Abstract
It is well known that Zermelo-Fraenkel Set Theory (ZF), despite its usefulness as a foundational theory for mathematics, has two unwanted features: it cannot be written down explicitly due to its infinitely many axioms, and it has a countable model due to the Löwenheim–Skolem theorem. This paper presents the axioms one has to accept to get rid of these two features. For that matter, some twenty axioms are formulated in a non-classical first-order language with countably many constants: to this collection of axioms is associated a universe of discourse consisting of a class of objects, each of which is a set, and a class of arrows, each of which is a function. The axioms of ZF are derived from this finite axiom schema, and it is shown that it does not have a countable model—if it has a model at all, that is. Furthermore, the axioms of category theory are proven to hold: the present universe may therefore serve as an ontological basis for category theory. However, it has not been investigated whether any of the soundness and completeness properties hold for the present theory: the inevitable conclusion is therefore that only further research can establish whether the present results indeed constitute an advancement in the foundations of mathematics.
Original language | English |
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Article number | 119 |
Number of pages | 29 |
Journal | Axioms |
Volume | 10 |
Issue number | 2 |
DOIs | |
Publication status | Published - 21 Jun 2021 |
Bibliographical note
Funding Information:The author wants to thank Harrie de Swart (Tilburg University), Jean Paul van Bendegem, and Colin Rittberg (both Free University of Brussels) for their useful comments. This research has been facilitated by the Foundation Liberalitas (The Netherlands).
Publisher Copyright:
© 2021 by the author. Licensee MDPI, Basel, Switzerland.
Copyright:
Copyright 2021 Elsevier B.V., All rights reserved.