Mathematical objects and the object of theology
This article brings mathematical realism and theological realism into conversation. It outlines a realist ontology that characterizes abstract mathematical objects as inaccessible to the senses, non-spatiotemporal, and acausal. Mathematical realists are challenged to explain how we can know such obj...
Auteur principal: | |
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Type de support: | Électronique Article |
Langue: | Anglais |
Vérifier la disponibilité: | HBZ Gateway |
Journals Online & Print: | |
Fernleihe: | Fernleihe für die Fachinformationsdienste |
Publié: |
Cambridge Univ. Press
[2017]
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Dans: |
Religious studies
Année: 2017, Volume: 53, Numéro: 4, Pages: 479-496 |
Sujets / Chaînes de mots-clés standardisés: | B
Mathématiques
/ Objet (Catégorie)
/ Théologie
/ Objet (Philosophie)
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RelBib Classification: | AB Philosophie de la religion FA Théologie |
Accès en ligne: |
Volltext (Verlag) Volltext (doi) |
Résumé: | This article brings mathematical realism and theological realism into conversation. It outlines a realist ontology that characterizes abstract mathematical objects as inaccessible to the senses, non-spatiotemporal, and acausal. Mathematical realists are challenged to explain how we can know such objects. The article reviews some promising responses to this challenge before considering the view that the object of theology also possesses the three characteristic features of abstract objects, and consequently may be known through the same methods that yield knowledge of mathematical objects. |
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ISSN: | 1469-901X |
Contient: | Enthalten in: Religious studies
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Persistent identifiers: | DOI: 10.1017/S0034412516000238 |