strengthenings for the last statement.
Zusammenfassung in einer weiteren Sprache
Fachgebiet (DDC)
510 Mathematik
Schlagwörter
true arithmetic, Peano arithmetic; integer parts; real exponentiation; exponential fields
Konferenz
Rezension
undefined / . - undefined, undefined
Zitieren
ISO 690
CARL, Merlin, Lothar Sebastian KRAPP, 2021. Models of true arithmetic are integer parts of models of real exponentation. In: Journal of Logic and Analysis. Department of Philosophy, Carnegie Mellon University. 2021, (13), 3. ISSN 1759-9008. Available under: doi: 10.4115/jla.2021.13.3BibTex
@article{Carl2021Model-54344,
year={2021},
doi={10.4115/jla.2021.13.3},
title={Models of true arithmetic are integer parts of models of real exponentation},
number={13},
volume={},
issn={1759-9008},
journal={Journal of Logic and Analysis},
author={Carl, Merlin and Krapp, Lothar Sebastian},
note={Article Number: 3}
}RDF
<rdf:RDF
xmlns:dcterms="http://purl.org/dc/terms/"
xmlns:dc="http://purl.org/dc/elements/1.1/"
xmlns:rdf="http://www.w3.org/1999/02/22-rdf-syntax-ns#"
xmlns:bibo="http://purl.org/ontology/bibo/"
xmlns:dspace="http://digital-repositories.org/ontologies/dspace/0.1.0#"
xmlns:foaf="http://xmlns.com/foaf/0.1/"
xmlns:void="http://rdfs.org/ns/void#"
xmlns:xsd="http://www.w3.org/2001/XMLSchema#" >
<rdf:Description rdf:about="https://kops.uni-konstanz.de/server/rdf/resource/123456789/54344">
<dcterms:hasPart rdf:resource="https://kops.uni-konstanz.de/bitstream/123456789/54344/3/Krapp_2-1dezh6kqr1uhq7.pdf"/>
<dc:contributor>Carl, Merlin</dc:contributor>
<dcterms:title>Models of true arithmetic are integer parts of models of real exponentation</dcterms:title>
<dc:language>eng</dc:language>
<void:sparqlEndpoint rdf:resource="http://localhost/fuseki/dspace/sparql"/>
<dc:date rdf:datatype="http://www.w3.org/2001/XMLSchema#dateTime">2021-07-19T08:14:39Z</dc:date>
<bibo:uri rdf:resource="https://kops.uni-konstanz.de/handle/123456789/54344"/>
<dcterms:isPartOf rdf:resource="https://kops.uni-konstanz.de/server/rdf/resource/123456789/39"/>
<dcterms:rights rdf:resource="https://rightsstatements.org/page/InC/1.0/"/>
<foaf:homepage rdf:resource="http://localhost:8080/"/>
<dspace:isPartOfCollection rdf:resource="https://kops.uni-konstanz.de/server/rdf/resource/123456789/39"/>
<dc:rights>terms-of-use</dc:rights>
<dc:creator>Krapp, Lothar Sebastian</dc:creator>
<dcterms:abstract xml:lang="eng">Exploring further the connection between exponentiation on real closed fields and the existence of an integer part modelling strong fragments of arithmetic, we demonstrate that each model of true arithmetic is an integer part of an exponential real closed field that is elementarily equivalent to the real numbers with exponentiation and that each model of Peano arithmetic is an integer part of a real closed field that admits an isomorphism between its ordered additive and its ordered multiplicative group of positive elements. Under the assumption of Schanuel’s Conjecture, we obtain further strengthenings for the last statement.</dcterms:abstract>
<dcterms:available rdf:datatype="http://www.w3.org/2001/XMLSchema#dateTime">2021-07-19T08:14:39Z</dcterms:available>
<dc:creator>Carl, Merlin</dc:creator>
<dcterms:issued>2021</dcterms:issued>
<dc:contributor>Krapp, Lothar Sebastian</dc:contributor>
<dspace:hasBitstream rdf:resource="https://kops.uni-konstanz.de/bitstream/123456789/54344/3/Krapp_2-1dezh6kqr1uhq7.pdf"/>
</rdf:Description>
</rdf:RDF>Interner Vermerk
xmlui.Submission.submit.DescribeStep.inputForms.label.kops_note_fromSubmitter
Prüfungsdatum der Dissertation
Finanzierungsart
Kommentar zur Publikation
Allianzlizenz
Corresponding Authors der Uni Konstanz vorhanden
Internationale Co-Autor:innen
Universitätsbibliographie
Ja
Begutachtet
Unbekannt
