HYPER-REF: A General Model of Reference for First-Order Logic and First-Order Arithmetic

Kriterion – Journal of Philosophy 36 (2):179-205 (2022)
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Abstract

In this article I present HYPER-REF, a model to determine the referent of any given expression in First-Order Logic. I also explain how this model can be used to determine the referent of a first-order theory such as First-Order Arithmetic. By reference or referent I mean the non-empty set of objects that the syntactical terms of a well-formed formula pick out given a particular interpretation of the language. To do so, I will first draw on previous work to make explicit the notion of reference and its hyperintensional features. Then I present HYPER-REF and offer a heuristic method for determining the reference of any formula. Then I discuss some of the benefits and most salient features of HYPER-REF, including some remarks on the nature of self-reference in formal languages.

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10.1515/krt-2021-0033

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Pablo Rivas-Robledo
Ludwig Maximilians Universität, München

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Outline of a theory of truth.Saul Kripke - 1975 - Journal of Philosophy 72 (19):690-716.
Semantic relationism.Kit Fine (ed.) - 2007 - Malden, MA: Blackwell.
Reasoning with arbitrary objects.Kit Fine - 1985 - New York, NY, USA: Blackwell.
HYPE: A System of Hyperintensional Logic.Hannes Leitgeb - 2019 - Journal of Philosophical Logic 48 (2):305-405.

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