How are Mathematical Objects Constituted? A Structuralist Answer
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2006
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GAP. 6 Philosophie - Grundlagen und Anwendungen, Berlin, 11.-14.9.2006. 2006, pp. 106-119
Zusammenfassung
The paper proposes to amend structuralism in mathematics by saying what places in a structure and thus mathematical objects are. They are the objects of the canonical system realizing a categorical structure, where that canonical system is a minimal system in a specific essentialistic sense. It would thus be a basic ontological axiom that such a canonical system always exists. This way of conceiving mathematical objects is underscored by a defense of an essentialistic version of Leibniz principle according to which each object is uniquely characterized by its proper and possibly relational essence (where proper means not referring to identity")
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100 Philosophie
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GAP. 6, 11. Sep. 2006 - 14. Sep. 2006, Berlin
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SPOHN, Wolfgang, 2006. How are Mathematical Objects Constituted? A Structuralist Answer. GAP. 6. Berlin, 11. Sep. 2006 - 14. Sep. 2006. In: GAP. 6 Philosophie - Grundlagen und Anwendungen, Berlin, 11.-14.9.2006. 2006, pp. 106-119BibTex
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year={2006},
title={How are Mathematical Objects Constituted? A Structuralist Answer},
booktitle={GAP. 6 Philosophie - Grundlagen und Anwendungen, Berlin, 11.-14.9.2006},
pages={106--119},
author={Spohn, Wolfgang}
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